# How to find nearest value that is greater in numpy array?

I would like to obtain the index of the nearest value in a numpy array which is greater than my search value. Example: `findNearestAbove(np.array([0.,1.,1.4,2.]), 1.5)` should return 3 (the index of 2.).

I know that I can get the nearest index with `np.abs(a-value).argmin()`, and I found out that `min(a[np.where(a-value >= 0.)[0]])` returns the desired array value. Hence, `np.where(a == min(a[np.where(a-value >= 0.)[0]]))[0]` would probably give me the desired index. However, this looks rather convoluted, and I fear that it might break in the case of multi-dimensional arrays. Any suggestions how to improve this?

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And by “nearest” you mean “leftmost”? –  kirelagin Jun 14 '13 at 23:14
Are your arrays always sorted in ascending order? –  ali_m Jun 15 '13 at 0:28
To clarify: "nearest" means "by value". Also: no - the arrays are not necessarily sorted. –  maschu Jun 15 '13 at 20:02

Here is one way (I am assuming that by nearest you mean in terms of value not location)

``````import numpy as np

def find_nearest_above(my_array, target):
diff = my_array - target
# We need to mask the negative differences and zero
# since we are looking for values above
return None # returns None if target is greater than any value
``````

Result:

``````>>> find_nearest_above(np.array([0.,1.,1.4,2.]), 1.5)
3
>>> find_nearest_above(np.array([0.,1.,1.4,-2.]), -1.5)
0
>>> find_nearest_above(np.array([0., 1, 1.4, 2]), 3)
>>>
``````
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This is the fastest solution if the arrays cannot be assumed to be sorted –  ali_m Jun 15 '13 at 20:12
Indeed, this is very charming. There is only one little glitch here: if value is larger than the largest array value, then this function returns an index zero. Hence, one needs an extra check: `ind = masked_diff.argmin() ; if my_array[ind]>=target: ind = None ; return ind`. Or is there a more efficient way to fix this? –  maschu Jun 15 '13 at 20:22
`if not np.any(mask): return` –  ali_m Jun 15 '13 at 20:32
Thank your for the input, I updated my answer. It works properly now. –  Akavall Jun 15 '13 at 22:59

I believe you can use `np.searchsorted` for this:

``````In [15]: np.searchsorted(a,[1.5,],side='right')[0]
Out[15]: 3
``````

assuming `a` is in ascending order.

This method also won't work for multi-dimensional arrays, but I'm not sure exactly how that use case would work in terms of the expected output. If you could give an example of what you imagine, I might be able to adapt this to that purpose.

Note: you could also use `np.digitize` for this purpose, although it executes a linear rather than a binary search, so for certain input sizes, it can be a lot slower than `searchsorted` and requires that `a` be monotonic:

``````In [25]: np.digitize([1.5,], a, right=True)[0]
Out[25]: 3
``````
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Thanks! This may turn out to be helpful later when I am indeed dealing with sorted arrays. The use case is that of geographic coordinates: normally they would be 1-dimensional, but you can also have "curvilinear grids", in which case both longitudes and latitudes are stored as 2D arrays. I must admit that I haven't fully thought about the use case for find_nearest_above in this case. It may well be that this doesn't make sense. –  maschu Jun 15 '13 at 20:07

Here is the right way to do this:

``````>>> def argfind(array, predicate):
...     for i in xrange(array.shape[0]):
...         if predicate(array[i]):
...             return i
...     return False
...
>>> def find_nearest_above(array, value):
...     return argfind(array, lambda x: x > value)
...
>>> find_nearest_above(np.array([0.,1.,1.4,2.]), 1.5)
> 3
``````

The point here is that if a matching value exists, you'll get the answer when this value is met. Other methods (includeing your own, proposed in the question) will inspect the whole array, which is a waste of time.

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Assuming the arrays are indeed sorted, `np.searchsorted` will do this a lot faster –  ali_m Jun 15 '13 at 19:35
@ali_m yeah, you can be sure, I've heard about binary search. But why do you think that the arrays are sorted? –  kirelagin Jun 16 '13 at 11:27
well, your solution would only work if the arrays are sorted –  ali_m Jun 16 '13 at 11:30
@ali_m the thing is that “nearest” for me means “leftmost”. As I've mentioned in a comment to the question. –  kirelagin Jun 17 '13 at 20:27