7

I'm trying to create a data frame where a column exists that holds values representing the length of runs of positive and negative numbers, like so:

Time  V  Length
0.5  -2  1.5
1.0  -1  1.5
1.5   0  0.0
2.0   2  1.0
2.5   0  0.0
3.0   1  1.75
3.5   2  1.75
4.0   1  1.75
4.5  -1  0.75
5.0  -3  0.75

The Length column sums the length of time that the value has been positive or negative. Zeros are given a 0 since they are an inflection point. If there is no zero separating the sign change, the values are averaged on either side of the inflection.

I am trying to approximate the amount of time that these values are spending either positive or negative. I've tried this with a for loop with varying degrees of success, but I would like to avoid looping because I am working with extremely large data sets.

I've spent some time looking at sign and diff as they are used in this question about sign changes. I've also looked at this question that uses transform and aggregate to sum consecutive duplicate values. I feel like I could use this in combination with sign and/or diff, but I'm not sure how to retroactively assign these sums to the ranges that created them or how to deal with spots where I'm taking the average across the inflection.

Any suggestions would be appreciated. Here is the sample dataset:

dat <- data.frame(Time = seq(0.5, 5, 0.5), V = c(-2, -1, 0, 2, 0, 1, 2, 1, -1, -3))
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  • Can you give the solution to your posted dataset?!
    – David
    Nov 10 '16 at 22:43
  • 1
    @David I believe the Length column is the solution to the posted dataset. Nov 10 '16 at 22:47
  • 1
    @David: I made that dataset "by hand" based on the rules I listed; it is what I would like the final solution to look like, but with sample sizes in the hundreds of thousands, I can't do the whole thing by hand.
    – hfisch
    Nov 10 '16 at 22:48
  • 1
    Did I get it correct: 1.5 (row 1 and 2) is sum(Time[c(0,1)])? Then 0 because V[3] == 0? But why is do we get 1 then and not 2 (Time[4])?
    – David
    Nov 10 '16 at 23:12
  • 3
    @David, no rows 1 and 2 aren't 1.5 because it's the sum of the first two Times, it's the duration (beginning from Time = 0) that V is negative until V is 0. Everything is differences between 0s. If you look at plot(dat$Time, dat$V, type = "l") OP wants the x-distance between the 0s. Nov 11 '16 at 6:37
3

This works, at least for your test case. And it should be pretty efficient. It makes some assumptions, I'll try to point out the big ones.

First we extract the vectors and stick 0s on the beginning. We also set the last V to 0. The calculation will be based on time differences between 0s, so we need to start and end with 0s. Your example seems to tacitly assume V = 0 at Time = 0, hence the initial 0, and it stops abruptly at the maximum time, so we set V = 0 there as well:

Time = c(0, dat$Time)
V = c(0, dat$V)
V[length(V)] = 0

To fill in the skipped 0s, we use approx to do linear approximation on sign(V). It also assumes that your sampling frequency is regular, so we can get away with doubling the frequency to get all the missing 0s.

ap = approx(Time, sign(V), xout = seq(0, max(Time), by = 0.25))

The values we want to fill in are the durations between the 0s, both observed and approximated. In the correct order, these are:

dur = diff(ap$x[ap$y == 0])

Lastly, we need the indices of the original data to fill in the durations. This is the hackiest part of this answer, but it seem to work. Maybe someone will suggest a nice simplification.

# first use rleid to get the sign groupings
group = data.table::rleid(sign(dat$V))

# then we need to set the groups corresponding to 0 values to 0
# and reduce any group numbers following 0s correspondingly
# lastly we add 1 to everything so that we can stick 0 at the
# front of our durations and assign those to the 0 V values
ind = (group - cumsum(dat$V == 0)) * (dat$V != 0) + 1

