How does one solve a large system of linear equations efficiently when only a few of the constant terms change. For example:

I currently have the system Ax= b. I compute the inverse of A once, store it in a matrix and each time any entry updates in b perform a matrix-vector multiplication A^-1(b) to recompute x.

This is inefficient as only a couple of entries would have update in b. Are there more efficient ways of solving this system when A-1 remains constant but specific known values change in b?

I use uBlas and Eigen, but not aware of solutions that would address this problem of selective recalculation. Thanks for any guidance.