Abstract
We prove the existence of at least one integrated solution to an impulsive Cauchy problem for an integro-differential inclusion in a Banach space with a non-densely defined operator. Since we look for integrated solution we do not need to assume that A is a Hille Yosida operator. We exploit a technique based on the measure of weak non-compactness which allows us to avoid any hypotheses of compactness both on the semigroup generated by the linear part and on the nonlinear term. As the main tool in the proof of our existence result, we are using the Glicksberg-Ky Fan theorem on a fixed point for a multivalued map on a compact convex subset of a locally convex topological vector space. This article is part of the theme issue 'Topological degree and fixed point theories in differential and difference equations'.
Highlights
We study the following impulsive Cauchy problem for an integro-differential inclusion in a Banach royalsocietypublishing.org/journal/rsta Phil
E is a weakly compactly generated Banach space,1 A : D(A) ⊂ E → E is the generator of an integrated semigroup, F : [0, b] × E E is a multivalued map
A linear operator A : D(A) ⊂ E → E not necessarily densely defined is the generator of an integrated semigroup {V(t)}t≥0 if the following condition holds: x ∈ D(A) and y = Ax if and only if (i) t → V(t)x is a strongly continuous differentiable function for t ≥ 0; (ii) V (t)x − x = V(t)y for t ≥ 0
Summary
We study the following impulsive Cauchy problem for an integro-differential inclusion in a Banach royalsocietypublishing.org/journal/rsta Phil.
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