The metric projections onto closed convex cones in a Hilbert space

Abstract

We study the metric projection onto the closed convex cone in a real Hilbert space H generated by a sequence V = \vn\n=0∞. The first main result of this paper provides a sufficient condition under which we can identify the closed convex cone generated by V with the following set: \[ C[[V]]: = \Σn=0∞ an vn|an≥ 0, the series Σn=0∞ an vn converges in H\. \] Then, by adapting classical results on general convex cones, we give a useful description of the metric projection of a vector onto C[[V]]. As applications, we obtain the best approximations of many concrete functions in L2([-1,1]) by polynomials with non-negative coefficients.