A generalization of Nadler’s fixed point theorem and its application to nonconvex integral inclusions
Keywords
$H^ $-type multi-valued nonexpansive mapping, demiclosed mapping, Opial's condition, $\sigma$-algebra, Bochner integrable functionsAbstract
In this paper, a generalization of Nadler's fixed point theorem is presented. In the sequel, we consider a nonconvex integral inclusion and prove a Filippov type existence theorem by using an appropriate norm on the space of selection of the multifunction and a $H^+$-type contraction for set-valued maps.Downloads
Published
2013-04-22
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1.
PATHAK, Hemant Kumar and SHAHZAD, Naseer. A generalization of Nadler’s fixed point theorem and its application to nonconvex integral inclusions. Topological Methods in Nonlinear Analysis. Online. 22 April 2013. Vol. 41, no. 1, pp. 207 - 227. [Accessed 14 December 2024].
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