The existence and approximation of the periodic solutions for system of first order nonlinear differential equationsby using Lebesgue integrable
ABSTRACT<br /> In this paper we study the existence and approximation of the periodic solutions for a system of first order nonlinear differential equations by assuming that each of the functions are measurable at t and bounded by Lebesgue integrable functions.<br /> The numerical-analyt...
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| Main Authors: | , |
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| Format: | Book |
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College of Education for Pure Sciences,
2008-03-01T00:00:00Z.
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| Summary: | ABSTRACT<br /> In this paper we study the existence and approximation of the periodic solutions for a system of first order nonlinear differential equations by assuming that each of the functions are measurable at t and bounded by Lebesgue integrable functions.<br /> The numerical-analytic method has been used to study the periodic solutions of ordinary differential equations which were introduced by A. M. Samoilenko. |
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| Item Description: | 1812-125X 2664-2530 10.33899/edusj.2008.51296 |