Population models in almost periodic environments |
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Authors: | Toka Diagana Saber Elaydi |
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Affiliation: | 1. Department of Mathematics , Howard University , 2441 6th Street N.W., Washington, DC, 20059, USA;2. Department of Mathematics , Trinity University , San Antonio, TX, 78212, USA |
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Abstract: | We establish the basic theory of almost periodic sequences on ?+. Dichotomy techniques are then utilized to find sufficient conditions for the existence of a globally attracting almost periodic solution of a semilinear system of difference equations. These existence results are, subsequently, applied to discretely reproducing populations with and without overlapping generations. Furthermore, we access evidence for attenuance and resonance in almost periodically forced population models. |
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Keywords: | Bohr almost periodic sequences Bochner almost periodic sequences Almost periodicity Regular dichotomy Globally attracting almost periodic solution Beverton-Holt equation |
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