Peak signal detection in realtime timeseries data

Update: The best performing algorithm so far is this one.

This question explores robust algorithms for detecting sudden peaks in real-time timeseries data.

Consider the following example data:

Example of this data is in Matlab format (but this question is not about the language but about the algorithm):

``````p = [1 1 1.1 1 0.9 1 1 1.1 1 0.9 1 1.1 1 1 0.9 1 1 1.1 1 1 1 1 1.1 0.9 1 1.1 1 1 0.9, ...
1 1.1 1 1 1.1 1 0.8 0.9 1 1.2 0.9 1 1 1.1 1.2 1 1.5 1 3 2 5 3 2 1 1 1 0.9 1 1, ...
3 2.6 4 3 3.2 2 1 1 0.8 4 4 2 2.5 1 1 1];
``````

You can clearly see that there are three large peaks and some small peaks. This dataset is a specific example of the class of timeseries datasets that the question is about. This class of datasets has two general features:

1. There is basic noise with a general mean
2. There are large 'peaks' or 'higher data points' that significantly deviate from the noise.

Let's also assume the following:

• The width of the peaks cannot be determined beforehand
• The height of the peaks significantly deviates from the other values
• The algorithm updates in realtime (so updates with each new datapoint)

For such a situation, a boundary value needs to be constructed which triggers signals. However, the boundary value cannot be static and must be determined realtime based on an algorithm.

My Question: what is a good algorithm to calculate such thresholds in realtime? Are there specific algorithms for such situations? What are the most well-known algorithms?

Robust algorithms or useful insights are all highly appreciated. (can answer in any language: it's about the algorithm)

Robust peak detection algorithm (using z-scores)

I came up with an algorithm that works very well for these types of datasets. It is based on the principle of dispersion: if a new datapoint is a given x number of standard deviations away from some moving mean, the algorithm signals (also called z-score). The algorithm is very robust because it constructs a separate moving mean and deviation, such that signals do not corrupt the threshold. Future signals are therefore identified with approximately the same accuracy, regardless of the amount of previous signals. The algorithm takes 3 inputs: `lag = the lag of the moving window`, `threshold = the z-score at which the algorithm signals` and `influence = the influence (between 0 and 1) of new signals on the mean and standard deviation`. For example, a `lag` of 5 will use the last 5 observations to smooth the data. A `threshold` of 3.5 will signal if a datapoint is 3.5 standard deviations away from the moving mean. And an `influence` of 0.5 gives signals half of the influence that normal datapoints have. Likewise, an `influence` of 0 ignores signals completely for recalculating the new threshold. An influence of 0 is therefore the most robust option (but assumes stationarity); putting the influence option at 1 is least robust. For non-stationary data, the influence option should therefore be put somewhere between 0 and 1.

It works as follows:

Pseudocode

``````# Let y be a vector of timeseries data of at least length lag+2
# Let mean() be a function that calculates the mean
# Let std() be a function that calculates the standard deviaton
# Let absolute() be the absolute value function

# Settings (the ones below are examples: choose what is best for your data)
set lag to 5;          # lag 5 for the smoothing functions
set threshold to 3.5;  # 3.5 standard deviations for signal
set influence to 0.5;  # between 0 and 1, where 1 is normal influence, 0.5 is half

# Initialize variables
set signals to vector 0,...,0 of length of y;   # Initialize signal results
set filteredY to y(1),...,y(lag)                # Initialize filtered series
set avgFilter to null;                          # Initialize average filter
set stdFilter to null;                          # Initialize std. filter
set avgFilter(lag) to mean(y(1),...,y(lag));    # Initialize first value
set stdFilter(lag) to std(y(1),...,y(lag));     # Initialize first value

for i=lag+1,...,t do
if absolute(y(i) - avgFilter(i-1)) > threshold*stdFilter(i-1) then
if y(i) > avgFilter(i-1) then
set signals(i) to +1;                     # Positive signal
else
set signals(i) to -1;                     # Negative signal
end
set filteredY(i) to influence*y(i) + (1-influence)*filteredY(i-1);
else
set signals(i) to 0;                        # No signal
set filteredY(i) to y(i);
end
set avgFilter(i) to mean(filteredY(i-lag+1),...,filteredY(i));
set stdFilter(i) to std(filteredY(i-lag+1),...,filteredY(i));
end
``````

Rules of thumb for selecting good parameters for your data can be found below.

Demo

The Matlab code for this demo can be found here. To use the demo, simply run it and create a time series yourself by clicking on the upper chart. The algorithm starts working after drawing `lag` number of observations.

Result

For the original question, this algorithm will give the following output when using the following settings: `lag = 30, threshold = 5, influence = 0`:

Rules of thumb for configuring the algorithm

`lag`: the lag parameter determines how much your data will be smoothed and how adaptive the algorithm is to changes in the long-term average of the data. The more stationary your data is, the more lags you should include (this should improve the robustness of the algorithm). If your data contains time-varying trends, you should consider how quickly you want the algorithm to adapt to these trends. I.e., if you put `lag` at 10, it takes 10 'periods' before the algorithm's treshold is adjusted to any systematic changes in the long-term average. So choose the `lag` parameter based on the trending behavior of your data and how adaptive you want the algorithm to be.

`influence`: this parameter determines the influence of signals on the algorithm's detection threshold. If put at 0, signals have no influence on the threshold, such that future signals are detected based on a threshold that is calculated with a mean and standard deviation that is not influenced by past signals. If put at 0.5, signals have half the influence of normal data points. Another way to think about this is that if you put the influence at 0, you implicitly assume stationarity (i.e. no matter how many signals there are, you always expect the time series to return to the same average over the long term). If this is not the case, you should put the influence parameter somewhere between 0 and 1, depending on the extent to which signals can systematically influence the time-varying trend of the data. E.g., if signals lead to a structural break of the long-term average of the time series, the influence parameter should be put high (close to 1) so the threshold can react to structural breaks quickly.

`threshold`: the threshold parameter is the number of standard deviations from the moving mean above which the algorithm will classify a new datapoint as being a signal. For example, if a new datapoint is 4.0 standard deviations above the moving mean and the threshold parameter is set as 3.5, the algorithm will identify the datapoint as a signal. This parameter should be set based on how many signals you expect. For example, if your data is normally distributed, a threshold (or: z-score) of 3.5 corresponds to a signaling probability of 0.00047 (from this table), which implies that you expect a signal once every 2128 datapoints (1/0.00047). The threshold therefore directly influences how sensitive the algorithm is and thereby also determines how often the algorithm signals. Examine your own data and choose a sensible threshold that makes the algorithm signal when you want it to (some trial-and-error might be needed here to get to a good threshold for your purpose).

WARNING: The code above always loops over all datapoints everytime it runs. When implementing this code, make sure to split the calculation of the signal into a separate function (without the loop). Then when a new datapoint arrives, update `filteredY`, `avgFilter` and `stdFilter` once. Do not recalculate the signals for all data everytime there is a new datapoint (like in the example above), that would be extremely inefficient and slow in real-time applications.

Other ways to modify the algorithm (for potential improvements) are:

1. Use median instead of mean
2. Use a robust measure of scale, such as the median absolute deviation (MAD), instead of the standard deviation
3. Use a signalling margin, so the signal doesn't switch too often
4. Change the way the influence parameter works
5. Treat up and down signals differently (asymmetric treatment)
6. Create a separate `influence` parameter for the mean and std (as in this Swift translation)

Other works using the algorithm from this answer

Other applications of the algorithm from this answer

Links to other peak detection algorithms

How to reference this algorithm:

Brakel, J.P.G. van (2014). "Robust peak detection algorithm using z-scores". Stack Overflow. Available at: https://stackoverflow.com/questions/22583391/peak-signal-detection-in-realtime-timeseries-data/22640362#22640362 (version: 2020-11-08).

Bibtex @misc{brakel2014, author = {Brakel, J.P.G van}, title = {Robust peak detection algorithm using z-scores}, url = {https://stackoverflow.com/questions/22583391/peak-signal-detection-in-realtime-timeseries-data/22640362#22640362}, language = {en}, year = {2014}, urldate = {2022-04-12}, journal = {Stack Overflow}, howpublished = {https://stackoverflow.com/questions/22583391/peak-signal-detection-in-realtime-timeseries-data/22640362#22640362}}

If you use this function somewhere, please credit me by using above reference. If you have any questions about the algorithm, post them in the comments below or reach out to me on LinkedIn.

• I'm trying the Matlab code for some accelerometer data, but for some reason the `threshold` graph just becomes a flat green line after a big spike up to 20 in the data, and it stays like that for the rest of the graph... If I remove the sike, this doesn't happen, so it seems to be caused by the spike in the data. Any idea what could be going on? I'm a newbie in Matlab, so I can't figure it out... Apr 28, 2017 at 3:43
• There are many ways to improve this algo, so be creative (different treatment up/ down; median instead of mean; robust std; writing the code as a memory-efficient function; threshold margin so the signal doesn't switch too often, etc.). Aug 1, 2017 at 11:40
• @datapug The algorithm is specifically designed to work on real-time data, so future values are unknown at the moment of calculating the signal. Do you have ex-ante information about the entire time-series? In that case you can just reverse the data indeed. Jul 7, 2021 at 13:10
• @Jean-Paul, Yeah now I see.. my issue was I tried to simulate a peak which caused some issue which I can't explain.. See here: imgur.com/a/GFz59jl As you can see - after the signals are getting back to original values - the standard deviation stays 0 Sep 30, 2021 at 11:27
• @Yitzchak I see. Indeed the algorithm assumes that the duration of the signals is less than the duration of the peak. In your case indeed the st.dev. will tend to zero (because every `filteredY(i) = filteredY(i-1)`). If you want to make the algorithm work for your case (`influence = 0`), a quick-and-dirty solution is to change the line `set filteredY(i) to influence*y(i) + (1-influence)*filteredY(i-1);` to `set filteredY(i) to filteredY(i-lag)`. That way the threshold will simply recycle values from before the peak occurred. See demonstration here. Sep 30, 2021 at 11:55

Here is the `Python` / `numpy` implementation of the smoothed z-score algorithm (see answer above). You can find the gist here.

``````#!/usr/bin/env python
# Implementation of algorithm from https://stackoverflow.com/a/22640362/6029703
import numpy as np
import pylab

def thresholding_algo(y, lag, threshold, influence):
signals = np.zeros(len(y))
filteredY = np.array(y)
avgFilter = [0]*len(y)
stdFilter = [0]*len(y)
avgFilter[lag - 1] = np.mean(y[0:lag])
stdFilter[lag - 1] = np.std(y[0:lag])
for i in range(lag, len(y)):
if abs(y[i] - avgFilter[i-1]) > threshold * stdFilter [i-1]:
if y[i] > avgFilter[i-1]:
signals[i] = 1
else:
signals[i] = -1

filteredY[i] = influence * y[i] + (1 - influence) * filteredY[i-1]
avgFilter[i] = np.mean(filteredY[(i-lag+1):i+1])
stdFilter[i] = np.std(filteredY[(i-lag+1):i+1])
else:
signals[i] = 0
filteredY[i] = y[i]
avgFilter[i] = np.mean(filteredY[(i-lag+1):i+1])
stdFilter[i] = np.std(filteredY[(i-lag+1):i+1])

return dict(signals = np.asarray(signals),
avgFilter = np.asarray(avgFilter),
stdFilter = np.asarray(stdFilter))
``````

