vectors v1, v2 (nx1) where entries in each vector are in the interval [0,1]. v1 and v2 can be sparse or dense
a dense symmetric matrix M (nxn) (actually a logic matrix where entries are 0 or 1)
a dense matrix E (nxn) where E(i,j) = 1-E(j,i) where E(i,j) is in the interval ]0,1[. Is there a name for this type of matrix where E(i,j) = 1-E(j,i)?
I would like to compute s = Sum[(v1 * v2^T) .* M] where .* is the element-wise multiplication operation and Sum is the sum over all entries of the resulting matrix. ^T is the transposition operation.
Given s I would like to obtain x = Sum[(v1 * v2^T) .* E] / s
Is there any computationally more efficient way to perform these multiplications and obtain x?