Abstract
We study the existence of positive periodic solutions of the second-order difference equation
Highlights
Introduction and the main results LetZ denote the integer set, for a, b Î Z with a < b, [a, b]Z : = {a, a + 1,..., b} and R+ : = [0; ∞)
We study the existence of positive periodic solutions of the second-order difference equation
We are concerned with the existence of positive periodic solutions of the second-order difference equation
Summary
Abstract We study the existence of positive periodic solutions of the second-order difference equation Via Schauder’s fixed point theorem, where a, c : Z ® R+ are T -periodic functions, f Î C(Z × (0, ∞), R) is T -periodic with respect to t and singular at u = 0. We are concerned with the existence of positive periodic solutions of the second-order difference equation
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