Infimal convolutions and lipschitzian properties of subdifferentials for prox-regular functions in hilbert spaces

Bačák, Miroslav; Borwein, Jonathan M.; Eberhard, Andrew; Mordukhovich, Boris S.

Title: Infimal convolutions and lipschitzian properties of subdifferentials for prox-regular functions in hilbert spaces
Creator: Bačák, Miroslav; Borwein, Jonathan M.; Eberhard, Andrew; Mordukhovich, Boris S.
Relation: Journal of Convex Analysis Vol. 17, Issue 3-4, p. 737-763
Relation: http://www.heldermann.de/JCA/JCA17/jca17.htm#jca173
Publisher: Heldermann Verlag
Resource Type: journal article
Date: 2010
Description: We study infimal convolutions of extended-real-valued functions in Hilbert spaces paying a special attention to the rather broad and remarkable class of prox-regular functions. Such functions have been well recognized as highly important in many aspects of variational analysis and its applications in both finite-dimensional and infinite-dimensional settings. Based on advanced variational techniques, we discover some new subdifferential properties of infimal convolutions and apply them to the study of Lipschitzian behavior of subdifferentials for prox-regular functions in Hilbert spaces. It is shown, in particular, that the fulfillment of a natural Lipschitz-like property for (set-valued) subdifferentials of prox-regular functions forces such functions, under weak assumptions, actually to be locally smooth with single-valued subdifferentials reduced to Lipschitz continuous gradient mappings.
Subject: subdifferentials; Lipschitz continuity; infimal convolutions; prox-regular functions; prox-bounded functions; set-valued mappings
Identifier: http://hdl.handle.net/1959.13/926680
Identifier: uon:9909
Identifier: ISSN:0944-6532
Language: eng
Reviewed

Hits: 3258
Visitors: 3258
Downloads: 1

		Thumbnail	File	Description	Size	Format