# Calculating cumulative minimum with numpy arrays

I'd like to calculate the "cumulative minimum" array--basically, the minimum value of an array up to each index such as:

import numpy as np
nums = np.array([5.,3.,4.,2.,1.,1.,2.,0.])
cumulative_min = np.zeros(nums.size, dtype=float)
for i,num in enumerate(nums):
cumulative_min[i] = np.min(nums[0:i+1])

This works (it returns the correct array([ 5., 3., 3., 2., 1., 1., 1., 0.]) ), but I'd like to avoid the for loop if I can. I thought it might be faster to construct a 2-d array and use the np.amin() function, but I needed a loop for that as well.

For any 2-argument NumPy universal function, its accumulate method is the cumulative version of that function. Thus, numpy.minimum.accumulate is what you're looking for:

>>> numpy.minimum.accumulate([5,4,6,10,3])
array([5, 4, 4, 4, 3])

Create a matrix which lower triangle (np.tril) is filled with values of your array nums and your upper triangle (np.triu, with second parameter 1, so the diagonal stays free) is filled with the maximum of the array. (EDIT: instead of the maximum, the first element of the array is the better way. -> comments)

nums = np.array([5.,3.,4.,2.,1.,1.,2.,0.])
oneSquare = np.ones((nums.size, nums.size))

A = nums * np.tril(oneSquare)
B = np.triu(oneSquare, 1) * nums[0]
A, B

Out:

(array([[ 5.,  0.,  0.,  0.,  0.,  0.,  0.,  0.],
[ 5.,  3.,  0.,  0.,  0.,  0.,  0.,  0.],
[ 5.,  3.,  4.,  0.,  0.,  0.,  0.,  0.],
[ 5.,  3.,  4.,  2.,  0.,  0.,  0.,  0.],
[ 5.,  3.,  4.,  2.,  1.,  0.,  0.,  0.],
[ 5.,  3.,  4.,  2.,  1.,  1.,  0.,  0.],
[ 5.,  3.,  4.,  2.,  1.,  1.,  2.,  0.],
[ 5.,  3.,  4.,  2.,  1.,  1.,  2.,  0.]]),
array([[ 0.,  5.,  5.,  5.,  5.,  5.,  5.,  5.],
[ 0.,  0.,  5.,  5.,  5.,  5.,  5.,  5.],
[ 0.,  0.,  0.,  5.,  5.,  5.,  5.,  5.],
[ 0.,  0.,  0.,  0.,  5.,  5.,  5.,  5.],
[ 0.,  0.,  0.,  0.,  0.,  5.,  5.,  5.],
[ 0.,  0.,  0.,  0.,  0.,  0.,  5.,  5.],
[ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  5.],
[ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.]]))

Now take the minimum of each row:

(A+B).min(axis=1)

Out:

array([ 5.,  3.,  3.,  2.,  1.,  1.,  1.,  0.])
• You could also use infinity for the values in the upper triangle, rather than nums.max(). May 13, 2014 at 3:50
• @Blckknght Tried it, did not work at first glance, so I took the maximum... I tried again and infinity would change the 0-part of B to NaN May 13, 2014 at 3:52
• nice. Didn't know about the triangle functions, very useful. May 13, 2014 at 3:55
• Ah, you're right. I didn't think of 0*inf being an issue, but it is. You could use nums[0], since that's always a potential minimum value already. And really, using max wasn't too bad (it only adds an O(N)` term onto an already O(N^2) algorithm. May 13, 2014 at 3:59
• @Blckknght nums[0] is a good idea... I am going to change that.. Thanks! May 13, 2014 at 4:02