TY - JOUR
A2 - Peralta, Antonio M.
AU - Luo, XianFa
AU - Wang, JianYong
PY - 2013
DA - 2013/11/24
TI - The Representation and Continuity of a Generalized Metric Projection onto a Closed Hyperplane in Banach Spaces
SP - 504076
VL - 2013
AB - Let C be a closed bounded convex subset of a real Banach space X with 0 as its interior and pC the Minkowski functional generated by the set C. For a nonempty set G in X and x∈X, g0∈G is called the generalized best approximation to x from G if pC(g0−x)≤pC(g−x) for all g∈G. In this paper, we will give a distance formula under pC from a point to a closed hyperplane H(x∗,α) in X determined by a nonzero continuous linear functional x∗ in X and a real number α, a representation of the generalized metric projection onto H(x∗,α), and investigate the continuity of this generalized metric projection, extending corresponding results for the case of norm.
SN - 1085-3375
UR - https://doi.org/10.1155/2013/504076
DO - 10.1155/2013/504076
JF - Abstract and Applied Analysis
PB - Hindawi Publishing Corporation
KW -
ER -