# Scipy gives wrong result for matrix multiplication

I am using `scipy` to do matrix multiplication of sparse matrix. For some reason, `.power()` method doesn't work for sparse matrix. I have checked it using three methods:

Here's my code:

``````import scipy as sp
import scipy.sparse
``````

Method1: Plain matrix multiplication

``````row = np.array([0, 3, 1, 0])
col = np.array([0, 3, 1, 2])
data = np.array([4, 5, 7, 9])
P1 = sp.sparse.coo_matrix((data, (row, col)), shape=(4, 4))
#Method 1
P1.power(4).todense() #gives wrong result
``````

Result:

``````matrix([[ 256,    0, 6561,    0],  #6561 isn't right
[   0, 2401,    0,    0],
[   0,    0,    0,    0],
[   0,    0,    0,  625]], dtype=int32)
``````

Method 2:

``````P = P1.copy()
#calculate ^4
for loop in range(2):
P = P.dot(P)
P.todense()
``````

Output

``````matrix([[ 256,    0,  576,    0],
[   0, 2401,    0,    0],
[   0,    0,    0,    0],
[   0,    0,    0,  625]], dtype=int32)
``````

Method3

``````P1.dot(P1).dot(P1).dot(P1).todense()
``````

Output:

``````matrix([[ 256,    0,  576,    0],
[   0, 2401,    0,    0],
[   0,    0,    0,    0],
[   0,    0,    0,  625]], dtype=int32)
``````

Method 4:

One can check the result at this website (symbolab.com)

Other threads on this topic (Element-wise power of scipy.sparse matrix, Matrix power for sparse matrix in python), focus on how to do matrix multiplication. I'd appreciate any help.

• `p.power(2)` is "element-wise power". `9**4` = `6561`. The first thread you linked also says so (in the title even). – Zinki Oct 19 '18 at 7:23
• Thanks Zinki. If you could add an answer, I can accept it. – watchtower Oct 19 '18 at 7:48

You could use `**` notation:

``````(P1**4).todense()
``````

Result:

``````[[ 256    0  576    0]
[   0 2401    0    0]
[   0    0    0    0]
[   0    0    0  625]]
``````

EDIT: Regarding why `.power()` doesn't return the expected result:

— as Zinki mentioned in their comment:

`p.power(2)` is "element-wise power". `9**4` = `6561`.

• Thanks I'L'l. Very respectfully, the question isn't about `how` to do the multiplication, but about why am I getting an incorrect answer. I believe there are 50K ways to multiplication. – watchtower Oct 19 '18 at 7:42
• You're welcome! Zinki's comment more or less sums it up why you don't get the correct result. – l'L'l Oct 19 '18 at 7:43
• Oh thanks...Just saw that...Wonderful. If you can edit your answer, I will accept it. – watchtower Oct 19 '18 at 7:47