# Find large number of consecutive values fulfilling condition in a numpy array

I have some audio data loaded in a numpy array and I wish to segment the data by finding silent parts, i.e. parts where the audio amplitude is below a certain threshold over a a period in time.

An extremely simple way to do this is something like this:

``````values = ''.join(("1" if (abs(x) < SILENCE_THRESHOLD) else "0" for x in samples))
pattern = re.compile('1{%d,}'%int(MIN_SILENCE))
for match in pattern.finditer(values):
# code goes here
``````

The code above finds parts where there are at least MIN_SILENCE consecutive elements smaller than SILENCE_THRESHOLD.

Now, obviously, the above code is horribly inefficient and a terrible abuse of regular expressions. Is there some other method that is more efficient, but still results in equally simple and short code?

Here's a numpy-based solution.

I think (?) it should be faster than the other options. Hopefully it's fairly clear.

However, it does require a twice as much memory as the various generator-based solutions. As long as you can hold a single temporary copy of your data in memory (for the diff), and a boolean array of the same length as your data (1-bit-per-element), it should be pretty efficient...

``````import numpy as np

def main():
# Generate some random data
x = np.cumsum(np.random.random(1000) - 0.5)
condition = np.abs(x) < 1

# Print the start and stop indices of each region where the absolute
# values of x are below 1, and the min and max of each of these regions
for start, stop in contiguous_regions(condition):
segment = x[start:stop]
print start, stop
print segment.min(), segment.max()

def contiguous_regions(condition):
"""Finds contiguous True regions of the boolean array "condition". Returns
a 2D array where the first column is the start index of the region and the
second column is the end index."""

# Find the indicies of changes in "condition"
d = np.diff(condition)
idx, = d.nonzero()

# We need to start things after the change in "condition". Therefore,
# we'll shift the index by 1 to the right.
idx += 1

if condition:
# If the start of condition is True prepend a 0
idx = np.r_[0, idx]

if condition[-1]:
# If the end of condition is True, append the length of the array
idx = np.r_[idx, condition.size] # Edit

# Reshape the result into two columns
idx.shape = (-1,2)
return idx

main()
``````
• This results in an impressive 20x speedup! It doesn't take into account the minimum length, but that's fairly easy to add. Only problem is the increased memory usage which makes it infeasible to use in some situation, so I think I will make use of this by default and add an option to use another algorithm when low on memory. Dec 21, 2010 at 5:46
• With numpy 1.9, I get a `DeprecationWarning: numpy boolean subtract (the binary - operator) is deprecated` using np.diff on the boolean condition. I replaced this line with `d = np.subtract(condition[1:], condition[:-1], dtype=np.float)` to avoid the issue. Sep 29, 2014 at 15:30
• @daryl - Thanks for noticing the change! It might be clearer to do `d = np.diff(condition.astype(int))` instead, though that's mostly a matter of personal preference. Sep 29, 2014 at 19:10
• Update on the deprecation: `numpy.diff` got specific defined behaviour for bools, which keeps this working, and it no longer shows a warning. So it appears safe to use the code in the answer again without the modifications from comments. Discussion here: github.com/numpy/numpy/issues/9251 Jun 24, 2018 at 17:29
• Just a heads up - I use part of your code with attributation for an answer to another question - see https://stackoverflow.com/a/58039852/7505395 Sep 21, 2019 at 11:34

There is a very convenient solution to this using `scipy.ndimage`. For an array:

``````a = np.array([1, 1, 1, 1, 0, 0, 0, 1, 1, 1, 0])
``````

which can be the result of a condition applied to another array, finding the contiguous regions is as simple as:

``````regions = scipy.ndimage.find_objects(scipy.ndimage.label(a))
``````

Then, applying any function to those regions can be done e.g. like:

``````[np.sum(a[r]) for r in regions]
``````

Slightly sloppy, but simple and fast-ish, if you don't mind using scipy:

``````from scipy.ndimage import gaussian_filter
sigma = 3
threshold = 1
above_threshold = gaussian_filter(data, sigma=sigma) > threshold
``````

The idea is that quiet portions of the data will smooth down to low amplitude, and loud regions won't. Tune 'sigma' to affect how long a 'quiet' region must be; tune 'threshold' to affect how quiet it must be. This slows down for large sigma, at which point using FFT-based smoothing might be faster.

This has the added benefit that single 'hot pixels' won't disrupt your silence-finding, so you're a little less sensitive to certain types of noise.

I haven't tested this but you it should be close to what you are looking for. Slightly more lines of code but should be more efficient, readable, and it doesn't abuse regular expressions :-)

``````def find_silent(samples):
num_silent = 0
start = 0
for index in range(0, len(samples)):
if abs(samples[index]) < SILENCE_THRESHOLD:
if num_silent == 0:
start = index
num_silent += 1
else:
if num_silent > MIN_SILENCE:
yield samples[start:index]
num_silent = 0
if num_silent > MIN_SILENCE:
yield samples[start:]

for match in find_silent(samples):
# code goes here
``````
• Your code looks good, except that if the piece of silence is at the end of samples, then it won't be found. You need to check after the for loop for it. Dec 20, 2010 at 22:48

This should return a list of `(start,length)` pairs:

``````def silent_segs(samples,threshold,min_dur):
start = -1
silent_segments = []
for idx,x in enumerate(samples):
if start < 0 and abs(x) < threshold:
start = idx
elif start >= 0 and abs(x) >= threshold:
dur = idx-start
if dur >= min_dur:
silent_segments.append((start,dur))
start = -1
return silent_segments
``````

And a simple test:

``````>>> s = [-1,0,0,0,-1,10,-10,1,2,1,0,0,0,-1,-10]
>>> silent_segs(s,2,2)
[(0, 5), (9, 5)]
``````
• This seems to be about 25% faster than the regexp-based solution. Nice. Now it only takes 9 minutes :-) Dec 20, 2010 at 23:23

another way to do this quickly and concisely:

``````import pylab as pl

v=[0,0,1,1,0,0,1,1,1,1,1,0,1,0,1,1,0,0,0,0,0,1,0,0]
vd = pl.diff(v)
#vd[i]==1 for 0->1 crossing; vd[i]==-1 for 1->0 crossing
#need to add +1 to indexes as pl.diff shifts to left by 1

i1=pl.array([i for i in xrange(len(vd)) if vd[i]==1])+1
i2=pl.array([i for i in xrange(len(vd)) if vd[i]==-1])+1

#corner cases for the first and the last element
if v==1:
i1=pl.hstack((0,i1))
if v[-1]==1:
i2=pl.hstack((i2,len(v)))
``````

now i1 contains the beginning index and i2 the end index of 1,...,1 areas

@joe-kington I've got about 20%-25% speed improvement over `np.diff / np.nonzero` solution by using `argmax` instead (see code below, `condition` is boolean)

``````def contiguous_regions(condition):
idx = []
i = 0
while i < len(condition):
x1 = i + condition[i:].argmax()
try:
x2 = x1 + condition[x1:].argmin()
except:
x2 = x1 + 1
if x1 == x2:
if condition[x1] == True:
x2 = len(condition)
else:
break
idx.append( [x1,x2] )
i = x2
return idx
``````

Besides, I'm not entirely sure, but i guess numpy may optimize `argmin/argmax` over boolean arrays to stop searching on first `True/False` occurrence. That might explain it.
``````np.convolve(sig > threshold, np.ones((cons_samples)), 'same') == cons_samples
Where `cons_samples` is the number of consecutive samples you require above threshold