论文信息 - DC Optimization Approach to Metric Regularity of Convex Multifunctions with Applications to Infinite Systems

DC Optimization Approach to Metric Regularity of Convex Multifunctions with Applications to Infinite Systems

The paper develops a new approach to the study of metric regularity and related well-posedness properties of convex set-valued mappings between general Banach spaces by reducing them to unconstrained minimization problems with objectives given as the difference of convex (DC) functions. In this way, we establish new formulas for calculating the exact regularity bound of closed and convex multifunctions and apply them to deriving explicit conditions ensuring well-posedness of infinite convex systems described by inequality and equality constraints.

Boris S. Mordukhovich | T. T. A. Nghia | B. Mordukhovich | T. Nghia

[1] Stephen M. Robinson,et al. Regularity and Stability for Convex Multivalued Functions , 1976, Math. Oper. Res..

[2] Mirjam Dür. A parametric characterization of local optimality , 2003, Math. Methods Oper. Res..

[3] Marco A. López,et al. Semi-infinite programming : recent advances , 2001 .

[4] Boris S. Mordukhovich,et al. Variational Analysis in Semi-Infinite and Infinite Programming, I: Stability of Linear Inequality Systems of Feasible Solutions , 2009, SIAM J. Optim..

[5] M. J. Cánovas,et al. Quantitative stability of linear infinite inequality systems under block perturbations with applications to convex systems , 2011 .

[6] Dimitri P. Bertsekas,et al. Convex Analysis and Optimization , 2003 .

[7] B. Mordukhovich,et al. Differential characterizations of covering, metric regularity, and Lispchitzian properties of multifunctions between Banach spaces , 1995 .

[8] Yoshiyuki Sekiguchi,et al. Regularity estimates for convex multifunctions , 2009, Math. Program..

[9] Miguel A. Goberna,et al. From linear to convex systems: consistency, Farkas' Lemma and applications , 2006 .

[10] Marco A. López,et al. Metric regularity of semi-infinite constraint systems , 2005, Math. Program..

[11] C. Zălinescu. Convex analysis in general vector spaces , 2002 .