Title of article
Hereditary invertible linear surjections and splitting problems for selections
Author/Authors
Repov?، نويسنده , , Du?an and Semenov، نويسنده , , Pavel V.، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2009
Pages
7
From page
1192
To page
1198
Abstract
Let A + B be the pointwise (Minkowski) sum of two convex subsets A and B of a Banach space. Is it true that every continuous mapping h : X → A + B splits into a sum h = f + g of continuous mappings f : X → A and g : X → B ? We study this question within a wider framework of splitting techniques of continuous selections. Existence of splittings is guaranteed by hereditary invertibility of linear surjections between Banach spaces. Some affirmative and negative results on such invertibility with respect to an appropriate class of convex compacta are presented. As a corollary, a positive answer to the above question is obtained for strictly convex finite-dimensional precompact spaces.
Keywords
Convex-valued mapping , Continuous selection , Banach space , Lower semicontinuous map , Minkowski sum
Journal title
Topology and its Applications
Serial Year
2009
Journal title
Topology and its Applications
Record number
1581970
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