# fill it in
dat$Length = c(0, dur)[ind]
dat
#    Time  V Length
# 1   0.5 -2   1.50
# 2   1.0 -1   1.50
# 3   1.5  0   0.00
# 4   2.0  2   1.00
# 5   2.5  0   0.00
# 6   3.0  1   1.75
# 7   3.5  2   1.75
# 8   4.0  1   1.75
# 9   4.5 -1   0.75
# 10  5.0 -3   0.75
2
  • All of your assumptions were correct. Your solution works for the sample dataset, but it seems to break down with approx for more complicated datasets: see data.frame(Time = seq(0.001, 0.01, 0.001), V = c(-0.002, -0.002, -0.002, 0, -0.001, -0.001, -0.002, -0.001, -0.001, -0.001)) as an example of where approx does not take into account the zero crossing.
    – hfisch
    Nov 11 '16 at 17:01
  • But there is no zero crossing in that example, just a quick zero touch and then back to negative. If you adjust the by = 0.25 to by = (Time[2] - Time[1]) / 2 it will generalize to any regular frequency, and at least for this comment example still looks correct... Nov 11 '16 at 17:07
3

First find indices of "Time" which need to be interpolated: consecutive "V" which lack a zero between positive and negative values; they have an abs(diff(sign(V)) equal to two.

id <- which(abs(c(0, diff(sign(dat$V)))) == 2)

Add rows with average "Time" between relevant indices and corresponding "V" values of zero to the original data. Also add rows of "V" = 0 at "Time" = 0 and at last time step (according to the assumptions mentioned by @Gregor). Order by "Time".

d2 <- rbind(dat,
            data.frame(Time = (dat$Time[id] + dat$Time[id - 1])/2, V = 0),
            data.frame(Time = c(0, max(dat$Time)), V = c(0, 0))
            )
d2 <- d2[order(d2$Time), ]

Calculate time differences between time steps which are zero and replicate them using "zero-group indices".

d2$Length <- diff(d2$Time[d2$V == 0])[cumsum(d2$V == 0)]

Add values to original data:

merge(dat, d2)

#    Time  V Length
# 1   0.5 -2   1.50
# 2   1.0 -1   1.50
# 3   1.5  0   1.00
# 4   2.0  2   1.00
# 5   2.5  0   1.75
# 6   3.0  1   1.75
# 7   3.5  2   1.75
# 8   4.0  1   1.75
# 9   4.5 -1   0.75
# 10  5.0 -3   0.75

Set "Length" to 0 where V == 0.

1
  • This worked flawlessly for both the sample dataset and for my real dataset of 400,000 points. Less than 4 seconds runtime.
    – hfisch
    Nov 11 '16 at 16:55
2

It took me longer than I care to admit, but here is my solution.

Because you said you wanted to use it on large datasets (thus speed matters) I use Rcpp to write a loop that does all the checking. For speed comparisons I also create another sample dataset with 500,000 data.points and check the speed (I tried to compare to the other datasets but couldn't translate them to data.table (without that it would be an unfair comparison...)). If supplied, I will gladly update the speed-comparisons!

Part 1: My solution

My solution looks like this:

(in length_time.cpp)

#include <Rcpp.h>
using namespace Rcpp;

// [[Rcpp::export]]
NumericVector length_time(NumericVector time, NumericVector v) {
  double start = 0;
  double time_i, v_i;
  bool last_positive = v[0] > 0;
  bool last_negative = v[0] < 0;
  int length_i = time.length();
  NumericVector ret_vec(length_i);

  for (int i = 0; i < length_i; ++i) {
    time_i = time[i];
    v_i = v[i];

    if (v_i == 0) { // injection
      if (i > 0) { // if this is not the beginning, then a regime has ended!
        ret_vec[i - 1] = time_i - start;
        start = time_i;
      }
    } else if ((v_i > 0 && last_negative) || (v_i < 0 && last_positive)) { 
      ret_vec[i - 1] = (time_i + time[i - 1]) / 2 - start;
      start = (time_i + time[i - 1]) / 2;
    }

    last_positive = v_i > 0;
    last_negative = v_i < 0;
  }
  ret_vec[length_i - 1] = time[length_i - 1] - start;

