Directional Differentiability of the Generalized Metric Projection in Hilbert spaces and Hilbertian Bochner spaces
Abstract
Let H be a real Hilbert space and C a nonempty closed and convex subset of H. Let PC: H→ C denote the (standard) metric projection operator. In this paper, we study the G\ateaux directional differentiability of PC and investigate some of its properties. The G\ateaux directionally derivatives of PC are precisely given for the following cases of the considered subset C: 1. closed and convex subsets; 2. closed balls; 3. closed and convex cones (including proper closed subspaces). For special Hilbert spaces, we consider directional differentiability of PC for some Hilbert spaces with orthonormal bases and the real Hilbert space L2([-π,π]) with the trigonometric orthonormal basis.
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