Below is the test on the same dataset that yields the same plot as in the original answer for `R`/`Matlab`

``````# Data
y = np.array([1,1,1.1,1,0.9,1,1,1.1,1,0.9,1,1.1,1,1,0.9,1,1,1.1,1,1,1,1,1.1,0.9,1,1.1,1,1,0.9,
1,1.1,1,1,1.1,1,0.8,0.9,1,1.2,0.9,1,1,1.1,1.2,1,1.5,1,3,2,5,3,2,1,1,1,0.9,1,1,3,
2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1])

# Settings: lag = 30, threshold = 5, influence = 0
lag = 30
threshold = 5
influence = 0

# Run algo with settings from above
result = thresholding_algo(y, lag=lag, threshold=threshold, influence=influence)

# Plot result
pylab.subplot(211)
pylab.plot(np.arange(1, len(y)+1), y)

pylab.plot(np.arange(1, len(y)+1),
result["avgFilter"], color="cyan", lw=2)

pylab.plot(np.arange(1, len(y)+1),
result["avgFilter"] + threshold * result["stdFilter"], color="green", lw=2)

pylab.plot(np.arange(1, len(y)+1),
result["avgFilter"] - threshold * result["stdFilter"], color="green", lw=2)

pylab.subplot(212)
pylab.step(np.arange(1, len(y)+1), result["signals"], color="red", lw=2)
pylab.ylim(-1.5, 1.5)
pylab.show()
``````
• Over here 'y' is actually the signal and 'signals' is the set of data points, am I correct in understanding? Mar 22, 2019 at 17:17
• @TheTank `y` is the data array you pass in, `signals` is the `+1` or `-1` output array that indicate for each datapoint `y[i]` whether that datapoint is a "significant peak" given the settings you use. Nov 15, 2019 at 8:37

One approach is to detect peaks based on the following observation:

• Time t is a peak if (y(t) > y(t-1)) && (y(t) > y(t+1))

It avoids false positives by waiting until the uptrend is over. It is not exactly "real-time" in the sense that it will miss the peak by one dt. sensitivity can be controlled by requiring a margin for comparison. There is a trade off between noisy detection and time delay of detection. You can enrich the model by adding more parameters:

• peak if (y(t) - y(t-dt) > m) && (y(t) - y(t+dt) > m)

where dt and m are parameters to control sensitivity vs time-delay

This is what you get with the mentioned algorithm:

here is the code to reproduce the plot in python:

``````import numpy as np
import matplotlib.pyplot as plt
input = np.array([ 1. ,  1. ,  1. ,  1. ,  1. ,  1. ,  1. ,  1.1,  1. ,  0.8,  0.9,
1. ,  1.2,  0.9,  1. ,  1. ,  1.1,  1.2,  1. ,  1.5,  1. ,  3. ,
2. ,  5. ,  3. ,  2. ,  1. ,  1. ,  1. ,  0.9,  1. ,  1. ,  3. ,
2.6,  4. ,  3. ,  3.2,  2. ,  1. ,  1. ,  1. ,  1. ,  1. ])
signal = (input > np.roll(input,1)) & (input > np.roll(input,-1))
plt.plot(input)
plt.plot(signal.nonzero()[0], input[signal], 'ro')
plt.show()
``````

By setting `m = 0.5`, you can get a cleaner signal with only one false positive:

• How would I go about changing the sensitivity? Mar 23, 2014 at 0:56
• I can think of two approaches: 1: set m to a larger value so that only larger peaks are detected. 2: instead of calculating y(t) - y(t-dt) (and y(t) - y(t+dt)), you integrate from t-dt to t (and t to t+dt).
– aha
Mar 23, 2014 at 1:16
• By what criteria are you rejecting the other 7 peaks? Mar 23, 2014 at 14:09
• There is a problem with flat peaks, since what you do is basicly 1-D edge detection (like convoluting the signal with [1 0 -1])
– ben
Mar 26, 2014 at 7:19

In signal processing, peak detection is often done via wavelet transform. You basically do a discrete wavelet transform on your time series data. Zero-crossings in the detail coefficients that are returned will correspond to peaks in the time series signal. You get different peak amplitudes detected at different detail coefficient levels, which gives you multi-level resolution.

• Your answer let me to this article and this answer which will help me construct a good algorithm for my implementation. Thanks! Mar 31, 2014 at 21:32

Python version that works with real-time streams (doesn't recalculate all data points on arrival of each new data point). You may want to tweak what the class function returns - for my purposes I just needed the signals.

``````import numpy as np

class real_time_peak_detection():
def __init__(self, array, lag, threshold, influence):
self.y = list(array)
self.length = len(self.y)
self.lag = lag
self.threshold = threshold
self.influence = influence
self.signals = [0] * len(self.y)
self.filteredY = np.array(self.y).tolist()
self.avgFilter = [0] * len(self.y)
self.stdFilter = [0] * len(self.y)
self.avgFilter[self.lag - 1] = np.mean(self.y[0:self.lag]).tolist()
self.stdFilter[self.lag - 1] = np.std(self.y[0:self.lag]).tolist()

def thresholding_algo(self, new_value):
self.y.append(new_value)
i = len(self.y) - 1
self.length = len(self.y)
if i < self.lag:
return 0
elif i == self.lag:
self.signals = [0] * len(self.y)
self.filteredY = np.array(self.y).tolist()
self.avgFilter = [0] * len(self.y)
self.stdFilter = [0] * len(self.y)
self.avgFilter[self.lag] = np.mean(self.y[0:self.lag]).tolist()
self.stdFilter[self.lag] = np.std(self.y[0:self.lag]).tolist()
return 0

self.signals += [0]
self.filteredY += [0]
self.avgFilter += [0]
self.stdFilter += [0]

if abs(self.y[i] - self.avgFilter[i - 1]) > (self.threshold * self.stdFilter[i - 1]):

if self.y[i] > self.avgFilter[i - 1]:
self.signals[i] = 1
else:
self.signals[i] = -1

self.filteredY[i] = self.influence * self.y[i] + \
(1 - self.influence) * self.filteredY[i - 1]
self.avgFilter[i] = np.mean(self.filteredY[(i - self.lag):i])
self.stdFilter[i] = np.std(self.filteredY[(i - self.lag):i])
else:
self.signals[i] = 0
self.filteredY[i] = self.y[i]
self.avgFilter[i] = np.mean(self.filteredY[(i - self.lag):i])
self.stdFilter[i] = np.std(self.filteredY[(i - self.lag):i])

return self.signals[i]
``````

We’ve attempted to use the smoothed z-score algorithm on our dataset, which results in either oversensitivity or undersensitivity (depending on how the parameters are tuned), with little middle ground. In our site’s traffic signal, we’ve observed a low frequency baseline which represents the daily cycle and even with the best possible parameters (shown below), it still trailed off especially on the 4th day because most of the data points are recognized as anomaly.

Building on top of the original z-score algorithm, we came up a way to solve this problem by reverse filtering. The details of the modified algorithm and its application on TV commercial trafic attribution are posted on our team blog.

• Cool to see that the algorithm was a starting point for your more advanced version. Your data has a very particular pattern, so it would indeed make more sense to first remove the pattern using some other technique and then apply the algo on the residuals. Alternatively, you might want to use a centered instead of a lagging window to calculate the average/ st.dev. Another comment: your solution moves from the right to the left to identify spikes, but this is not possible in real time applications (that's why the original algo is so simplistic, because future information is inaccessible). Dec 12, 2018 at 11:45

In computational topology the idea of persistent homology leads to an efficient – fast as sorting numbers – solution. It does not only detect peaks, it quantifies the "significance" of the peaks in a natural way that allows you to select the peaks that are significant for you.

Algorithm summary. In a 1-dimensional setting (time series, real-valued signal) the algorithm can be easily described by the following figure:

Think of the function graph (or its sub-level set) as a landscape and consider a decreasing water level starting at level infinity (or 1.8 in this picture). While the level decreases, at local maxima islands pop up. At local minima these islands merge together. One detail in this idea is that the island that appeared later in time is merged into the island that is older. The "persistence" of an island is its birth time minus its death time. The lengths of the blue bars depict the persistence, which is the above mentioned "significance" of a peak.

Efficiency. It is not too hard to find an implementation that runs in linear time – in fact it is a single, simple loop – after the function values were sorted. So this implementation should be fast in practice and is easily implemented, too.

References. A write-up of the entire story and references to the motivation from persistent homology (a field in computatioal algebraic topology) can be found here: https://www.sthu.org/blog/13-perstopology-peakdetection/index.html

• This algorithim is much faster and more accurate than, for example, scipy.signal.find_peaks. For a "real" time-series with 1053896 data points, it detected 137516 peaks (13%). The order of the peaks (most significant first) allows the most significant peaks to be extracted. It provides the start, peak, and end of each peak. Works well with noisy data.
– vinh
Sep 2, 2019 at 14:30
• By real-time data you mean a so-called online algorithm, where data points are received time after time. The significance of a peak might be determined by values in the future. It would be nice to extend the algorithm to become online by modifying the past results without sacrificing the time complexity too much. Oct 9, 2019 at 12:54
• The length of the blue bars don't make sense to me. It looks like they always refer to the preceding local minimum, but never refer to the following one. They should refer to both in my opinion, which means that #1 and 3 would be shorter. Mar 13 at 9:18
• First, it is true that the blue bars start at local minimum. However, it is not always the local minimum next left. In fact, it does even need to be the next right one neither. It is the one that causes the merge of the components during the watersheding process. In this particular real-world example it only seems that way because it is in the nature of frequency-response curves that they have a declining trend with vanishing oscillation. But if you look closely at #3 then a small local minimum to the left is actually skipped. Mar 14 at 12:38
• I implemented the same algorithm in C++ which is about 45x faster than the Python implementation linked above. The C++ implementation is available here. Enjoy. Apr 19 at 0:23

Appendix 1 to original answer: `Matlab` and `R` translations

Matlab code

``````function [signals,avgFilter,stdFilter] = ThresholdingAlgo(y,lag,threshold,influence)
% Initialise signal results
signals = zeros(length(y),1);
% Initialise filtered series
filteredY = y(1:lag+1);
% Initialise filters
avgFilter(lag+1,1) = mean(y(1:lag+1));
stdFilter(lag+1,1) = std(y(1:lag+1));
% Loop over all datapoints y(lag+2),...,y(t)
for i=lag+2:length(y)
% If new value is a specified number of deviations away
if abs(y(i)-avgFilter(i-1)) > threshold*stdFilter(i-1)
if y(i) > avgFilter(i-1)
% Positive signal
signals(i) = 1;
else
% Negative signal
signals(i) = -1;
end
% Make influence lower
filteredY(i) = influence*y(i)+(1-influence)*filteredY(i-1);
else
% No signal
signals(i) = 0;
filteredY(i) = y(i);
end
avgFilter(i) = mean(filteredY(i-lag:i));
stdFilter(i) = std(filteredY(i-lag:i));
end
% Done, now return results
end
``````

