I have two large square sparse matrices, A & B, and need to compute the following: `A * B^-1`

in the most efficient way. I have a feeling that the answer involves using `scipy.sparse`

, but can't for the life of me figure it out.

After extensive searching, I have run across the following thread: Efficient numpy / lapack routine for product of inverse and sparse matrix? but can't figure out what the most efficient way would be.

Someone suggested using LU decomposition which is built into the sparse module of scipy, but when I try and do LU on sample matrix is says the result is singular (although when I just do a * B^-1 i get an answer). I have also heard someone suggest using `linalg.spsolve()`

, but i can't figure out how to implement this as it requires a vector as the second argument.

If it helps, once I have the solution s.t. `A * B^-1 = C`

, i only need to know the value for one row of the matrix C. The matrices will be roughly 1000x1000 to 1500x1500.