CHARACTERIZATIONS OF CONVEX APPROXIMATE SUBDIFFERENTIAL CALCULUS IN BANACH SPACES
| Affiliation auteurs | !!!! Error affiliation !!!! |
| Titre | CHARACTERIZATIONS OF CONVEX APPROXIMATE SUBDIFFERENTIAL CALCULUS IN BANACH SPACES |
| Type de publication | Journal Article |
| Year of Publication | 2016 |
| Auteurs | Correa R., Hantoute A., Jourani A. |
| Journal | TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY |
| Volume | 368 |
| Pagination | 4831-4854 |
| Date Published | JUL |
| Type of Article | Article |
| ISSN | 0002-9947 |
| Mots-clés | approximate subdifferential, approximate variational principle, calculus rules, convex functions |
| Résumé | We establish subdifferential calculus rules for the sum of convex functions defined on normed spaces. This is achieved by means of a condition relying on the continuity behaviour of the inf-convolution of their corresponding conjugates, with respect to any given topology intermediate between the norm and the weak* topologies on the dual space. Such a condition turns out to also be necessary in Banach spaces. These results extend both the classical formulas by Hiriart-Urruty and Phelps and by Thibault. |
| DOI | 10.1090/tran/6589 |