Example:

``````% Data
y = [1 1 1.1 1 0.9 1 1 1.1 1 0.9 1 1.1 1 1 0.9 1 1 1.1 1 1,...
1 1 1.1 0.9 1 1.1 1 1 0.9 1 1.1 1 1 1.1 1 0.8 0.9 1 1.2 0.9 1,...
1 1.1 1.2 1 1.5 1 3 2 5 3 2 1 1 1 0.9 1,...
1 3 2.6 4 3 3.2 2 1 1 0.8 4 4 2 2.5 1 1 1];

% Settings
lag = 30;
threshold = 5;
influence = 0;

% Get results
[signals,avg,dev] = ThresholdingAlgo(y,lag,threshold,influence);

figure; subplot(2,1,1); hold on;
x = 1:length(y); ix = lag+1:length(y);
area(x(ix),avg(ix)+threshold*dev(ix),'FaceColor',[0.9 0.9 0.9],'EdgeColor','none');
area(x(ix),avg(ix)-threshold*dev(ix),'FaceColor',[1 1 1],'EdgeColor','none');
plot(x(ix),avg(ix),'LineWidth',1,'Color','cyan','LineWidth',1.5);
plot(x(ix),avg(ix)+threshold*dev(ix),'LineWidth',1,'Color','green','LineWidth',1.5);
plot(x(ix),avg(ix)-threshold*dev(ix),'LineWidth',1,'Color','green','LineWidth',1.5);
plot(1:length(y),y,'b');
subplot(2,1,2);
stairs(signals,'r','LineWidth',1.5); ylim([-1.5 1.5]);
``````

R code

``````ThresholdingAlgo <- function(y,lag,threshold,influence) {
signals <- rep(0,length(y))
filteredY <- y[0:lag]
avgFilter <- NULL
stdFilter <- NULL
avgFilter[lag] <- mean(y[0:lag], na.rm=TRUE)
stdFilter[lag] <- sd(y[0:lag], na.rm=TRUE)
for (i in (lag+1):length(y)){
if (abs(y[i]-avgFilter[i-1]) > threshold*stdFilter[i-1]) {
if (y[i] > avgFilter[i-1]) {
signals[i] <- 1;
} else {
signals[i] <- -1;
}
filteredY[i] <- influence*y[i]+(1-influence)*filteredY[i-1]
} else {
signals[i] <- 0
filteredY[i] <- y[i]
}
avgFilter[i] <- mean(filteredY[(i-lag):i], na.rm=TRUE)
stdFilter[i] <- sd(filteredY[(i-lag):i], na.rm=TRUE)
}
return(list("signals"=signals,"avgFilter"=avgFilter,"stdFilter"=stdFilter))
}
``````

Example:

``````# Data
y <- c(1,1,1.1,1,0.9,1,1,1.1,1,0.9,1,1.1,1,1,0.9,1,1,1.1,1,1,1,1,1.1,0.9,1,1.1,1,1,0.9,
1,1.1,1,1,1.1,1,0.8,0.9,1,1.2,0.9,1,1,1.1,1.2,1,1.5,1,3,2,5,3,2,1,1,1,0.9,1,1,3,
2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1)

lag       <- 30
threshold <- 5
influence <- 0

# Run algo with lag = 30, threshold = 5, influence = 0
result <- ThresholdingAlgo(y,lag,threshold,influence)

# Plot result
par(mfrow = c(2,1),oma = c(2,2,0,0) + 0.1,mar = c(0,0,2,1) + 0.2)
plot(1:length(y),y,type="l",ylab="",xlab="")
lines(1:length(y),result\$avgFilter,type="l",col="cyan",lwd=2)
lines(1:length(y),result\$avgFilter+threshold*result\$stdFilter,type="l",col="green",lwd=2)
lines(1:length(y),result\$avgFilter-threshold*result\$stdFilter,type="l",col="green",lwd=2)
plot(result\$signals,type="S",col="red",ylab="",xlab="",ylim=c(-1.5,1.5),lwd=2)
``````

This code (both languages) will yield the following result for the data of the original question:

Appendix 2 to original answer: `Matlab` demonstration code

(click to create data)

``````function [] = RobustThresholdingDemo()

%% SPECIFICATIONS
lag         = 5;       % lag for the smoothing
threshold   = 3.5;     % number of st.dev. away from the mean to signal
influence   = 0.3;     % when signal: how much influence for new data? (between 0 and 1)
% 1 is normal influence, 0.5 is half
%% START DEMO
DemoScreen(30,lag,threshold,influence);

end

function [signals,avgFilter,stdFilter] = ThresholdingAlgo(y,lag,threshold,influence)
signals = zeros(length(y),1);
filteredY = y(1:lag+1);
avgFilter(lag+1,1) = mean(y(1:lag+1));
stdFilter(lag+1,1) = std(y(1:lag+1));
for i=lag+2:length(y)
if abs(y(i)-avgFilter(i-1)) > threshold*stdFilter(i-1)
if y(i) > avgFilter(i-1)
signals(i) = 1;
else
signals(i) = -1;
end
filteredY(i) = influence*y(i)+(1-influence)*filteredY(i-1);
else
signals(i) = 0;
filteredY(i) = y(i);
end
avgFilter(i) = mean(filteredY(i-lag:i));
stdFilter(i) = std(filteredY(i-lag:i));
end
end

% Demo screen function
function [] = DemoScreen(n,lag,threshold,influence)
figure('Position',[200 100,1000,500]);
subplot(2,1,1);
title(sprintf(['Draw data points (%.0f max)      [settings: lag = %.0f, '...
'threshold = %.2f, influence = %.2f]'],n,lag,threshold,influence));
ylim([0 5]); xlim([0 50]);
H = gca; subplot(2,1,1);
set(H, 'YLimMode', 'manual'); set(H, 'XLimMode', 'manual');
set(H, 'YLim', get(H,'YLim')); set(H, 'XLim', get(H,'XLim'));
xg = []; yg = [];
for i=1:n
try
[xi,yi] = ginput(1);
catch
return;
end
xg = [xg xi]; yg = [yg yi];
if i == 1
subplot(2,1,1); hold on;
plot(H, xg(i),yg(i),'r.');
text(xg(i),yg(i),num2str(i),'FontSize',7);
end
if length(xg) > lag
[signals,avg,dev] = ...
ThresholdingAlgo(yg,lag,threshold,influence);
area(xg(lag+1:end),avg(lag+1:end)+threshold*dev(lag+1:end),...
'FaceColor',[0.9 0.9 0.9],'EdgeColor','none');
area(xg(lag+1:end),avg(lag+1:end)-threshold*dev(lag+1:end),...
'FaceColor',[1 1 1],'EdgeColor','none');
plot(xg(lag+1:end),avg(lag+1:end),'LineWidth',1,'Color','cyan');
plot(xg(lag+1:end),avg(lag+1:end)+threshold*dev(lag+1:end),...
'LineWidth',1,'Color','green');
plot(xg(lag+1:end),avg(lag+1:end)-threshold*dev(lag+1:end),...
'LineWidth',1,'Color','green');
subplot(2,1,2); hold on; title('Signal output');
stairs(xg(lag+1:end),signals(lag+1:end),'LineWidth',2,'Color','blue');
ylim([-2 2]); xlim([0 50]); hold off;
end
subplot(2,1,1); hold on;
for j=2:i
plot(xg([j-1:j]),yg([j-1:j]),'r'); plot(H,xg(j),yg(j),'r.');
text(xg(j),yg(j),num2str(j),'FontSize',7);
end
end
end
``````

Following on from @Jean-Paul's proposed solution, I have implemented his algorithm in C#

``````public class ZScoreOutput
{
public List<double> input;
public List<int> signals;
public List<double> avgFilter;
public List<double> filtered_stddev;
}

public static class ZScore
{
public static ZScoreOutput StartAlgo(List<double> input, int lag, double threshold, double influence)
{
// init variables!
int[] signals = new int[input.Count];
double[] filteredY = new List<double>(input).ToArray();
double[] avgFilter = new double[input.Count];
double[] stdFilter = new double[input.Count];

var initialWindow = new List<double>(filteredY).Skip(0).Take(lag).ToList();

avgFilter[lag - 1] = Mean(initialWindow);
stdFilter[lag - 1] = StdDev(initialWindow);

for (int i = lag; i < input.Count; i++)
{
if (Math.Abs(input[i] - avgFilter[i - 1]) > threshold * stdFilter[i - 1])
{
signals[i] = (input[i] > avgFilter[i - 1]) ? 1 : -1;
filteredY[i] = influence * input[i] + (1 - influence) * filteredY[i - 1];
}
else
{
signals[i] = 0;
filteredY[i] = input[i];
}

// Update rolling average and deviation
var slidingWindow = new List<double>(filteredY).Skip(i - lag).Take(lag+1).ToList();

var tmpMean = Mean(slidingWindow);
var tmpStdDev = StdDev(slidingWindow);

avgFilter[i] = Mean(slidingWindow);
stdFilter[i] = StdDev(slidingWindow);
}

// Copy to convenience class
var result = new ZScoreOutput();
result.input = input;
result.avgFilter       = new List<double>(avgFilter);
result.signals         = new List<int>(signals);
result.filtered_stddev = new List<double>(stdFilter);

return result;
}

private static double Mean(List<double> list)
{
// Simple helper function!
return list.Average();
}

private static double StdDev(List<double> values)
{
double ret = 0;
if (values.Count() > 0)
{
double avg = values.Average();
double sum = values.Sum(d => Math.Pow(d - avg, 2));
ret = Math.Sqrt((sum) / (values.Count() - 1));
}
return ret;
}
}
``````

Example usage:

``````var input = new List<double> {1.0, 1.0, 1.1, 1.0, 0.9, 1.0, 1.0, 1.1, 1.0, 0.9, 1.0,
1.1, 1.0, 1.0, 0.9, 1.0, 1.0, 1.1, 1.0, 1.0, 1.0, 1.0, 1.1, 0.9, 1.0, 1.1, 1.0, 1.0, 0.9,
1.0, 1.1, 1.0, 1.0, 1.1, 1.0, 0.8, 0.9, 1.0, 1.2, 0.9, 1.0, 1.0, 1.1, 1.2, 1.0, 1.5, 1.0,
3.0, 2.0, 5.0, 3.0, 2.0, 1.0, 1.0, 1.0, 0.9, 1.0, 1.0, 3.0, 2.6, 4.0, 3.0, 3.2, 2.0, 1.0,
1.0, 0.8, 4.0, 4.0, 2.0, 2.5, 1.0, 1.0, 1.0};

int lag = 30;
double threshold = 5.0;
double influence = 0.0;

var output = ZScore.StartAlgo(input, lag, threshold, influence);
``````
• Hi, I think there is an error in that code, in the method StdDev you take values.Count()-1, should there rely be -1? I think you would want the number of items and that is what you get from values.Count(). Jul 12, 2019 at 8:54
• Hmm.. Good spot. Although I originally ported the algorithm to C#, I never ended up using it. I would probably replace that whole function with a call to the nuget library MathNet. "Install-Package MathNet.Numerics" It has prebuilt functions for PopulationStandardDeviation() and StandardDeviation(); eg. var populationStdDev = new List<double>(1,2,3,4).PopulationStandardDeviation(); var sampleStdDev = new List<double>(1,2,3,4).StandardDeviation(); Jul 12, 2019 at 15:05

