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Convex composite functions in Banach spaces and the primal lower-nice property |
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| Authors: | C Combari A Elhilali Alaoui A Levy R Poliquin L Thibault |
| Institution: | Université de Montpellier II, Laboratoire Analyse Convexe, Place Eugene Bataillon, 34095 Montpellier Cedex 5, France A. Elhilali Alaoui ; Université de Montpellier II, Laboratoire Analyse Convexe, Place Eugene Bataillon, 34095 Montpellier Cedex 5, France ; Department of Mathematics, Bowdoin College, Brunswick, Maine 04011 ; Department of Mathematical Sciences, University of Alberta, Edmonton, Alberta, Canada T6G 2G1 ; Université de Montpellier II, Laboratoire Analyse Convexe, Place Eugene Bataillon, 34095 Montpellier Cedex 5, France |
| Abstract: | Primal lower-nice functions defined on Hilbert spaces provide examples of functions that are ``integrable' (i.e. of functions that are determined up to an additive constant by their subgradients). The class of primal lower-nice functions contains all convex and lower- functions. In finite dimensions the class of primal lower-nice functions also contains the composition of a convex function with a  mapping under a constraint qualification. In Banach spaces certain convex composite functions were known to be primal lower-nice (e.g. a convex function had to be continuous relative to its domain). In this paper we weaken the assumptions and provide new examples of convex composite functions defined on a Banach space with the primal lower-nice property. One consequence of our results is the identification of new examples of integrable functions on Hilbert spaces. |
| Keywords: | Primal lower-nice functions subdifferential convex composite functions integrable functions |
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