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Bibliographic Details
Main Author: Simons, Stephen
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2407.00479
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author Simons, Stephen
author_facet Simons, Stephen
contents This paper is about the maximally monotone and quasidense subsets of the product of a real Banach space and its dual. We discuss six subclasses of the maximal monotone sets that are equivalent to the quasidense ones. We define the Gossez extension to the dual of a maximally monotone set, and give nine equivalent characterizations of an element of this set in the quasidense case. We discuss maximally monotone sets of "type (NI)'' (one of the six classes referred to above) and we show that the "tail operator'' is not of type (NI), but it is the Gossez extension of a maximally monotone set that is of type (NI). We generalize Rockafellar's surjectivity theorem for maximally monotone subsets of reflexive Banach spaces to maximally monotone subsets of type (NI) of general Banach spaces. We discuss a generalization of the Brezis-Browder theorem on monotone linear subspaces of reflexive spaces to the nonreflexive situation. We also discuss briefly maximally monotone subsets of "type (D)'' and "type (WD)'' (two more of the six classes referred to above).
format Preprint
id arxiv_https___arxiv_org_abs_2407_00479
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Faces of quasidensity
Simons, Stephen
Functional Analysis
47H05
This paper is about the maximally monotone and quasidense subsets of the product of a real Banach space and its dual. We discuss six subclasses of the maximal monotone sets that are equivalent to the quasidense ones. We define the Gossez extension to the dual of a maximally monotone set, and give nine equivalent characterizations of an element of this set in the quasidense case. We discuss maximally monotone sets of "type (NI)'' (one of the six classes referred to above) and we show that the "tail operator'' is not of type (NI), but it is the Gossez extension of a maximally monotone set that is of type (NI). We generalize Rockafellar's surjectivity theorem for maximally monotone subsets of reflexive Banach spaces to maximally monotone subsets of type (NI) of general Banach spaces. We discuss a generalization of the Brezis-Browder theorem on monotone linear subspaces of reflexive spaces to the nonreflexive situation. We also discuss briefly maximally monotone subsets of "type (D)'' and "type (WD)'' (two more of the six classes referred to above).
title Faces of quasidensity
topic Functional Analysis
47H05
url https://arxiv.org/abs/2407.00479