Here's a C implementation of @Jean-Paul's Smoothed Z-score for the Arduino microcontroller used to take accelerometer readings and decide whether the direction of an impact has come from the left or the right. This performs really well since this device returns a bounced signal. Here's this input to this peak detection algorithm from the device - showing an impact from the right followed by and impact from the left. You can see the initial spike then the oscillation of the sensor.

``````#include <stdio.h>
#include <math.h>
#include <string.h>

#define SAMPLE_LENGTH 1000

float stddev(float data[], int len);
float mean(float data[], int len);
void thresholding(float y[], int signals[], int lag, float threshold, float influence);

void thresholding(float y[], int signals[], int lag, float threshold, float influence) {
memset(signals, 0, sizeof(int) * SAMPLE_LENGTH);
float filteredY[SAMPLE_LENGTH];
memcpy(filteredY, y, sizeof(float) * SAMPLE_LENGTH);
float avgFilter[SAMPLE_LENGTH];
float stdFilter[SAMPLE_LENGTH];

avgFilter[lag - 1] = mean(y, lag);
stdFilter[lag - 1] = stddev(y, lag);

for (int i = lag; i < SAMPLE_LENGTH; i++) {
if (fabsf(y[i] - avgFilter[i-1]) > threshold * stdFilter[i-1]) {
if (y[i] > avgFilter[i-1]) {
signals[i] = 1;
} else {
signals[i] = -1;
}
filteredY[i] = influence * y[i] + (1 - influence) * filteredY[i-1];
} else {
signals[i] = 0;
}
avgFilter[i] = mean(filteredY + i-lag, lag);
stdFilter[i] = stddev(filteredY + i-lag, lag);
}
}

float mean(float data[], int len) {
float sum = 0.0, mean = 0.0;

int i;
for(i=0; i<len; ++i) {
sum += data[i];
}

mean = sum/len;
return mean;

}

float stddev(float data[], int len) {
float the_mean = mean(data, len);
float standardDeviation = 0.0;

int i;
for(i=0; i<len; ++i) {
standardDeviation += pow(data[i] - the_mean, 2);
}

return sqrt(standardDeviation/len);
}

int main() {
printf("Hello, World!\n");
int lag = 100;
float threshold = 5;
float influence = 0;
float y[]=  {1,1,1.1,1,0.9,1,1,1.1,1,0.9,1,1.1,1,1,0.9,1,1,1.1,1,1,1,1,1.1,0.9,1,1.1,1,1,0.9,
....
1,1.1,1,1,1.1,1,0.8,0.9,1,1.2,0.9,1,1,1.1,1.2,1,1.5,1,3,2,5,3,2,1,1,1,0.9,1,1,3,       2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1,1.2,1,1.5,1,3,2,5,3,2,1,1,1,0.9,1,1,3,
2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1}

int signal[SAMPLE_LENGTH];

thresholding(y, signal,  lag, threshold, influence);

return 0;
}
``````

Hers's the result with influence = 0

Not great but here with influence = 1

which is very good.

• Hi, this is a comment I composed over a year ago, but didn't have enough points to post... I'm not still 100% familiar with my past observations, but here it goes. If I doesn't make much sense, I will re-test it. The comment was: "I suspect that the current implementation does not take into account the immediately prior value for the average and stddev filters. For example, with lag = 5, for i = 6, the average of [0,4] (inclusive) is used instead of [1,5] (or perhaps [0,5]?). I would suggest changing '(filteredY + i-lag, lag)' to '(filteredY + i-lag + 1, lag)'". Jul 5, 2020 at 12:03
• In the first line of `thresholding` function, you should be considering the size of an int. So instead of `memset(signals, 0, sizeof(float) * SAMPLE_LENGTH)`, the correct code is `memset(signals, 0, sizeof(int) * SAMPLE_LENGTH)`. Oct 14, 2020 at 17:10

Found another algorithm by Palshikar (2009) in:

Palshikar, G. (2009). Simple algorithms for peak detection in time-series. In Proc. 1st Int. Conf. Advanced Data Analysis, Business Analytics and Intelligence (Vol. 122).

The algorithm goes like this:

``````algorithm peak1 // one peak detection algorithms that uses peak function S1

input T = x1, x2, …, xN, N // input time-series of N points
input k // window size around the peak
input h // typically 1 <= h <= 3
output O // set of peaks detected in T

begin
O = empty set // initially empty

for (i = 1; i < n; i++) do
// compute peak function value for each of the N points in T
a[i] = S1(k,i,xi,T);
end for

Compute the mean m' and standard deviation s' of all positive values in array a;

for (i = 1; i < n; i++) do // remove local peaks which are “small” in global context
if (a[i] > 0 && (a[i] – m') >( h * s')) then O = O + {xi};
end if
end for

Order peaks in O in terms of increasing index in T

// retain only one peak out of any set of peaks within distance k of each other

for every adjacent pair of peaks xi and xj in O do
if |j – i| <= k then remove the smaller value of {xi, xj} from O
end if
end for
end
``````

• The paper provides 5 different algorithms for peak detection
• The algorithms work on the raw time-series data (no smoothing needed)

• Difficult to determine `k` and `h` beforehand
• Peaks cannot be flat (like the third peak in my test data)

Example:

• Actually interesting paper. S4 seems like a better function to use in his opinion. But more importantly is to clarify when k<i<N-k is not true. How would one define function S1 (S2,..) for i=0 i simply didn't divided by 2 and ignored the first operand and for every other i included both operands but for i<=k there were less operands on the left then on the right Nov 15, 2017 at 17:30

Here is an implementation of the Smoothed z-score algorithm (above) in Golang. It assumes a slice of `[]int16` (PCM 16bit samples). You can find a gist here.

``````/*
Settings (the ones below are examples: choose what is best for your data)
set lag to 5;          # lag 5 for the smoothing functions
set threshold to 3.5;  # 3.5 standard deviations for signal
set influence to 0.5;  # between 0 and 1, where 1 is normal influence, 0.5 is half
*/

// ZScore on 16bit WAV samples
func ZScore(samples []int16, lag int, threshold float64, influence float64) (signals []int16) {
//lag := 20
//threshold := 3.5
//influence := 0.5

signals = make([]int16, len(samples))
filteredY := make([]int16, len(samples))
for i, sample := range samples[0:lag] {
filteredY[i] = sample
}
avgFilter := make([]int16, len(samples))
stdFilter := make([]int16, len(samples))

avgFilter[lag] = Average(samples[0:lag])
stdFilter[lag] = Std(samples[0:lag])

for i := lag + 1; i < len(samples); i++ {

f := float64(samples[i])

if float64(Abs(samples[i]-avgFilter[i-1])) > threshold*float64(stdFilter[i-1]) {
if samples[i] > avgFilter[i-1] {
signals[i] = 1
} else {
signals[i] = -1
}
filteredY[i] = int16(influence*f + (1-influence)*float64(filteredY[i-1]))
avgFilter[i] = Average(filteredY[(i - lag):i])
stdFilter[i] = Std(filteredY[(i - lag):i])
} else {
signals[i] = 0
filteredY[i] = samples[i]
avgFilter[i] = Average(filteredY[(i - lag):i])
stdFilter[i] = Std(filteredY[(i - lag):i])
}
}

return
}

// Average a chunk of values
func Average(chunk []int16) (avg int16) {
var sum int64
for _, sample := range chunk {
if sample < 0 {
sample *= -1
}
sum += int64(sample)
}
return int16(sum / int64(len(chunk)))
}
``````
• @Jean-Paul I'm not totally sure everything is correct, so there might be bugs. Feb 9, 2017 at 20:07
• Have you tried replicating the demo example output from Matlab/R? That should be a good confirmation of the quality. Feb 15, 2017 at 10:37
• Another Go implementation using floats with concise helpers: play.golang.org/p/ka0x-QEWeLe Apr 20, 2021 at 6:44

Here is a C++ implementation of the smoothed z-score algorithm from this answer

``````std::vector<int> smoothedZScore(std::vector<float> input)
{
//lag 5 for the smoothing functions
int lag = 5;
//3.5 standard deviations for signal
float threshold = 3.5;
//between 0 and 1, where 1 is normal influence, 0.5 is half
float influence = .5;

if (input.size() <= lag + 2)
{
std::vector<int> emptyVec;
return emptyVec;
}

//Initialise variables
std::vector<int> signals(input.size(), 0.0);
std::vector<float> filteredY(input.size(), 0.0);
std::vector<float> avgFilter(input.size(), 0.0);
std::vector<float> stdFilter(input.size(), 0.0);
std::vector<float> subVecStart(input.begin(), input.begin() + lag);
avgFilter[lag] = mean(subVecStart);
stdFilter[lag] = stdDev(subVecStart);

for (size_t i = lag + 1; i < input.size(); i++)
{
if (std::abs(input[i] - avgFilter[i - 1]) > threshold * stdFilter[i - 1])
{
if (input[i] > avgFilter[i - 1])
{
signals[i] = 1; //# Positive signal
}
else
{
signals[i] = -1; //# Negative signal
}
//Make influence lower
filteredY[i] = influence* input[i] + (1 - influence) * filteredY[i - 1];
}
else
{
signals[i] = 0; //# No signal
filteredY[i] = input[i];
}
std::vector<float> subVec(filteredY.begin() + i - lag, filteredY.begin() + i);
avgFilter[i] = mean(subVec);
stdFilter[i] = stdDev(subVec);
}
return signals;
}
``````
• Caveat: This implementation does not actually provide a method to calculate the mean and standard deviation. For C++11, an easy method can be found here: stackoverflow.com/a/12405793/3250829 Nov 12, 2017 at 5:24

Here is an actual Java implementation based on the Groovy answer posted earlier. (I know there are already Groovy and Kotlin implementations posted, but for someone like me who's only done Java, it's a real hassle to figure out how to convert between other languages and Java).

(Results match with other people's graphs)

Algorithm implementation

``````import java.util.ArrayList;
import java.util.Collections;
import java.util.HashMap;
import java.util.List;

import org.apache.commons.math3.stat.descriptive.SummaryStatistics;

public class SignalDetector {

public HashMap<String, List> analyzeDataForSignals(List<Double> data, int lag, Double threshold, Double influence) {

// init stats instance
SummaryStatistics stats = new SummaryStatistics();

// the results (peaks, 1 or -1) of our algorithm
List<Integer> signals = new ArrayList<Integer>(Collections.nCopies(data.size(), 0));

// filter out the signals (peaks) from our original list (using influence arg)
List<Double> filteredData = new ArrayList<Double>(data);

// the current average of the rolling window
List<Double> avgFilter = new ArrayList<Double>(Collections.nCopies(data.size(), 0.0d));

// the current standard deviation of the rolling window
List<Double> stdFilter = new ArrayList<Double>(Collections.nCopies(data.size(), 0.0d));

// init avgFilter and stdFilter
for (int i = 0; i < lag; i++) {
}
avgFilter.set(lag - 1, stats.getMean());
stdFilter.set(lag - 1, Math.sqrt(stats.getPopulationVariance())); // getStandardDeviation() uses sample variance
stats.clear();

// loop input starting at end of rolling window
for (int i = lag; i < data.size(); i++) {

// if the distance between the current value and average is enough standard deviations (threshold) away
if (Math.abs((data.get(i) - avgFilter.get(i - 1))) > threshold * stdFilter.get(i - 1)) {

// this is a signal (i.e. peak), determine if it is a positive or negative signal
if (data.get(i) > avgFilter.get(i - 1)) {
signals.set(i, 1);
} else {
signals.set(i, -1);
}

// filter this signal out using influence
filteredData.set(i, (influence * data.get(i)) + ((1 - influence) * filteredData.get(i - 1)));
} else {
// ensure this signal remains a zero
signals.set(i, 0);
// ensure this value is not filtered
filteredData.set(i, data.get(i));
}

// update rolling average and deviation
for (int j = i - lag; j < i; j++) {
}
avgFilter.set(i, stats.getMean());
stdFilter.set(i, Math.sqrt(stats.getPopulationVariance()));
stats.clear();
}

HashMap<String, List> returnMap = new HashMap<String, List>();
returnMap.put("signals", signals);
returnMap.put("filteredData", filteredData);
returnMap.put("avgFilter", avgFilter);
returnMap.put("stdFilter", stdFilter);

return returnMap;

} // end
}
``````

