Positive periodic solution of a discrete obligate Lotka-Volterra model

Fengde Chen, Liqiong Pu, Liya Yang

Abstract


In this paper, sufficient conditions are obtained for the existence of positive periodic solution of the following discrete obligate Lotka-Volterra model

$$\begin{array}{rcl}

x_1(k+1)&=& x_1(k)\exp\big\{ - a_1(k)-b_1(k)x_1(k)+c_1(k)x_2(k)\big\},\\[4mm]

x_2(k+1)&=& x_2(k)\exp\big\{ a_2(k)-b_2(k)x_2(k)\big\},

\end{array}

$$

where $ \{a_{i}(k)\}, \{b_{i}(k)\}, i=1, 2$ and $\{c_1(k)\} $ are all positive $\omega$-periodic sequences, $\omega $ is a fixed positive integer.

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Published: 2015-05-11

How to Cite this Article:

Fengde Chen, Liqiong Pu, Liya Yang, Positive periodic solution of a discrete obligate Lotka-Volterra model, Commun. Math. Biol. Neurosci., 2015 (2015), Article ID 14

Copyright © 2015 Fengde Chen, Liqiong Pu, Liya Yang. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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