Stability Analysis of Higher Order Fractional Difference Equations

Abstract

Fractional difference equations provide a flexible mathematical framework for modeling complex systems with memory, hereditary, and non-local effects. In this work, we study the stability of higher-order two-term fractional linear difference equations α x(t) + a \, β x(t+α-β-1) =(b-1)x(t+α-2). The stability results are derived, and we discuss the bifurcations for 0<β ≤ 1 < α ≤ 2, a>0, b ∈ C or b ∈ R with examples. We extend this to the stability of an equilibrium point of a nonlinear higher-order fractional difference equation. Moreover, we study the stability of higher-order one-term linear fractional difference equations α x(t) = (c-1) x(t+α-N) with N-1<α ≤ N, where N ∈ N.

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