Your search keyword '"Yao, J. C."' showing total 3 results

1. Semi-Infinite Optimization under Convex Function Perturbations: Lipschitz Stability.

Author

Huy, N. Q. and Yao, J.-C.

Subjects

*INFINITE groups, *MATHEMATICAL optimization, *CONVEX programming, *MATHEMATICAL analysis, *LIPSCHITZ spaces

Abstract

This paper is devoted to the study of the stability of the solution map for the parametric convex semi-infinite optimization problem under convex function perturbations in short, PCSI. We establish sufficient conditions for the pseudo-Lipschitz property of the solution map of PCSI under perturbations of both objective function and constraint set. The main result obtained is new even when the problems under consideration reduce to linear semi-infinite optimization. Examples are given to illustrate the obtained results. [ABSTRACT FROM AUTHOR]

Published

2011

2. Generalized Clarke Epiderivatives of Parametric Vector Optimization Problems.

Author

Chuong, T. D. and Yao, J. C.

Subjects

*MATHEMATICAL optimization, *MATHEMATICAL functions, *SET theory, *MATHEMATICAL analysis, *COMPLEX numbers

Abstract

This paper deals with the generalized Clarke epiderivative of the extremum (or efficient point) multifunction in parametric vector optimization problems. The formulas for computing and/or estimating the generalized Clarke epiderivative of this extremum multifunction are given in terms of the Clarke tangent cone to the graph of a multifunction or the constraint mapping and/or the Fréchet derivative of the objective function. An application to semi-infinite programming is given. [ABSTRACT FROM AUTHOR]

Published

2010

3. An Inexact Proximal-Type Algorithm in Banach Spaces.

Author

Zeng, L. C. and Yao, J. C.

Subjects

*BANACH spaces, *COMPLEX variables, *MATHEMATICAL optimization, *MATHEMATICAL analysis, *SIMULATION methods & models, *REAL variables, *ALGORITHMS, *GENERALIZED spaces, *RATIO & proportion

Abstract

In this paper, we investigate the strong convergence of an inexact proximalpoint algorithm. It is known that the proximal-point algorithm converges weakly to a solution of a maximal monotone operator, but fails to converge strongly. Solodov and Svaiter (Math. Program. 87:189–202, 2000) introduced a new proximal-type algorithm to generate a strongly convergent sequence and established a convergence result in Hilbert space. Subsequently, Kamimura and Takahashi (SIAM J. Optim. 13:938–945, 2003) extended the Solodov and Svaiter result to the setting of uniformly convex and uniformly smooth Banach space. On the other hand, Rockafellar (SIAM J. Control Optim. 14:877–898, 1976) gave an inexact proximal-point algorithm which is more practical than the exact one. Our purpose is to extend the Kamimura and Takahashi result to a new inexact proximal-type algorithm. Moreover, this result is applied to the problem of finding the minimizer of a convex function on a uniformly convex and uniformly smooth Banach space. [ABSTRACT FROM AUTHOR]

Published

2007