# Why NumPy instead of Python lists?

Is it worth my learning NumPy?

I have approximately 100 financial markets series, and I am going to create a cube array of 100x100x100 = 1 million cells. I will be regressing (3-variable) each x with each y and z, to fill the array with standard errors.

I have heard that for "large matrices" I should use NumPy as opposed to Python lists, for performance and scalability reasons. Thing is, I know Python lists and they seem to work for me.

Is the scale of the above problem worth moving to NumPy?

What if I had 1000 series (that is, 1 billion floating point cells in the cube)?

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This doesn't answer your question but you might consider asking about your problem on stats exchange. It sounds to me like you are trying to do something the hard way when an easier solutions might exist. Generally speaking, filling a large cube with sparse data is not the best way to handle these kind of problems. –  Dave31415 Feb 27 at 15:30

NumPy's arrays are more compact than Python lists -- a list of lists as you describe, in Python, would take at least 20 MB or so, while a NumPy 3D array with single-precision floats in the cells would fit in 4 MB. Access in reading and writing items is also faster with NumPy.

Maybe you don't care that much for just a million cells, but you definitely would for a billion cells -- neither approach would fit in a 32-bit architecture, but with 64-bit builds NumPy would get away with 4 GB or so, Python alone would need at least about 12 GB (lots of pointers which double in size) -- a much costlier piece of hardware!

The difference is mostly due to "indirectness" -- a Python list is an array of pointers to Python objects, at least 4 bytes per pointer plus 16 bytes for even the smallest Python object (4 for type pointer, 4 for reference count, 4 for value -- and the memory allocators rounds up to 16). A NumPy array is an array of uniform values -- single-precision numbers takes 4 bytes each, double-precision ones, 8 bytes. Less flexible, but you pay substantially for the flexibility of standard Python lists!

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Alex - always the good answer. Thank you - point made. I'll go with Numpy for scalability and indeed for efficiency. I'm thinking I'll also soon be needing to learn parallel programming in Python, and invest in some OpenCL capable hardware ;) –  Thomas Browne Jun 14 '09 at 23:23
Tx @Thomas, always glad to help! –  Alex Martelli Jun 14 '09 at 23:34
It's super alex, here to answer NumPy questions in the blink of an eye :) –  TM. Oct 5 '09 at 12:25

Numpy is not just more efficient, it is also more convenient. You get a lot of vector and matrix operations for free, which sometimes allow one to avoid unnecessary work. And they are also efficiently implemented.

For example, you could read your cube directly from a file into an array:

``````x = numpy.fromfile(file=open("data"), dtype=float).reshape((100, 100, 100))
``````

Sum along the second dimension:

``````s = x.sum(axis=1)
``````

Find which cells are above a threshold:

``````(x > 0.5).nonzero()
``````

Remove every even-indexed slice along the third dimension:

``````x[:, :, ::2]
``````

Also, other libraries that could be useful for you work on numpy arrays. For example, statistical analysis and visualization libraries.

Even if you don't have performance problems, learning numpy is worth the effort.

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Thanks - you have provided another good reason in your third example, as indeed, I will be searching the matrix for cells above threshold. Moreover, I was loading up from sqlLite. The file approach will be much more efficient. –  Thomas Browne Jun 14 '09 at 23:54

Alex mentioned memory efficiency, and Roberto mentions convenience, and these are both good points. For a few more ideas I'll mention speed and functionality.

Functionality: You get a lot built in with Numpy, FFTs, convolutions, fast searching, basic statistics, linear algebra, histograms, etc. And really, who can live without FFTs?

Speed: Here's a test on doing a sum over a list and a numpy array, showing that the sum on the numpy array is 10x faster (in this test -- mileage may vary).

``````from numpy import arange
from timeit import Timer

Nelements = 10000
Ntimeits = 10000

x = arange(Nelements)
y = range(Nelements)

t_numpy = Timer("x.sum()", "from __main__ import x")
t_list = Timer("sum(y)", "from __main__ import y")
print "numpy: %.3e" % (t_numpy.timeit(Ntimeits)/Ntimeits,)
print "list:  %.3e" % (t_list.timeit(Ntimeits)/Ntimeits,)
``````

which on my systems (while I'm running a backup) gives:

``````numpy: 3.004e-05
list:  5.363e-04
``````
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Note also that there is support for timeseries based on numpy in the timeseries scikits:

http://pytseries.sourceforge.net

For regression, I am pretty sure numpy will be order of magnitude faster and more convenient than lists even for the 100^3 problem

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Here's a nice answer from the FAQ on the scipy.org website:

What advantages do NumPy arrays offer over (nested) Python lists?

