Title of article
Henstock–Kurzweil–Pettis integrability of compact valued multifunctions with values in an arbitrary Banach space
Author/Authors
Di Piazza، نويسنده , , Luisa and Musia?، نويسنده , , Kazimierz، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2013
Pages
13
From page
452
To page
464
Abstract
The aim of this paper is to describe Henstock–Kurzweil–Pettis (HKP) integrable compact valued multifunctions. Such characterizations are known in case of functions (see Di Piazza and Musiał (2006) [16]). It is also known (see Di Piazza and Musiał (2010) [19]) that each HKP-integrable compact valued multifunction can be represented as a sum of a Pettis integrable multifunction and of an HKP-integrable function. Invoking to that decomposition, we present a pure topological characterization of integrability. Having applied the above results, we obtain two convergence theorems, that generalize results known for HKP-integrable functions. We emphasize also the special role played in the theory by weakly sequentially complete Banach spaces and by spaces possessing the Schur property.
Keywords
Multifunction , Set-valued Pettis integral , Set-valued Henstock–Kurzweil–Pettis integral , Support function , selector , Convergence theorems , Henstock integral
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2013
Journal title
Journal of Mathematical Analysis and Applications
Record number
1563899
Link To Document