  // ret_vec now only has the values for the last observation
  // do something like a reverse na_locf...
  double tmp_val = ret_vec[length_i - 1];
  for (int i = length_i - 1; i >= 0; --i) {
    if (v[i] == 0) {
      ret_vec[i] = 0;
    } else if (ret_vec[i] == 0){
      ret_vec[i] = tmp_val;
    } else {
      tmp_val = ret_vec[i];
    }
  }
  return ret_vec;
}

and then in an R-file (i.e., length_time.R):

library(Rcpp)
# setwd("...") #to find the .cpp-file
sourceCpp("length_time.cpp")

dat$Length <- length_time(dat$Time, dat$V)
dat
# Time  V Length
# 1   0.5 -2   1.50
# 2   1.0 -1   1.50
# 3   1.5  0   0.00
# 4   2.0  2   1.00
# 5   2.5  0   0.00
# 6   3.0  1   1.75
# 7   3.5  2   1.75
# 8   4.0  1   1.75
# 9   4.5 -1   0.75
# 10  5.0 -3   0.75

Which seems to work on the sample dataset.

Part 2: Testing for Speed

library(data.table)
library(microbenchmark)
n <- 10000
set.seed(1235278)
dt <- data.table(time = seq(from = 0.5, by = 0.5, length.out = n),
                 v = cumsum(round(rnorm(n, sd = 1))))

dt[, chg := v >= 0 & shift(v, 1, fill = 0) <= 0]
plot(dt$time, dt$v, type = "l")
abline(h = 0)
for (i in dt[chg == T, time]) abline(v = i, lty = 2, col = "red")

Which results in a dataset with 985 observations (crossings).

length_time

Testing the speed with microbenchmark results in

microbenchmark(dt[, length := length_time(time, v)])
# Unit: milliseconds
# expr      min     lq     mean   median       uq      max neval
# dt[, `:=`(length, length_time(time, v))] 2.625714 2.7184 3.054021 2.817353 3.077489 5.235689   100

Resulting in about 3 milliseconds for calculating with 500,000 observations.

Does that help you?

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  • 1
    Wow!!! incredible Rcpp implementation. I too spent an embarrassing amount of time on my solution. The cases with repeating zeros gave me the most trouble. Also, when I compared your solution, I simply wrapped the call to length_time in a function like so: David <- function(df) {df$Length <- length_time(df$Time, df$V); df}. I hope that's okay. Nov 11 '16 at 20:10
  • That works totally fine. It might loose a tiny bit as compared to data.table, but that should be in this case negligible.
    – David
    Nov 11 '16 at 20:44
2

Here is my attempt done completely in base R.

Joseph <- function(df) {
    is.wholenumber <- function(x, tol = .Machine$double.eps^0.5)  abs(x - round(x)) < tol

    v <- df$V
    t <- df$Time
    sv <- sign(v)
    nR <- length(v)
    v0 <- which(v==0)

    id <- which(abs(c(0, diff(sv))) > 1)  ## This line and (t[id] + t[id - 1L])/2 From @Henrik
    myZeros <- sort(c(v0*t[1L], (t[id] + t[id - 1L])/2))
    lenVals <- diff(c(0,myZeros,t[nR]))   ## Actual values that 
                             ## will populate the Length column

    ## remove values that result from repeating zeros from the df$V column
    lenVals <- lenVals[lenVals != t[1L] | c(!is.wholenumber(myZeros/t[1L]),F)]

    ## Below we need to determine how long to replicate
    ## each of the lenVals above, so we need to find
    ## the starting place and length of each run...
    ## rle is a great candidate for both of these
    m <- rle(sv)        
    ml <- m$lengths
    cm <- cumsum(ml)
    zm <- m$values != 0   ## non-zero values i.e. we won't populate anything here
    rl <- m$lengths[zm]   ## non-zero run-lengths
    st <- cm[zm] - rl + 1L    ## starting index
    out <- vector(mode='numeric', length = nR)
    for (i in 1:length(st)) {out[st[i]:(st[i]+rl[i]-1L)] <- lenVals[i]}
    df$Length <- out
    df
}

Here is the output of the given example:

