# Iterating through a scipy.sparse vector (or matrix)

I'm wondering what the best way is to iterate nonzero entries of sparse matrices with scipy.sparse. For example, if I do the following:

``````from scipy.sparse import lil_matrix

x = lil_matrix( (20,1) )
x[13,0] = 1
x[15,0] = 2

c = 0
for i in x:
print c, i
c = c+1
``````

the output is

``````0
1
2
3
4
5
6
7
8
9
10
11
12
13   (0, 0) 1.0
14
15   (0, 0) 2.0
16
17
18
19
``````

so it appears the iterator is touching every element, not just the nonzero entries. I've had a look at the API

http://docs.scipy.org/doc/scipy/reference/generated/scipy.sparse.lil_matrix.html

and searched around a bit, but I can't seem to find a solution that works.

-

Edit: bbtrb's method (using coo_matrix) is much faster than my original suggestion, using nonzero. Sven Marnach's suggestion to use `itertools.izip` also improves the speed. Current fastest is `using_tocoo_izip`:

``````import scipy.sparse
import random
import itertools

def using_nonzero(x):
rows,cols = x.nonzero()
for row,col in zip(rows,cols):
((row,col), x[row,col])

def using_coo(x):
cx = scipy.sparse.coo_matrix(x)
for i,j,v in zip(cx.row, cx.col, cx.data):
(i,j,v)

def using_tocoo(x):
cx = x.tocoo()
for i,j,v in zip(cx.row, cx.col, cx.data):
(i,j,v)

def using_tocoo_izip(x):
cx = x.tocoo()
for i,j,v in itertools.izip(cx.row, cx.col, cx.data):
(i,j,v)

N=200
x = scipy.sparse.lil_matrix( (N,N) )
for _ in xrange(N):
x[random.randint(0,N-1),random.randint(0,N-1)]=random.randint(1,100)
``````

yields these `timeit` results:

``````% python -mtimeit -s'import test' 'test.using_tocoo_izip(test.x)'
1000 loops, best of 3: 670 usec per loop
% python -mtimeit -s'import test' 'test.using_tocoo(test.x)'
1000 loops, best of 3: 706 usec per loop
% python -mtimeit -s'import test' 'test.using_coo(test.x)'
1000 loops, best of 3: 802 usec per loop
% python -mtimeit -s'import test' 'test.using_nonzero(test.x)'
100 loops, best of 3: 5.25 msec per loop
``````
-
Obviously it's better. –  Kabie Nov 30 '10 at 21:59
How about using `izip()` instead of `zip()`? Should be faster for big matrices. –  Sven Marnach Dec 1 '10 at 12:47
@Sven Marnach: Thanks; indeed that is faster. –  unutbu Dec 1 '10 at 13:44
nice, didn't know about `izip()`. Actually I'm a bit surprised that `tocoo()` is faster than the `coo_matrix()` constructor... –  bbtrb Dec 1 '10 at 14:43
The main point here is to use tocoo, but I strongly recommend no to iterate! All of x.row, x.col and x.data are numpy arrays which can be use as is in most cases. Simple example, setting matrix element value to the product of their indices: x.data[:] = x.col*x.row –  Juh_ Mar 13 '13 at 12:14

Try `filter(lambda x:x, x)` instead of `x`.

-

The fastest way should be by converting to a `coo_matrix`:

``````cx = scipy.sparse.coo_matrix(x)

for i,j,v in zip(cx.row, cx.col, cx.data):
print "(%d, %d), %s" % (i,j,v)
``````
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+1. You're right; for larger matrices this is much faster. –  unutbu Dec 1 '10 at 3:27
Is it faster to convert and then iterate, or is this assuming that I can change to work with coo_matrix? –  RandomGuy Dec 1 '10 at 16:16
@scandido: this depends on what you are going to achieve. `coo_matrix` is a very simple format and very fast to construct and access but might be ill-suited for other tasks. Here's an overview over the different matrix formats scipy.org/SciPyPackages/Sparse and especially section "constructing from scratch faster, with coo_matrix" –  bbtrb Dec 1 '10 at 16:46

I had the same problem and actually, if your concern is only speed, the fastest way (more than 1 order of magnitude faster) is to convert the sparse matrix to a dense one (x.todense()), and iterating over the nonzero elements in the dense matrix. (Though, of course, this approach requires a lot more memory)

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Are you proposing using dense matrices all the time, or converting to dense and then iterating? I can't imagine the latter would be faster. But, of course using a dense matrix will be much, much faster if you have enough memory. –  RandomGuy Dec 29 '10 at 16:58
I guess it depends on the scenario, and the kind of data. I've been doing some prophiling on a script that iterates on matrices containing at least 50-100M boolean elements. When iterating, converting to dense and then iterating requires way less time than iterating using the 'best solution' from unutbu's answer. But of course the memory usage increases A LOT. –  Davide C Dec 29 '10 at 23:56