Existence Results for Periodic Solutions of Integro-Dynamic Equations on Time Scales
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Date
2009
Authors
Adıvar, Murat
Journal Title
Journal ISSN
Volume Title
Publisher
Springer Heidelberg
Open Access Color
Green Open Access
Yes
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No
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Abstract
Using the topological degree method and Schaefer's fixed point theorem, we deduce the existence of periodic solutions of nonlinear system of integro-dynamic equations on periodic time scales. Furthermore, we provide several applications to scalar equations, in which we develop a time scale analog of Lyapunov's direct method and prove an analog of Sobolev's inequality on time scales to arrive at a priori bound on all periodic solutions. Therefore, we improve and generalize the corresponding results in Burton et al. (Ann Mat Pura Appl 161: 271-283, 1992)
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ORCID
Keywords
Periodic time scale, Dynamic equation, Volterra integral equation, Sobolev's inequality, Schaefer, Lyapunov, Periodic solution, Lyapunov's direct method, Dynamic equations on time scales or measure chains, Systems of nonlinear integral equations, Periodic solutions of integral equations, periodic solution, periodic time scale, Sobolev's inequality, Schaefer's fixed point theorem, Volterra integral equation, dynamic equation
Fields of Science
0101 mathematics, 01 natural sciences
Citation
WoS Q
Q2
Scopus Q
Q3
OpenCitations Citation Count
23
Source
Annalı Dı Matematıca Pura Ed Applıcata
Volume
188
Issue
4
Start Page
543
End Page
559
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Citations
CrossRef : 15
Scopus : 38
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38
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32
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1
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9
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