Main method

``````import java.text.DecimalFormat;
import java.util.ArrayList;
import java.util.Arrays;
import java.util.HashMap;
import java.util.List;

public class Main {

public static void main(String[] args) throws Exception {
DecimalFormat df = new DecimalFormat("#0.000");

ArrayList<Double> data = new ArrayList<Double>(Arrays.asList(1d, 1d, 1.1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 0.9d, 1d,
1.1d, 1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 1d, 1d, 1d, 1.1d, 0.9d, 1d, 1.1d, 1d, 1d, 0.9d, 1d, 1.1d, 1d, 1d,
1.1d, 1d, 0.8d, 0.9d, 1d, 1.2d, 0.9d, 1d, 1d, 1.1d, 1.2d, 1d, 1.5d, 1d, 3d, 2d, 5d, 3d, 2d, 1d, 1d, 1d,
0.9d, 1d, 1d, 3d, 2.6d, 4d, 3d, 3.2d, 2d, 1d, 1d, 0.8d, 4d, 4d, 2d, 2.5d, 1d, 1d, 1d));

SignalDetector signalDetector = new SignalDetector();
int lag = 30;
double threshold = 5;
double influence = 0;

HashMap<String, List> resultsMap = signalDetector.analyzeDataForSignals(data, lag, threshold, influence);
// print algorithm params
System.out.println("lag: " + lag + "\t\tthreshold: " + threshold + "\t\tinfluence: " + influence);

System.out.println("Data size: " + data.size());
System.out.println("Signals size: " + resultsMap.get("signals").size());

// print data
System.out.print("Data:\t\t");
for (double d : data) {
System.out.print(df.format(d) + "\t");
}
System.out.println();

// print signals
System.out.print("Signals:\t");
List<Integer> signalsList = resultsMap.get("signals");
for (int i : signalsList) {
System.out.print(df.format(i) + "\t");
}
System.out.println();

// print filtered data
System.out.print("Filtered Data:\t");
List<Double> filteredDataList = resultsMap.get("filteredData");
for (double d : filteredDataList) {
System.out.print(df.format(d) + "\t");
}
System.out.println();

// print running average
System.out.print("Avg Filter:\t");
List<Double> avgFilterList = resultsMap.get("avgFilter");
for (double d : avgFilterList) {
System.out.print(df.format(d) + "\t");
}
System.out.println();

// print running std
System.out.print("Std filter:\t");
List<Double> stdFilterList = resultsMap.get("stdFilter");
for (double d : stdFilterList) {
System.out.print(df.format(d) + "\t");
}
System.out.println();

System.out.println();
for (int i = 0; i < signalsList.size(); i++) {
if (signalsList.get(i) != 0) {
System.out.println("Point " + i + " gave signal " + signalsList.get(i));
}
}
}
}
``````

Results

``````lag: 30     threshold: 5.0      influence: 0.0
Data size: 74
Signals size: 74
Data:           1.000   1.000   1.100   1.000   0.900   1.000   1.000   1.100   1.000   0.900   1.000   1.100   1.000   1.000   0.900   1.000   1.000   1.100   1.000   1.000   1.000   1.000   1.100   0.900   1.000   1.100   1.000   1.000   0.900   1.000   1.100   1.000   1.000   1.100   1.000   0.800   0.900   1.000   1.200   0.900   1.000   1.000   1.100   1.200   1.000   1.500   1.000   3.000   2.000   5.000   3.000   2.000   1.000   1.000   1.000   0.900   1.000   1.000   3.000   2.600   4.000   3.000   3.200   2.000   1.000   1.000   0.800   4.000   4.000   2.000   2.500   1.000   1.000   1.000
Signals:        0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   1.000   0.000   1.000   1.000   1.000   1.000   1.000   0.000   0.000   0.000   0.000   0.000   0.000   1.000   1.000   1.000   1.000   1.000   1.000   0.000   0.000   0.000   1.000   1.000   1.000   1.000   0.000   0.000   0.000
Filtered Data:  1.000   1.000   1.100   1.000   0.900   1.000   1.000   1.100   1.000   0.900   1.000   1.100   1.000   1.000   0.900   1.000   1.000   1.100   1.000   1.000   1.000   1.000   1.100   0.900   1.000   1.100   1.000   1.000   0.900   1.000   1.100   1.000   1.000   1.100   1.000   0.800   0.900   1.000   1.200   0.900   1.000   1.000   1.100   1.200   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   0.900   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   1.000   0.800   0.800   0.800   0.800   0.800   1.000   1.000   1.000
Avg Filter:     0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   1.003   1.003   1.007   1.007   1.003   1.007   1.010   1.003   1.000   0.997   1.003   1.003   1.003   1.000   1.003   1.010   1.013   1.013   1.013   1.010   1.010   1.010   1.010   1.010   1.007   1.010   1.010   1.003   1.003   1.003   1.007   1.007   1.003   1.003   1.003   1.000   1.000   1.007   1.003   0.997   0.983   0.980   0.973   0.973   0.970
Std filter:     0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.000   0.060   0.060   0.063   0.063   0.060   0.063   0.060   0.071   0.073   0.071   0.080   0.080   0.080   0.077   0.080   0.087   0.085   0.085   0.085   0.083   0.083   0.083   0.083   0.083   0.081   0.079   0.079   0.080   0.080   0.080   0.077   0.077   0.075   0.075   0.075   0.073   0.073   0.063   0.071   0.080   0.078   0.083   0.089   0.089   0.086

Point 45 gave signal 1
Point 47 gave signal 1
Point 48 gave signal 1
Point 49 gave signal 1
Point 50 gave signal 1
Point 51 gave signal 1
Point 58 gave signal 1
Point 59 gave signal 1
Point 60 gave signal 1
Point 61 gave signal 1
Point 62 gave signal 1
Point 63 gave signal 1
Point 67 gave signal 1
Point 68 gave signal 1
Point 69 gave signal 1
Point 70 gave signal 1
``````

• What about when you add data not as a list just add one by one for streaming data?
– C.T
Apr 17, 2021 at 19:07
• @C.T I haven't tested it out, but it looks like you'll have to run the stuff in the `for (int i = lag...` loop each time you get a new value. You can see delica's answer for an example of real-time streaming in Python for inspiration. Apr 19, 2021 at 12:31

C++ Implementation

``````#include <iostream>
#include <vector>
#include <algorithm>
#include <unordered_map>
#include <cmath>
#include <iterator>
#include <numeric>

using namespace std;

typedef long double ld;
typedef unsigned int uint;
typedef std::vector<ld>::iterator vec_iter_ld;

/**
* Overriding the ostream operator for pretty printing vectors.
*/
template<typename T>
std::ostream &operator<<(std::ostream &os, std::vector<T> vec) {
os << "[";
if (vec.size() != 0) {
std::copy(vec.begin(), vec.end() - 1, std::ostream_iterator<T>(os, " "));
os << vec.back();
}
os << "]";
return os;
}

/**
* This class calculates mean and standard deviation of a subvector.
* This is basically stats computation of a subvector of a window size qual to "lag".
*/
class VectorStats {
public:
/**
* Constructor for VectorStats class.
*
* @param start - This is the iterator position of the start of the window,
* @param end   - This is the iterator position of the end of the window,
*/
VectorStats(vec_iter_ld start, vec_iter_ld end) {
this->start = start;
this->end = end;
this->compute();
}

/**
* This method calculates the mean and standard deviation using STL function.
* This is the Two-Pass implementation of the Mean & Variance calculation.
*/
void compute() {
ld sum = std::accumulate(start, end, 0.0);
uint slice_size = std::distance(start, end);
ld mean = sum / slice_size;
std::vector<ld> diff(slice_size);
std::transform(start, end, diff.begin(), [mean](ld x) { return x - mean; });
ld sq_sum = std::inner_product(diff.begin(), diff.end(), diff.begin(), 0.0);
ld std_dev = std::sqrt(sq_sum / slice_size);

this->m1 = mean;
this->m2 = std_dev;
}

ld mean() {
return m1;
}

ld standard_deviation() {
return m2;
}

private:
vec_iter_ld start;
vec_iter_ld end;
ld m1;
ld m2;
};

/**
* This is the implementation of the Smoothed Z-Score Algorithm.
* This is direction translation of https://stackoverflow.com/a/22640362/1461896.
*
* @param input - input signal
* @param lag - the lag of the moving window
* @param threshold - the z-score at which the algorithm signals
* @param influence - the influence (between 0 and 1) of new signals on the mean and standard deviation
* @return a hashmap containing the filtered signal and corresponding mean and standard deviation.
*/
unordered_map<string, vector<ld>> z_score_thresholding(vector<ld> input, int lag, ld threshold, ld influence) {
unordered_map<string, vector<ld>> output;

uint n = (uint) input.size();
vector<ld> signals(input.size());
vector<ld> filtered_input(input.begin(), input.end());
vector<ld> filtered_mean(input.size());
vector<ld> filtered_stddev(input.size());

VectorStats lag_subvector_stats(input.begin(), input.begin() + lag);
filtered_mean[lag - 1] = lag_subvector_stats.mean();
filtered_stddev[lag - 1] = lag_subvector_stats.standard_deviation();

for (int i = lag; i < n; i++) {
if (abs(input[i] - filtered_mean[i - 1]) > threshold * filtered_stddev[i - 1]) {
signals[i] = (input[i] > filtered_mean[i - 1]) ? 1.0 : -1.0;
filtered_input[i] = influence * input[i] + (1 - influence) * filtered_input[i - 1];
} else {
signals[i] = 0.0;
filtered_input[i] = input[i];
}
VectorStats lag_subvector_stats(filtered_input.begin() + (i - lag), filtered_input.begin() + i);
filtered_mean[i] = lag_subvector_stats.mean();
filtered_stddev[i] = lag_subvector_stats.standard_deviation();
}

output["signals"] = signals;
output["filtered_mean"] = filtered_mean;
output["filtered_stddev"] = filtered_stddev;

return output;
};

int main() {
vector<ld> input = {1.0, 1.0, 1.1, 1.0, 0.9, 1.0, 1.0, 1.1, 1.0, 0.9, 1.0, 1.1, 1.0, 1.0, 0.9, 1.0, 1.0, 1.1, 1.0,
1.0, 1.0, 1.0, 1.1, 0.9, 1.0, 1.1, 1.0, 1.0, 0.9, 1.0, 1.1, 1.0, 1.0, 1.1, 1.0, 0.8, 0.9, 1.0,
1.2, 0.9, 1.0, 1.0, 1.1, 1.2, 1.0, 1.5, 1.0, 3.0, 2.0, 5.0, 3.0, 2.0, 1.0, 1.0, 1.0, 0.9, 1.0,
1.0, 3.0, 2.6, 4.0, 3.0, 3.2, 2.0, 1.0, 1.0, 0.8, 4.0, 4.0, 2.0, 2.5, 1.0, 1.0, 1.0};

int lag = 30;
ld threshold = 5.0;
ld influence = 0.0;
unordered_map<string, vector<ld>> output = z_score_thresholding(input, lag, threshold, influence);
cout << output["signals"] << endl;
}
``````

This problem looks similar to one I encountered in a hybrid/embedded systems course, but that was related to detecting faults when the input from a sensor is noisy. We used a Kalman filter to estimate/predict the hidden state of the system, then used statistical analysis to determine the likelihood that a fault had occurred. We were working with linear systems, but nonlinear variants exist. I remember the approach being surprisingly adaptive, but it required a model of the dynamics of the system.

