We consider a nonlocal boundary value problem for a semilinear differential inclusion of a fractional order in a Banach space assuming that its linear part is a non-densely defined Hille-Yosida operator. We apply the theory of integrated semigroups, fractional calculus and the fixed point theory of condensing multivalued maps to obtain a general existence principle (Theorem 3.2). Theorem 3.3 gives an example of a concrete realization of this result. Some important particular cases including a nonlocal Cauchy problem, periodic and anti-periodic boundary value problems are presented.
BOUNDARY VALUE PROBLEMS FOR FRACTIONAL-ORDER DIFFERENTIAL INCLUSIONS IN BANACH SPACES WITH NONDENSELY DEFINED OPERATORS / Obukhovskii, V; Zecca, P; Afanasova, M. - In: FIXED POINT THEORY. - ISSN 1583-5022. - STAMPA. - 22:(2021), pp. 279-297. [10.24193/fpt-ro.2021.1.20]
BOUNDARY VALUE PROBLEMS FOR FRACTIONAL-ORDER DIFFERENTIAL INCLUSIONS IN BANACH SPACES WITH NONDENSELY DEFINED OPERATORS
Zecca, P
;
2021
Abstract
We consider a nonlocal boundary value problem for a semilinear differential inclusion of a fractional order in a Banach space assuming that its linear part is a non-densely defined Hille-Yosida operator. We apply the theory of integrated semigroups, fractional calculus and the fixed point theory of condensing multivalued maps to obtain a general existence principle (Theorem 3.2). Theorem 3.3 gives an example of a concrete realization of this result. Some important particular cases including a nonlocal Cauchy problem, periodic and anti-periodic boundary value problems are presented.
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