# Conditional sum over matrices in python/numpy

I have two numpy arrays `X` and `W` each with shape `(N,N)` that result from the end of a calculation. Subdivide the range of `X` into equal intervals `[min(X), min(X)+delta, min(X)+2*delta,..., max(X)]`. I'd like to know, given an interval starting point `v`, the total of the corresponding `W` values:

``````idx = (X>=v) & (X<(v+delta))
W[idx].sum()
``````

I need this sum for all starting intervals (ie. the entire range of `X`) and I need to do this for many different matrices `X` and `W`. Profiling has determined that this is the bottleneck. What I'm doing now amounts to:

``````W_total = []
for v0, v1 in zip(X, X[1:]):
idx = (X>=x0) & (X<x1)
W_total.append( W[idx].sum() )
``````

How can I speed this up?

-

You can use `numpy.histogram()` to compute all those sums in a single operation:

``````sums, bins = numpy.histogram(
X, bins=numpy.arange(X.min(), X.max(), delta), weights=W)
``````
-

Have you tried numpy.histogram?

``````nbins = (X.max() - X.min()) / delta
W_total = np.histogram(X, weights=W, bins=nbins)
``````
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