# How can I vectorize this simple algorithm with numpy?

Or are truly iterative algorithms like this not vectorizable?

s += usage can be vectorized with cumsum, but the floor on the sum is problematic.

Is there some fancy way to use lags or shifting?

``````s = 0
for (time, usage) in timeseries:
s += usage
s = max(s-rate, 0)
new_timeseries[time] = s
``````

I pryed away at it for a while but couldn't come up with anything.

-

Put `timeseries` into an array first. Let's assume the values of `timeseries` are `my_array`. Then,

``````import numpy as np
s = np.cumsum(my_array) - rate
s[s < 0] = 0
new_timeseries = s
``````

UPDATE: this is not right. It doesn't account for zeroing the `cumsum` when `s` the increment is below the rate. You can find the points where the `cumsum` is below rate with the derivative:

``````In [1]: dd = np.diff(np.cumsum(my_array))
In [2]: dd < rate
Out[3]: array([ True, False, True, False, False, True, True,
True, True, False, True, False, True, False,
True, True, True, False, False], dtype=bool)
``````

However, this doesn't 'reset' the `cumsum`. One could hunt along those indices and do a `cumsum` in blocks of 'Trues', but I'm not sure if it would be more efficient than your loop.

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it seems to be incorrect. It overestimates sums that follow `s < rate` sums. –  J.F. Sebastian Dec 13 '12 at 4:33
@J.F.Sebastian, you are right, I missed that part. Even my latest edit is not right. –  tiago Dec 13 '12 at 4:50
usage is always > 0, i should have mentioned. np.diff(np.cumsum(a)) = a no? this doesn't quite seem complete (which you acknowledge in your answer). i hadn't seen np.diff before though thanks. –  corsair Dec 13 '12 at 21:14