Periodic solutions to superlinear indefinite planar systems: a topological degree approach

Abstract

We deal with a planar differential system of the form equation* cases \, u' = h(t,v), \\ \, v' = - λ a(t) g(u), cases equation* where h is T-periodic in the first variable and strictly increasing in the second variable, λ>0, a is a sign-changing T-periodic weight function and g is superlinear. Based on the coincidence degree theory, in dependence of λ, we prove the existence of T-periodic solutions (u,v) such that u(t)>0 for all t∈R. Our results generalize and unify previous contributions about Butler's problem on positive periodic solutions for second-order differential equations (involving linear or φ-Laplacian-type differential operators).

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