Minimization of Constrained Quadratic forms in Hilbert Spaces

Abstract

A common optimization problem is the minimization of a symmetric positive definite quadratic form < x,Tx > under linear constrains. The solution to this problem may be given using the Moore-Penrose inverse matrix. In this work we extend this result to infinite dimensional complex Hilbert spaces, making use of the generalized inverse of an operator. A generalization is given for positive diagonizable and arbitrary positive operators, not necessarily invertible, considering as constraint a singular operator. In particular, when T is positive semidefinite, the minimization is considered for all vectors belonging to N(T).