Title of article :
KRASNOSEL’SKII FIXED POINT THEOREMS INVOLVING A CLASS OF CONVEX-POWER CONDENSING MULTIVALUED MAPPINGS
Author/Authors :
AMAR ، AFIF BEN - University of Sfax , BOUMAIZA ، MOHAMED - University of Sousse , HADJ AMOR ، SANA - University of Sousse
Abstract :
In this paper, we use a class of convex-power condensing mappings with respect to a measure of weak noncompactness in Banach spaces in order to present a new Krasnosel’skii fixed point theorem for multivalued mappings which have sequentially closed graph. We prove also a new version of Leary-Schauder type results. We apply these results to investigate the existence of weak solution to a Volterrra integral inclusion of Krasnosel’skii type in a non reflexive Banach space.
Keywords :
Krasnosel’skii fixed point theorem , weak topology , convex , power condensing , multivalued mappings , Volterra integral inclusion
Journal title :
Journal of Advanced Mathematical Studies
Journal title :
Journal of Advanced Mathematical Studies