Joseph(dat)
   Time  V Length
1   0.5 -2   1.50
2   1.0 -1   1.50
3   1.5  0   0.00
4   2.0  2   1.00
5   2.5  0   0.00
6   3.0  1   1.75
7   3.5  2   1.75
8   4.0  1   1.75
9   4.5 -1   0.75
10  5.0 -3   0.75

Here is a larger example:

set.seed(142)
datBig <- data.frame(Time=seq(0.5,50000,0.5), V=sample(-3:3, 10^5, replace=TRUE))

library(compiler)
library(data.table)
library(microbenchmark)

c.Joseph <- cmpfun(Joseph)
c.Henrik <- cmpfun(Henrik)
c.Gregor <- cmpfun(Gregor)

    microbenchmark(c.Joseph(datBig), c.Gregor(datBig), c.Henrik(datBig), David(datBig), times = 10)
Unit: milliseconds
            expr        min         lq       mean     median         uq       max neval cld
   David(datBig)    2.20602   2.617742    4.35927   2.788686    3.13630 114.0674    10  a
c.Joseph(datBig)   61.91015   62.62090   95.44083   64.43548   93.20945  225.4576    10   b 
c.Gregor(datBig)   59.25738   63.32861  126.29857   72.65927  214.35961  229.5022    10   b 
 c.Henrik(datBig) 1511.82449 1678.65330 1727.14751 1730.24842 1816.42601 1871.4476    10   c

As @Gregor pointed out, the goal is to find the x-distance between each occurrence of zero. This can be seen visually by plotting (again, as pointed out by @Gregor (many kudos btw)). For example, if we plot the first 20 values of datBig, we obtain: enter image description here

From this, we can see that the x-distances such that the graph is either positive or negative (i.e. not zero (this happens when there are repeats of zeros)) are approximately:

2.0, 1.25, 0.5, 0.75, 2.0, 1.0, 0.75, 0.5

t1 <- c.Joseph(datBig)
t2 <- c.Gregor(datBig)
t3 <- c.Henrik(datBig)
t4 <- David(datBig)

 ##  Correct values according to the plot above (x above a value indicates incorrect value)
 ##  2.00 2.00 2.00 0.00 1.25 1.25 0.50 0.75 0.00 0.00 2.00 2.00 2.00 0.00 0.00 0.00 1.00 0.00 0.75 0.50

 ## all correct
 t1$Length[1:20]  
 [1] 2.00 2.00 2.00 0.00 1.25 1.25 0.50 0.75 0.00 0.00 2.00 2.00 2.00 0.00 0.00 0.00 1.00 0.00 0.75 0.50

 ## mostly correct
 t2$Length[1:20]                                         x    x    x                   x             x
 [1] 2.00 2.00 2.00 0.00 1.25 1.25 0.50 0.75 0.00 0.00 0.75 0.75 0.75 0.00 0.00 0.00 0.50 0.00 0.75 0.25

 ## least correct
 t3$Length[1:20]      x    x         x    x         x    x    x    x    x               x   x    x    x
 [1] 2.00 2.00 2.00 0.50 1.00 1.25 0.75 1.25 0.00 1.75 1.75 0.00 1.50 1.50 0.00 0.00 1.25 1.25 1.25 1.25

 ## all correct
 t4$Length[1:20]  
 [1] 2.00 2.00 2.00 0.00 1.25 1.25 0.50 0.75 0.00 0.00 2.00 2.00 2.00 0.00 0.00 0.00 1.00 0.00 0.75 0.50

# agreement with David's solution
all.equal(t4$Length, t1$Length)
[1] TRUE

Well, it seems the Rcpp solution provided by David is not only accurate but blazing fast.

3
  • Very nice speed comparisons! Thanks for that. I wonder if you can in some way replace your for-loop?! That might further increase the speed of your answer.
    – David
    Nov 11 '16 at 20:17
  • Also, nice catch with the compiler-trick! Thats usually a good boost!
    – David
    Nov 11 '16 at 20:18
  • @David The for-loop is definitely the bottleneck. If you comment it out, it runs over twice as fast. I've tried many alternatives, but they were all very clunky. I'll bet there is a nicer way to do it. Nov 11 '16 at 20:35

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