Python’s lists are efficient general-purpose containers. They support (fairly) efficient insertion, deletion, appending, and concatenation, and Python’s list comprehensions make them easy to construct and manipulate. However, they have certain limitations: they don’t support “vectorized” operations like elementwise addition and multiplication, and the fact that they can contain objects of differing types mean that Python must store type information for every element, and must execute type dispatching code when operating on each element. This also means that very few list operations can be carried out by efficient C loops – each iteration would require type checks and other Python API bookkeeping.

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Speed wise I'm not so sure of. Here is a quick example: I've created a function(of x) that returns a list of prime numbers between 2 and x:

• regular python function using lists:

``````def findprimeupto(x):
primes = []
n_primes = []

for i in range(2, x):

if not (i in n_primes):
primes.append(i)
n_primes.append(i)

for j in range(len(primes)):
if i > n_primes[j]:
n_primes[j] += primes[j]

return primes

import time
start_time = time.time()
findprimeupto(10000)
print("--- %s seconds ---" % str(time.time() - start_time))
``````
• and C like python function using numpy arrays:

``````import numpy

def findprimeupto(x):

primes = numpy.array(numpy.zeros(x), dtype=numpy.int32)
n_primes = numpy.array(numpy.zeros(x), dtype=numpy.int32)
primeslen = 0

for i in range(2, x):

flag = 1
for j in range(primeslen):
if n_primes[j] == i:
flag = 0
break

if flag:
primes[primeslen] = i
n_primes[primeslen] = i
primeslen += 1

for j in range(primeslen):
if i > n_primes[j]:
n_primes[j] += primes[j]

return [primeslen, primes]

import time

start_time = time.time()

result = findprimeupto(10000)

#for i in range(result[0]):
#    print('{:d} '.format(result[1][i]), end="")

print()
print("--- %s seconds ---" % str(time.time() - start_time))
``````

The former, supposedly slow implementation using lists, is executed in 0.6 seconds and the later, supposedly fast numpy implementation, is needs 50 seconds. If someone can point out why I'd greatly appreciate it.

BTW pure C program which is more or less a copy of numpy version of the function executes in less than 0.04s. The speed of C is even more obvious with large x:

``````    #include <stdio.h>
#include <stdlib.h>
#include <time.h>

void findprimesupto(int n, int *primeslen, int *primes, int *n_primes) {
int i, j, flag;

*primeslen = 0;

for (i=2; i <= n; i++) {
for (j=0, flag=1; j < *primeslen; j++)
if (n_primes[j] == i) {
flag = 0;
break;
}
if (flag) {
primes[*primeslen] = i;
n_primes[*primeslen] = i;
(*primeslen)++;
}
for (j=0; j < *primeslen; j++)
if (i > n_primes[j])
n_primes[j] += primes[j];
}
}

int main() {
int n = 10000, primeslen = 0, i;
int *primes, *n_primes;
clock_t start, diff;

start = clock();
primes = malloc(n * sizeof(int));
n_primes = malloc(n * sizeof(int));

findprimesupto(n, &primeslen, primes, n_primes);

/* for (i=0; i < primeslen; i++)
printf("%d ", primes[i]);

printf("\n");
*/

diff = clock() - start;
printf("Time: %f s\n", (float) diff / (float) CLOCKS_PER_SEC);

free(primes);
free(n_primes);

return 0;
}
``````
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NumPy's speed depends on making good use of NumPy's capabilities for vectorized operations. You need to rewrite your NumPy example in a more NumPy-friendly style, replacing Python-level for loops with NumPy vectorized operations. You can't just replace lists with NumPy arrays and expect code to run faster. –  Mark Dickinson Jul 8 '14 at 18:11
I'm trying to find appropriate changes to the code using native numpy functions, but this seems to be particularly difficult case as it differs significantly from standard linear algebra problems numpy is well suited for. I suspect numpy array access functions are slow, in fact I've just posted a test in another thread that demonstrates that, but I don't see how I can get around it. –  Arijan Jul 8 '14 at 22:38
There is one other thing. If I define arrays of floats instead of integers, namely if I change declarations of primes and n_primes to: primes = numpy.zeros(x) n_primes = numpy.zeros(x) then runtime drops from 50s to 9s. This would indicate issues with typecasting (i.e. all numpy functions assume arguments are type float) which indeed could gobble up time. All in all numpy is not well suited for general purpose integer arrays. Shame though. –  Arijan Jul 8 '14 at 22:46
Looking at your code there are just a few thing you could change to make it incredibly fast. First off, numpy does just fine with integers but you told it to start out with floats then change them to ints, instead use `zeros(x, dtype=int32)` (or even better: `empty`). Next, array lookups are fast in Numpy, however looping in Python is slow. Your first Inner loop can be replaced with a single vectorized line `flag = (n_primes[:primeslen]==i).any()`. I am sure your other inner loop could be vectorized as well. –  coderforlife May 14 at 13:51