Maximal monotonicity, conjugation and the duality product in non-reflexive Banach spaces

Details Maximal monotonicity, conjugation and the duality product in non-reflexive Banach spaces Maximal monotonicity, conjugation and the duality product in non-reflexive Banach spaces

2008-09-23

arxiv.org/abs/0809.3911v1

Mathematics

Functional Analysis

Scientific paper

Maximal monotone operators on a Banach space into its dual can be represented by convex functions bounded below by the duality product. It is natural to ask under which conditions a convex function represents a maximal monotone operator. A satisfactory answer, in the context of reflexive Banach spaces, has been obtained some years ago. Recently, a partial result on non-reflexive Banach spaces was obtained. In this work we study some others conditions which guarantee that a convex function represents a maximal monotone operator in non-reflexive Banach spaces.

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