Some new properties of the equality constrained and weighted least squares problem

In this paper, some new properties of the equality constrained and weighted least squares problem (WLSE) min W^1/2(Kx−g)₂ subject to Lx=h are obtained. We derive a perturbation bound based on an unconstrained least squares problem and deduce some equivalent formulae for the projectors of this unconstrained LS problem. We also present a new way to compute the minimum norm solution x_WLSE of the WLSE problem by using the QR decomposition of the corresponding matrices and propose an algorithm to compute x_WLSE using the QR factorizations. Some numerical examples are provided to compare different methods for solving the WLSE problem.