PERIODIC SOLUTIONS OF A MODEL OF LOTKA-VOLTERRA WITH VARIABLE STRUCTURE AND IMPULSES
Keyword(s):
We consider a generalized version of the classical Lotka Volterra model with differential equations. The version has a variable structure (discontinuous right hand side) and the solutions are subjected to the discrete impulsive effects. The moments of right hand side discontinuity and the moments of impulsive effects coincide and they are specific for each solution. Using the Brouwer fixed point theorem, sufficient conditions for the existence of periodic solution are found.
2006 ◽
Vol 73
(2)
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pp. 175-182
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2021 ◽
Vol 2
(3)
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pp. 9-20
2010 ◽
Vol 82
(3)
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pp. 437-445
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2013 ◽
Vol 2013
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pp. 1-8
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