ALGEBRAIC PROPERTIES OF THE RANK-DEFICIENT EQUALITY-CONSTRAINED AND WEIGHTED LEAST-SQUARES PROBLEMS

We study the algebraic properties of the solutions of the equality-constrained least squares problem min(f is-an-element-of S) parallel-to Kf - g parallel-to 2 with S = {f:parallel-to h - Lf parallel-to 2 = min(z) is-an-element-of C(n)) parallel-to h - Lz parallel-to 2} (LSE) and corresponding weighted least squares problem (WLS), in which L and (L(K)) may not be of full rank. General formulas for the solutions are given, and the algebraic relations between the LSE and the WLS solutions are obtained.