• The Kalman filter is interesting, but I can't seem to find an applicable algorithm for my purpose. I highly appreciate the answer though and I will look into some peak detection papers like this one to see if I can learn from any of the algorithms. Thanks! Mar 31, 2014 at 21:31

Thought I would provide my Julia implementation of the algorithm for others. The gist can be found here

``````using Statistics
using Plots
function SmoothedZscoreAlgo(y, lag, threshold, influence)
# Julia implimentation of http://stackoverflow.com/a/22640362/6029703
n = length(y)
signals = zeros(n) # init signal results
filteredY = copy(y) # init filtered series
avgFilter = zeros(n) # init average filter
stdFilter = zeros(n) # init std filter
avgFilter[lag - 1] = mean(y[1:lag]) # init first value
stdFilter[lag - 1] = std(y[1:lag]) # init first value

for i in range(lag, stop=n-1)
if abs(y[i] - avgFilter[i-1]) > threshold*stdFilter[i-1]
if y[i] > avgFilter[i-1]
signals[i] += 1 # postive signal
else
signals[i] += -1 # negative signal
end
# Make influence lower
filteredY[i] = influence*y[i] + (1-influence)*filteredY[i-1]
else
signals[i] = 0
filteredY[i] = y[i]
end
avgFilter[i] = mean(filteredY[i-lag+1:i])
stdFilter[i] = std(filteredY[i-lag+1:i])
end
return (signals = signals, avgFilter = avgFilter, stdFilter = stdFilter)
end

# Data
y = [1,1,1.1,1,0.9,1,1,1.1,1,0.9,1,1.1,1,1,0.9,1,1,1.1,1,1,1,1,1.1,0.9,1,1.1,1,1,0.9,
1,1.1,1,1,1.1,1,0.8,0.9,1,1.2,0.9,1,1,1.1,1.2,1,1.5,1,3,2,5,3,2,1,1,1,0.9,1,1,3,
2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1]

# Settings: lag = 30, threshold = 5, influence = 0
lag = 30
threshold = 5
influence = 0

results = SmoothedZscoreAlgo(y, lag, threshold, influence)
upper_bound = results[:avgFilter] + threshold * results[:stdFilter]
lower_bound = results[:avgFilter] - threshold * results[:stdFilter]
x = 1:length(y)

yplot = plot(x,y,color="blue", label="Y",legend=:topleft)
yplot = plot!(x,upper_bound, color="green", label="Upper Bound",legend=:topleft)
yplot = plot!(x,results[:avgFilter], color="cyan", label="Average Filter",legend=:topleft)
yplot = plot!(x,lower_bound, color="green", label="Lower Bound",legend=:topleft)
signalplot = plot(x,results[:signals],color="red",label="Signals",legend=:topleft)
plot(yplot,signalplot,layout=(2,1),legend=:topleft)
``````

Here is my attempt at creating a Ruby solution for the "Smoothed z-score algo" from the accepted answer:

``````module ThresholdingAlgoMixin
def mean(array)
array.reduce(&:+) / array.size.to_f
end

def stddev(array)
array_mean = mean(array)
Math.sqrt(array.reduce(0.0) { |a, b| a.to_f + ((b.to_f - array_mean) ** 2) } / array.size.to_f)
end

def thresholding_algo(lag: 5, threshold: 3.5, influence: 0.5)
return nil if size < lag * 2
Array.new(size, 0).tap do |signals|
filtered = Array.new(self)

initial_slice = take(lag)
avg_filter = Array.new(lag - 1, 0.0) + [mean(initial_slice)]
std_filter = Array.new(lag - 1, 0.0) + [stddev(initial_slice)]
(lag..size-1).each do |idx|
prev = idx - 1
if (fetch(idx) - avg_filter[prev]).abs > threshold * std_filter[prev]
signals[idx] = fetch(idx) > avg_filter[prev] ? 1 : -1
filtered[idx] = (influence * fetch(idx)) + ((1-influence) * filtered[prev])
end

filtered_slice = filtered[idx-lag..prev]
avg_filter[idx] = mean(filtered_slice)
std_filter[idx] = stddev(filtered_slice)
end
end
end
end
``````

And example usage:

``````test_data = [
1, 1, 1.1, 1, 0.9, 1, 1, 1.1, 1, 0.9, 1, 1.1, 1, 1, 0.9, 1,
1, 1.1, 1, 1, 1, 1, 1.1, 0.9, 1, 1.1, 1, 1, 0.9, 1, 1.1, 1,
1, 1.1, 1, 0.8, 0.9, 1, 1.2, 0.9, 1, 1, 1.1, 1.2, 1, 1.5,
1, 3, 2, 5, 3, 2, 1, 1, 1, 0.9, 1, 1, 3, 2.6, 4, 3, 3.2, 2,
1, 1, 0.8, 4, 4, 2, 2.5, 1, 1, 1
].extend(ThresholdingAlgoMixin)

puts test_data.thresholding_algo.inspect

# Output: [
#   0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0,
#   0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, 0, 0, 0,
#   0, 0, 0, 0, 0, 0, 1, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 1,
#   1, 1, 0, 0, 0, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0
# ]
``````

Here is an altered Fortran version of the z-score algorithm. It is altered specifically for peak (resonance) detection in transfer functions in frequency space (Each change has a small comment in code).

The first modification gives a warning to the user if there is a resonance near the lower bound of the input vector, indicated by a standard deviation higher than a certain threshold (10% in this case). This simply means the signal is not flat enough for the detection initializing the filters properly.

The second modification is that only the highest value of a peak is added to the found peaks. This is reached by comparing each found peak value to the magnitude of its (lag) predecessors and its (lag) successors.

The third change is to respect that resonance peaks usually show some form of symmetry around the resonance frequency. So it is natural to calculate the mean and std symmetrically around the current data point (rather than just for the predecessors). This results in a better peak detection behavior.

The modifications have the effect that the whole signal has to be known to the function beforehand which is the usual case for resonance detection (something like the Matlab Example of Jean-Paul where the data points are generated on the fly won't work).

``````function PeakDetect(y,lag,threshold, influence)
implicit none
! Declaring part
real, dimension(:), intent(in) :: y
integer, dimension(size(y)) :: PeakDetect
real, dimension(size(y)) :: filteredY, avgFilter, stdFilter
integer :: lag, ii
real :: threshold, influence

! Executing part
PeakDetect = 0
filteredY = 0.0
filteredY(1:lag+1) = y(1:lag+1)
avgFilter = 0.0
avgFilter(lag+1) = mean(y(1:2*lag+1))
stdFilter = 0.0
stdFilter(lag+1) = std(y(1:2*lag+1))

if (stdFilter(lag+1)/avgFilter(lag+1)>0.1) then ! If the coefficient of variation exceeds 10%, the signal is too uneven at the start, possibly because of a peak.
write(unit=*,fmt=1001)
1001        format(1X,'Warning: Peak detection might have failed, as there may be a peak at the edge of the frequency range.',/)
end if
do ii = lag+2, size(y)
if (abs(y(ii) - avgFilter(ii-1)) > threshold * stdFilter(ii-1)) then
! Find only the largest outstanding value which is only the one greater than its predecessor and its successor
if (y(ii) > avgFilter(ii-1) .AND. y(ii) > y(ii-1) .AND. y(ii) > y(ii+1)) then
PeakDetect(ii) = 1
end if
filteredY(ii) = influence * y(ii) + (1 - influence) * filteredY(ii-1)
else
filteredY(ii) = y(ii)
end if
! Modified with respect to the original code. Mean and standard deviation are calculted symmetrically around the current point
avgFilter(ii) = mean(filteredY(ii-lag:ii+lag))
stdFilter(ii) = std(filteredY(ii-lag:ii+lag))
end do
end function PeakDetect

real function mean(y)
!> @brief Calculates the mean of vector y
implicit none
! Declaring part
real, dimension(:), intent(in) :: y
integer :: N
! Executing part
N = max(1,size(y))
mean = sum(y)/N
end function mean

real function std(y)
!> @brief Calculates the standard deviation of vector y
implicit none
! Declaring part
real, dimension(:), intent(in) :: y
integer :: N
! Executing part
N = max(1,size(y))
std = sqrt((N*dot_product(y,y) - sum(y)**2) / (N*(N-1)))
end function std
``````

For my application the algorithm works like a charm!

An iterative version in python/numpy for answer https://stackoverflow.com/a/22640362/6029703 is here. This code is faster than computing average and standard deviation every lag for large data (100000+).

``````def peak_detection_smoothed_zscore_v2(x, lag, threshold, influence):
'''
iterative smoothed z-score algorithm
Implementation of algorithm from https://stackoverflow.com/a/22640362/6029703
'''
import numpy as np
labels = np.zeros(len(x))
filtered_y = np.array(x)
avg_filter = np.zeros(len(x))
std_filter = np.zeros(len(x))
var_filter = np.zeros(len(x))

avg_filter[lag - 1] = np.mean(x[0:lag])
std_filter[lag - 1] = np.std(x[0:lag])
var_filter[lag - 1] = np.var(x[0:lag])
for i in range(lag, len(x)):
if abs(x[i] - avg_filter[i - 1]) > threshold * std_filter[i - 1]:
if x[i] > avg_filter[i - 1]:
labels[i] = 1
else:
labels[i] = -1
filtered_y[i] = influence * x[i] + (1 - influence) * filtered_y[i - 1]
else:
labels[i] = 0
filtered_y[i] = x[i]
# update avg, var, std
avg_filter[i] = avg_filter[i - 1] + 1. / lag * (filtered_y[i] - filtered_y[i - lag])
var_filter[i] = var_filter[i - 1] + 1. / lag * ((filtered_y[i] - avg_filter[i - 1]) ** 2 - (
filtered_y[i - lag] - avg_filter[i - 1]) ** 2 - (filtered_y[i] - filtered_y[i - lag]) ** 2 / lag)
std_filter[i] = np.sqrt(var_filter[i])

return dict(signals=labels,
avgFilter=avg_filter,
stdFilter=std_filter)
``````

Here is a Groovy (Java) implementation of the smoothed z-score algorithm (see answer above).

``````/**
* "Smoothed zero-score alogrithm" shamelessly copied from https://stackoverflow.com/a/22640362/6029703
*  Uses a rolling mean and a rolling deviation (separate) to identify peaks in a vector
*
* @param y - The input vector to analyze
* @param lag - The lag of the moving window (i.e. how big the window is)
* @param threshold - The z-score at which the algorithm signals (i.e. how many standard deviations away from the moving mean a peak (or signal) is)
* @param influence - The influence (between 0 and 1) of new signals on the mean and standard deviation (how much a peak (or signal) should affect other values near it)
* @return - The calculated averages (avgFilter) and deviations (stdFilter), and the signals (signals)
*/

public HashMap<String, List<Object>> thresholdingAlgo(List<Double> y, Long lag, Double threshold, Double influence) {
//init stats instance
SummaryStatistics stats = new SummaryStatistics()

//the results (peaks, 1 or -1) of our algorithm
List<Integer> signals = new ArrayList<Integer>(Collections.nCopies(y.size(), 0))
//filter out the signals (peaks) from our original list (using influence arg)
List<Double> filteredY = new ArrayList<Double>(y)
//the current average of the rolling window
List<Double> avgFilter = new ArrayList<Double>(Collections.nCopies(y.size(), 0.0d))
//the current standard deviation of the rolling window
List<Double> stdFilter = new ArrayList<Double>(Collections.nCopies(y.size(), 0.0d))
//init avgFilter and stdFilter
(0..lag-1).each { stats.addValue(y[it as int]) }
avgFilter[lag - 1 as int] = stats.getMean()
stdFilter[lag - 1 as int] = Math.sqrt(stats.getPopulationVariance()) //getStandardDeviation() uses sample variance (not what we want)
stats.clear()
//loop input starting at end of rolling window
(lag..y.size()-1).each { i ->
//if the distance between the current value and average is enough standard deviations (threshold) away
if (Math.abs((y[i as int] - avgFilter[i - 1 as int]) as Double) > threshold * stdFilter[i - 1 as int]) {
//this is a signal (i.e. peak), determine if it is a positive or negative signal
signals[i as int] = (y[i as int] > avgFilter[i - 1 as int]) ? 1 : -1
//filter this signal out using influence
filteredY[i as int] = (influence * y[i as int]) + ((1-influence) * filteredY[i - 1 as int])
} else {
//ensure this signal remains a zero
signals[i as int] = 0
//ensure this value is not filtered
filteredY[i as int] = y[i as int]
}
//update rolling average and deviation
(i - lag..i-1).each { stats.addValue(filteredY[it as int] as Double) }
avgFilter[i as int] = stats.getMean()
stdFilter[i as int] = Math.sqrt(stats.getPopulationVariance()) //getStandardDeviation() uses sample variance (not what we want)
stats.clear()
}

return [
signals  : signals,
avgFilter: avgFilter,
stdFilter: stdFilter
]
}
``````

