Continuation theorems for periodic systems and applications to problems with nonlinear time-dependent differential operators

Abstract

In this paper we propose some continuation theorems for the periodic problem equation* cases \, xi' = gi(t,xi+1), &i=1,…,n-1, \\ \, xn' = h(t,x1,…,xn), \\ \, xi(0)=xi(T), &i=1,…,n, cases equation* providing a unified framework that improves and extends earlier contributions by Jean Mawhin and collaborators to second-order differential problems governed by nonlinear time-dependent differential operators of the form equation* cases \, (φ(t,x'))'=f(t,x,x'), \\ \, x(0)=x(T), x'(0)=x'(T). cases equation* The proof is based on the topological degree theory.

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