# In SciPy, fancy indexing for csr_matrices

I am new to Python, so forgive me ahead of time if this is an elementary question, but I have searched around and have not found a satisfying answer.

I am trying to do the following using NumPy and SciPy:

``````I,J = x[:,0], x[:1]               # x is a two column array of (r,c) pairs
V = ones(len(I))
G = sparse.coo_matrix((V,(I,J)))  # G's dimensions are 1032570x1032570
G = G + transpose(G)
r,c = G.nonzero()
G[r,c] = 1
...
NotImplementedError: Fancy indexing in assignment not supported for csr matrices
``````

Pretty much, I want all the nonzero values to equal 1 after adding the transpose, but I get the fancy indexing error messages.

Alternatively, if I could show that the matrix G is symmetric, adding the transpose would not be necessary.

Any insight into either approach would be very much appreciated.

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If you just want to make everything equal to one, you can just do `G = G / G` –  Joe Kington Jul 21 '11 at 20:57
Brilliant. Thanks :) –  will Jul 21 '11 at 21:04

In addition to doing something like `G = G / G`, you can operate on `G.data`.

So, in your case, doing either:

``````G.data  = np.ones(G.nnz)
``````

or

``````G.data[G.data != 0] = 1
``````

Will do what you want. This is more flexible, as it allows you to preform other types of filters (e.g. `G.data[G.data > 0.9] = 1` or `G.data = np.random.random(G.nnz)`)

The second option will only set the values to one if they have a nonzero value. During some calculations, you'll wind up with zero values that are "dense" (i.e. they're actually stored as a value in the sparse array). (You can remove these in-place with `G.eliminate_zeros()`)

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Thank you. That was exactly what I was looking for. –  will Jul 21 '11 at 21:16