Proceedings of SPIE - The International Society for Optical Engineering.
Society of Photo-Optical Instrumentation Engineers, Bellingham, WA, United States.
Vol. 10337.
2017.
On semilinear fractional order differential inclusions in Banach spaces
We are considering the Cauchy problem for a semilinear fractional differential inclusion in a Banach space. By using the fixed point theory for condensing multivalued maps, we prove the local and global theorems of the existence of mild solutions to this problem. We verify the compactness of the solutions set and its continuous dependence on parameters and initial data. We demonstrate also the application of the averaging principle to the investigation of the continuous dependence of the solutions set on a parameter in the case when the right-hand side of the inclusion is rapidly oscillating. © 2017, House of the Book of Science. All rights reserved.
Authors
Kamenskii M.
1
,
Obukhovskii V.
2
,
Petrosyan G.3
,
Yao J.-C.4
Journal
Publisher
House of the Book of Science
Number of issue
1
Language
English
Pages
269-292
Status
Published
Link
Volume
18
Year
2017
Organizations
- 1 Faculty of Mathematics, Voronezh State University, RUDN University, 6 Miklukho-Malaya st, Moscow, 117198, Russian Federation
- 2 Faculty of Physics and Mathematics, Voronezh State Pedagogical University, RUDN University, 6 Miklukho-Malaya st, Moscow, 117198, Russian Federation
- 3 Faculty of Physics and Mathematics, Voronezh State Pedagogical University, Russian Federation
- 4 Center for General Education, Kaohsiung Medical University, Taiwan
Keywords
Averaging principle; Cauchy problem; Condensing map; Continuous dependence of solutions; Fixed point; Fractional differential inclusion; Measure of noncompactness; Multivalued map; Semilinear differential inclusion
Date of creation
19.10.2018
Date of change
19.10.2018
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Other records
Organic and Biomolecular Chemistry.
Royal Society of Chemistry.
Vol. 15.
2017.
P. 8153-8165