Below is a test on the same dataset that yields the same results as the above Python / numpy implementation.

``````    // Data
def y = [1d, 1d, 1.1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 0.9d, 1d, 1.1d, 1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 1d,
1d, 1d, 1.1d, 0.9d, 1d, 1.1d, 1d, 1d, 0.9d, 1d, 1.1d, 1d, 1d, 1.1d, 1d, 0.8d, 0.9d, 1d, 1.2d, 0.9d, 1d,
1d, 1.1d, 1.2d, 1d, 1.5d, 1d, 3d, 2d, 5d, 3d, 2d, 1d, 1d, 1d, 0.9d, 1d,
1d, 3d, 2.6d, 4d, 3d, 3.2d, 2d, 1d, 1d, 0.8d, 4d, 4d, 2d, 2.5d, 1d, 1d, 1d]

// Settings
def lag = 30
def threshold = 5
def influence = 0

def thresholdingResults = thresholdingAlgo((List<Double>) y, (Long) lag, (Double) threshold, (Double) influence)

println y.size()
println thresholdingResults.signals.size()
println thresholdingResults.signals

thresholdingResults.signals.eachWithIndex { x, idx ->
if (x) {
println y[idx]
}
}
``````

Here is a (non-idiomatic) Scala version of the smoothed z-score algorithm:

``````/**
* Smoothed zero-score alogrithm shamelessly copied from https://stackoverflow.com/a/22640362/6029703
* Uses a rolling mean and a rolling deviation (separate) to identify peaks in a vector
*
* @param y - The input vector to analyze
* @param lag - The lag of the moving window (i.e. how big the window is)
* @param threshold - The z-score at which the algorithm signals (i.e. how many standard deviations away from the moving mean a peak (or signal) is)
* @param influence - The influence (between 0 and 1) of new signals on the mean and standard deviation (how much a peak (or signal) should affect other values near it)
* @return - The calculated averages (avgFilter) and deviations (stdFilter), and the signals (signals)
*/
private def smoothedZScore(y: Seq[Double], lag: Int, threshold: Double, influence: Double): Seq[Int] = {
val stats = new SummaryStatistics()

// the results (peaks, 1 or -1) of our algorithm
val signals = mutable.ArrayBuffer.fill(y.length)(0)

// filter out the signals (peaks) from our original list (using influence arg)
val filteredY = y.to[mutable.ArrayBuffer]

// the current average of the rolling window
val avgFilter = mutable.ArrayBuffer.fill(y.length)(0d)

// the current standard deviation of the rolling window
val stdFilter = mutable.ArrayBuffer.fill(y.length)(0d)

// init avgFilter and stdFilter

avgFilter(lag - 1) = stats.getMean
stdFilter(lag - 1) = Math.sqrt(stats.getPopulationVariance) // getStandardDeviation() uses sample variance (not what we want)

// loop input starting at end of rolling window
y.zipWithIndex.slice(lag, y.length - 1).foreach {
case (s: Double, i: Int) =>
// if the distance between the current value and average is enough standard deviations (threshold) away
if (Math.abs(s - avgFilter(i - 1)) > threshold * stdFilter(i - 1)) {
// this is a signal (i.e. peak), determine if it is a positive or negative signal
signals(i) = if (s > avgFilter(i - 1)) 1 else -1
// filter this signal out using influence
filteredY(i) = (influence * s) + ((1 - influence) * filteredY(i - 1))
} else {
// ensure this signal remains a zero
signals(i) = 0
// ensure this value is not filtered
filteredY(i) = s
}

// update rolling average and deviation
stats.clear()
filteredY.slice(i - lag, i).foreach(s => stats.addValue(s))
avgFilter(i) = stats.getMean
stdFilter(i) = Math.sqrt(stats.getPopulationVariance) // getStandardDeviation() uses sample variance (not what we want)
}

println(y.length)
println(signals.length)
println(signals)

signals.zipWithIndex.foreach {
case(x: Int, idx: Int) =>
if (x == 1) {
println(idx + " " + y(idx))
}
}

val data =
y.zipWithIndex.map { case (s: Double, i: Int) => Map("x" -> i, "y" -> s, "name" -> "y", "row" -> "data") } ++
avgFilter.zipWithIndex.map { case (s: Double, i: Int) => Map("x" -> i, "y" -> s, "name" -> "avgFilter", "row" -> "data") } ++
avgFilter.zipWithIndex.map { case (s: Double, i: Int) => Map("x" -> i, "y" -> (s - threshold * stdFilter(i)), "name" -> "lower", "row" -> "data") } ++
avgFilter.zipWithIndex.map { case (s: Double, i: Int) => Map("x" -> i, "y" -> (s + threshold * stdFilter(i)), "name" -> "upper", "row" -> "data") } ++
signals.zipWithIndex.map { case (s: Int, i: Int) => Map("x" -> i, "y" -> s, "name" -> "signal", "row" -> "signal") }

Vegas("Smoothed Z")
.withData(data)
.mark(Line)
.encodeX("x", Quant)
.encodeY("y", Quant)
.encodeColor(
field="name",
dataType=Nominal
)
.encodeRow("row", Ordinal)
.show

return signals
}
``````

Here's a test that returns the same results as the Python and Groovy versions:

``````val y = List(1d, 1d, 1.1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 0.9d, 1d, 1.1d, 1d, 1d, 0.9d, 1d, 1d, 1.1d, 1d, 1d,
1d, 1d, 1.1d, 0.9d, 1d, 1.1d, 1d, 1d, 0.9d, 1d, 1.1d, 1d, 1d, 1.1d, 1d, 0.8d, 0.9d, 1d, 1.2d, 0.9d, 1d,
1d, 1.1d, 1.2d, 1d, 1.5d, 1d, 3d, 2d, 5d, 3d, 2d, 1d, 1d, 1d, 0.9d, 1d,
1d, 3d, 2.6d, 4d, 3d, 3.2d, 2d, 1d, 1d, 0.8d, 4d, 4d, 2d, 2.5d, 1d, 1d, 1d)

val lag = 30
val threshold = 5d
val influence = 0d

smoothedZScore(y, lag, threshold, influence)
``````

Gist here

• hello! Thanks for writing the scala version of this! I found a small bug though. It seems you don't need `y.length-1` in the slice() function. It causes the last element to be skipped. gist.github.com/ecopoesis/… . I discovered this by sprinkling log statements everywhere and noticed it. Aug 24, 2020 at 17:55
• Thanks for providing this solution @MikeRoberts. Please update to mention that you need to import org.apache.commons.math3.stat.descriptive.SummaryStatistics as an external dependency. Jan 6, 2021 at 14:19

I needed something like this in my android project. Thought I might give back Kotlin implementation.

``````/**
* Smoothed zero-score alogrithm shamelessly copied from https://stackoverflow.com/a/22640362/6029703
* Uses a rolling mean and a rolling deviation (separate) to identify peaks in a vector
*
* @param y - The input vector to analyze
* @param lag - The lag of the moving window (i.e. how big the window is)
* @param threshold - The z-score at which the algorithm signals (i.e. how many standard deviations away from the moving mean a peak (or signal) is)
* @param influence - The influence (between 0 and 1) of new signals on the mean and standard deviation (how much a peak (or signal) should affect other values near it)
* @return - The calculated averages (avgFilter) and deviations (stdFilter), and the signals (signals)
*/
fun smoothedZScore(y: List<Double>, lag: Int, threshold: Double, influence: Double): Triple<List<Int>, List<Double>, List<Double>> {
val stats = SummaryStatistics()
// the results (peaks, 1 or -1) of our algorithm
val signals = MutableList<Int>(y.size, { 0 })
// filter out the signals (peaks) from our original list (using influence arg)
val filteredY = ArrayList<Double>(y)
// the current average of the rolling window
val avgFilter = MutableList<Double>(y.size, { 0.0 })
// the current standard deviation of the rolling window
val stdFilter = MutableList<Double>(y.size, { 0.0 })
// init avgFilter and stdFilter
y.take(lag).forEach { s -> stats.addValue(s) }
avgFilter[lag - 1] = stats.mean
stdFilter[lag - 1] = Math.sqrt(stats.populationVariance) // getStandardDeviation() uses sample variance (not what we want)
stats.clear()
//loop input starting at end of rolling window
(lag..y.size - 1).forEach { i ->
//if the distance between the current value and average is enough standard deviations (threshold) away
if (Math.abs(y[i] - avgFilter[i - 1]) > threshold * stdFilter[i - 1]) {
//this is a signal (i.e. peak), determine if it is a positive or negative signal
signals[i] = if (y[i] > avgFilter[i - 1]) 1 else -1
//filter this signal out using influence
filteredY[i] = (influence * y[i]) + ((1 - influence) * filteredY[i - 1])
} else {
//ensure this signal remains a zero
signals[i] = 0
//ensure this value is not filtered
filteredY[i] = y[i]
}
//update rolling average and deviation
(i - lag..i - 1).forEach { stats.addValue(filteredY[it]) }
avgFilter[i] = stats.getMean()
stdFilter[i] = Math.sqrt(stats.getPopulationVariance()) //getStandardDeviation() uses sample variance (not what we want)
stats.clear()
}
return Triple(signals, avgFilter, stdFilter)
}
``````

sample project with verification graphs can be found at github.

