Stability of periodic solutions of first-order difference equations lying between lower and upper solutions

We prove that if there exists α ≤ β, a pair of lower and upper solutions of the first-order discrete periodic problem Δu(n) = f(n,u(n));n ∈ I _N ≡ {0,...,N-1},u(0) = u(N), with f a continuous N-periodic function in its first variable and such that x + f(n,x) is strictly increasing in x, for every n ∈ I _N , then, this problem has at least one solution such that its N-periodic extension to ℕ is stable. In several particular situations, we may claim that this solution is asymptotically stable.

Authors and Affiliations

1. Departamento de Análise Matemática, Facultade de Matemáticas, Universidade de Santiago de Compostela, Galicia, Santiago de Compostela, 15782, Spain

   Alberto Cabada, Victoria Otero-Espinar & Dolores Rodríguez-Vivero

Corresponding author

Correspondence to Alberto Cabada.

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