AbstractIn this paper, we show that the strong conical hull intersection property (CHIP) completely characterizes the best approximation to any x in a Hilbert space X from the setK:=C∩x∈X:-g(x)∈S,by a perturbation x-l of x from the set C for some l in a convex cone of X, where C is a closed convex subset of X, S is a closed convex cone which does not necessarily have non-empty interior, Y is a Banach space and g:X→Y is a continuous S-convex function. The point l is chosen as the weak*-limit of a net of ɛ-subgradients. We also establish limiting dual conditions characterizing the best approximation to any x in a Hilbert space X from the set K without the strong CHIP. The ε-subdifferential calculus plays the key role in deriving the results
AbstractA strongly unique best approximation m in a finite-dimensional subspace M of a real normed l...
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractLet Π be a collection of subsets of a compact set S in a normed linear space and K be all co...
AbstractIn this paper, we show that the strong conical hull intersection property (CHIP) completely ...
Abstract. We study best approximation problems with nonlinear constraints in Hilbert spaces. The str...
Abstract. Several fundamental concepts such as the basic constraint qualification (BCQ), the strong ...
AbstractMany interesting and important problems of best approximationare included in (or can be redu...
AbstractThe problem considered is that of characterizing the best approximation, to a given x in a H...
Many interesting and important problems of best approximationare included in (or can be reduced to) ...
AbstractTo provide a Kolmogorov-type condition for characterizing a best approximation in a continuo...
Abstract. By virtue of convexification techniques, we study best approximations to a closed set C in...
AbstractDuality relationships in finding a best approximation from a nonconvex cone in a normed line...
In this paper we explain how to characterize the best approximation to any x in a Hilbert space X fr...
AbstractLetCbe a closed bounded convex subset of a Banach spaceEwhich has the origin ofEas an interi...
Bounded linear regularity, the strong conical hull intersection property (strong CHIP), and the coni...
AbstractA strongly unique best approximation m in a finite-dimensional subspace M of a real normed l...
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractLet Π be a collection of subsets of a compact set S in a normed linear space and K be all co...
AbstractIn this paper, we show that the strong conical hull intersection property (CHIP) completely ...
Abstract. We study best approximation problems with nonlinear constraints in Hilbert spaces. The str...
Abstract. Several fundamental concepts such as the basic constraint qualification (BCQ), the strong ...
AbstractMany interesting and important problems of best approximationare included in (or can be redu...
AbstractThe problem considered is that of characterizing the best approximation, to a given x in a H...
Many interesting and important problems of best approximationare included in (or can be reduced to) ...
AbstractTo provide a Kolmogorov-type condition for characterizing a best approximation in a continuo...
Abstract. By virtue of convexification techniques, we study best approximations to a closed set C in...
AbstractDuality relationships in finding a best approximation from a nonconvex cone in a normed line...
In this paper we explain how to characterize the best approximation to any x in a Hilbert space X fr...
AbstractLetCbe a closed bounded convex subset of a Banach spaceEwhich has the origin ofEas an interi...
Bounded linear regularity, the strong conical hull intersection property (strong CHIP), and the coni...
AbstractA strongly unique best approximation m in a finite-dimensional subspace M of a real normed l...
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractLet Π be a collection of subsets of a compact set S in a normed linear space and K be all co...