If you have got your data in a database table, here is a SQL version of a simple z-score algorithm:

``````with data_with_zscore as (
select
date_time,
value,
value / (avg(value) over ()) as pct_of_mean,
(value - avg(value) over ()) / (stdev(value) over ()) as z_score
from {{tablename}}  where datetime > '2018-11-26' and datetime < '2018-12-03'
)

-- select all
select * from data_with_zscore

-- select only points greater than a certain threshold
select * from data_with_zscore where z_score > abs(2)
``````
• Your code does something else than the algorithm I have proposed. Your query simply calculates z-scores ([data point - mean]/ std), but doesn’t incorporate the logic of my algorithm that ignores past signals when calculating new signal thresholds. You also ignore the three parameters (lag, influence, threshold). Could you revise your answer to incorporate the actual logic? Dec 3, 2018 at 15:31
• Yes, your right. At first I thought I could get away with the above simplified version.. I have since taken your full solution and ported it to C#. See my answer below. When I have more time I will re-visit this SQL version and incorporate your algorithm. By the way, thank you for such a great answer & visual explanation. Dec 4, 2018 at 13:55

I allowed myself to create a javascript version of it. Might it be helpful. The javascript should be direct transcription of the Pseudocode given above. Available as npm package and github repo:

Javascript translation:

``````// javascript port of: https://stackoverflow.com/questions/22583391/peak-signal-detection-in-realtime-timeseries-data/48895639#48895639

function sum(a) {
return a.reduce((acc, val) => acc + val)
}

function mean(a) {
return sum(a) / a.length
}

function stddev(arr) {
const arr_mean = mean(arr)
const r = function(acc, val) {
return acc + ((val - arr_mean) * (val - arr_mean))
}
return Math.sqrt(arr.reduce(r, 0.0) / arr.length)
}

function smoothed_z_score(y, params) {
var p = params || {}
// init cooefficients
const lag = p.lag || 5
const threshold = p.threshold || 3.5
const influence = p.influece || 0.5

if (y === undefined || y.length < lag + 2) {
throw ` ## y data array to short(\${y.length}) for given lag of \${lag}`
}
//console.log(`lag, threshold, influence: \${lag}, \${threshold}, \${influence}`)

// init variables
var signals = Array(y.length).fill(0)
var filteredY = y.slice(0)

var avgFilter = []
var stdFilter = []
//console.log("2: " + stdFilter.toString())

for (var i = lag; i < y.length; i++) {
//console.log(`\${y[i]}, \${avgFilter[i-1]}, \${threshold}, \${stdFilter[i-1]}`)
if (Math.abs(y[i] - avgFilter[i - 1]) > (threshold * stdFilter[i - 1])) {
if (y[i] > avgFilter[i - 1]) {
signals[i] = +1 // positive signal
} else {
signals[i] = -1 // negative signal
}
// make influence lower
filteredY[i] = influence * y[i] + (1 - influence) * filteredY[i - 1]
} else {
signals[i] = 0 // no signal
filteredY[i] = y[i]
}

const y_lag = filteredY.slice(i - lag, i)
avgFilter[i] = mean(y_lag)
stdFilter[i] = stddev(y_lag)
}

return signals
}

module.exports = smoothed_z_score
``````
• By now, I have ported some other algorithm to javascript. This time from numercial pyhon, which give me more control and works better for me. Also packaged in npm and you can find more info on the algo from washington state university on their jupyter page the have for it. npmjs.com/package/@joe_six/duarte-watanabe-peak-detection Oct 24, 2019 at 9:53

If the boundary value or other criteria depends on future values, then the only solution (without a time-machine, or other knowledge of future values) is to delay any decision until one has sufficient future values. If you want a level above a mean that spans, for example, 20 points, then you have to wait until you have at least 19 points ahead of any peak decision, or else the next new point could completely throw off your threshold 19 points ago.

Added: If the statistical distribution of the peak heights could be heavy tailed, instead of Uniform or Gaussian, then you may need to wait until you see several thousand peaks before it starts to become unlikely that a hidden Pareto distribution won't produce a peak many times larger than any you currently have seen before or have in your current plot. Unless you somehow know in advance that the very next point can't be 1e20, it could appear, which after rescaling your plot's Y dimension, would be flat up until that point.

• Like I said before, we can assume that IF a peak occurs, it is as large as the peaks in the picture and deviates significantly from the 'normal' values. Mar 24, 2014 at 9:53
• If you know how large the peaks will be in advance, then pre-set your mean and/or threshold to just under that value. Mar 24, 2014 at 15:00
• And that's exactly what I don't know in advance. Mar 24, 2014 at 15:25
• You just contradicted yourself and wrote that the peaks are known to be the size in the picture. Either you know that or you don't. Mar 24, 2014 at 15:41
• I'm trying to explain it to you. You get the idea now right? 'How to identify significantly large peaks'. You can approach the problem either statistically or with a smart algorithm. With `.. As large as in the picture` I meant: for similar situations where there are significant peaks and basic noise. Mar 24, 2014 at 15:59

I think that delica's Python anwser has a bug in it. I can't comment on his post since I do not have the rep to do it and the edit queue is full so I am probably not the first one to notice it.

avgFilter[lag - 1] and stdFilter[lag - 1] are set in the init and then are being set again when lag == i instead of changing the [lag] value. This result to the first signal to always be 1.

Here is the code with the minor correction :

``````import numpy as np

class real_time_peak_detection():
def __init__(self, array, lag, threshold, influence):
self.y = list(array)
self.length = len(self.y)
self.lag = lag
self.threshold = threshold
self.influence = influence
self.signals = [0] * len(self.y)
self.filteredY = np.array(self.y).tolist()
self.avgFilter = [0] * len(self.y)
self.stdFilter = [0] * len(self.y)
self.avgFilter[self.lag - 1] = np.mean(self.y[0:self.lag]).tolist()
self.stdFilter[self.lag - 1] = np.std(self.y[0:self.lag]).tolist()

def thresholding_algo(self, new_value):
self.y.append(new_value)
i = len(self.y) - 1
self.length = len(self.y)
if i < self.lag:
return 0
elif i == self.lag:
self.signals = [0] * len(self.y)
self.filteredY = np.array(self.y).tolist()
self.avgFilter = [0] * len(self.y)
self.stdFilter = [0] * len(self.y)
self.avgFilter[self.lag] = np.mean(self.y[0:self.lag]).tolist()
self.stdFilter[self.lag] = np.std(self.y[0:self.lag]).tolist()
return 0

self.signals += [0]
self.filteredY += [0]
self.avgFilter += [0]
self.stdFilter += [0]

if abs(self.y[i] - self.avgFilter[i - 1]) > self.threshold * self.stdFilter[i - 1]:
if self.y[i] > self.avgFilter[i - 1]:
self.signals[i] = 1
else:
self.signals[i] = -1

self.filteredY[i] = self.influence * self.y[i] + (1 - self.influence) * self.filteredY[i - 1]
self.avgFilter[i] = np.mean(self.filteredY[(i - self.lag):i])
self.stdFilter[i] = np.std(self.filteredY[(i - self.lag):i])
else:
self.signals[i] = 0
self.filteredY[i] = self.y[i]
self.avgFilter[i] = np.mean(self.filteredY[(i - self.lag):i])
self.stdFilter[i] = np.std(self.filteredY[(i - self.lag):i])

return self.signals[i]
``````

The function `scipy.signal.find_peaks`, as its name suggests, is useful for this. But it's important to understand well its parameters `width`, `threshold`, `distance` and above all `prominence` to get a good peak extraction.

According to my tests and the documentation, the concept of prominence is "the useful concept" to keep the good peaks, and discard the noisy peaks.

What is (topographic) prominence? It is "the minimum height necessary to descend to get from the summit to any higher terrain", as it can be seen here:

The idea is:

The higher the prominence, the more "important" the peak is.

This z-scores method is quite effective at peak detection, which is also helpful for outlier removal. Outlier conversations frequently debate statistical value of each point and ethics of changing data.

But in the case of repeated, erroneous sensor values from error-prone serial communications or an error-prone sensor, there is no statistical value in errors, or spurious readings. They need to be identified and removed.

Visually the errors are obvious. The straight lines across the plot below shows what needs removing. But identifying and removing errors with an algorithm is quite challenging. Z-scores work well.

The figure below has values acquired from a sensor via serial communications. Occasional serial communication errors, sensor error or both lead to repeated, clearly erroneous data points.

The z-score peak detector was able to signal on spurious data points and generated a clean resulting data set while preserving the features of the correct data:

• Very nice application! Thanks for sharing! Did you transform the data before inputting it to the algo? If so, what transformation did you use exactly? Feel free to share a link to your paper or research document if (or when) publicly available; I’ll then add a link to your research to my list of references. Happy coding! :) Aug 2, 2020 at 16:02
• there was no transformation. the top subplot is the original data set from the data acquisition setup. The additional Matlab code was about 2 lines to extract the data set that did not trigger the signal. find indices of untouched data points: `idx_zero=find(signals==0);` then the data is extracted with `y_filtered = y(idx_zero)` Aug 2, 2020 at 23:52
• I've spent hours with manually filtering spurious data points from data acquisition systems and have never found a satisfactory general algorithm until discovering this. the separate states to filter new points without changing the average with spurious data points is the key here. Z-scores for sure, but the independent filter state is critical Aug 2, 2020 at 23:57
• Glad to hear that! Indeed, the separate state for the signaling threshold is they key to making this algo very robust :) Interesting to read that you didn’t even need to transform the data, I expected you would need to apply a first-differencing filter before applying the algo but apparently that is not even needed! Very cool :) Aug 3, 2020 at 6:48
• that type of tinkering is what is typical but tedious and custom every time. avoiding that illustrates the value of this algorithm. there is not much discussion in this thread about outlier removal, but this is how I've found it's best utility. Aug 3, 2020 at 12:37

And here comes the PHP implementation of the ZSCORE algo:

``````<?php
\$y = array(1,7,1.1,1,0.9,1,1,1.1,1,0.9,1,1.1,1,1,0.9,1,1,1.1,1,1,1,1,1.1,0.9,1,1.1,1,1,0.9,
1,1.1,1,1,1.1,1,0.8,0.9,1,1.2,0.9,1,1,1.1,1.2,1,1.5,10,3,2,5,3,2,1,1,1,0.9,1,1,3,
2.6,4,3,3.2,2,1,1,0.8,4,4,2,2.5,1,1,1);

function mean(\$data, \$start, \$len) {
\$avg = 0;
for (\$i = \$start; \$i < \$start+ \$len; \$i ++)
\$avg += \$data[\$i];
return \$avg / \$len;
}

function stddev(\$data, \$start,\$len) {
\$mean = mean(\$data,\$start,\$len);
\$dev = 0;
for (\$i = \$start; \$i < \$start+\$len; \$i++)
\$dev += ((\$data[\$i] - \$mean) * (\$data[\$i] - \$mean));
return sqrt(\$dev / \$len);
}

function zscore(\$data, \$len, \$lag= 20, \$threshold = 1, \$influence = 1) {

\$signals = array();
\$avgFilter = array();
\$stdFilter = array();
\$filteredY = array();
\$avgFilter[\$lag - 1] = mean(\$data, 0, \$lag);
\$stdFilter[\$lag - 1] = stddev(\$data, 0, \$lag);

for (\$i = 0; \$i < \$len; \$i++) {
\$filteredY[\$i] = \$data[\$i];
\$signals[\$i] = 0;
}

for (\$i=\$lag; \$i < \$len; \$i++) {
if (abs(\$data[\$i] - \$avgFilter[\$i-1]) > \$threshold * \$stdFilter[\$lag - 1]) {
if (\$data[\$i] > \$avgFilter[\$i-1]) {
\$signals[\$i] = 1;
}
else {
\$signals[\$i] = -1;
}
\$filteredY[\$i] = \$influence * \$data[\$i] + (1 - \$influence) * \$filteredY[\$i-1];
}
else {
\$signals[\$i] = 0;
\$filteredY[\$i] = \$data[\$i];
}

\$avgFilter[\$i] = mean(\$filteredY, \$i - \$lag, \$lag);
\$stdFilter[\$i] = stddev(\$filteredY, \$i - \$lag, \$lag);
}
return \$signals;
}

\$sig = zscore(\$y, count(\$y));

print_r(\$y); echo "<br><br>";
print_r(\$sig); echo "<br><br>";

for (\$i = 0; \$i < count(\$y); \$i++) echo \$i. " " . \$y[\$i]. " ". \$sig[\$i]."<br>";
``````
• One comment: given that this algorithm will mostly be used on sampled data, I suggest you implement the sample standard deviation by dividing by `(\$len - 1)` instead of `\$len` in `stddev()` Jan 10, 2020 at 20:56