Rich dynamics in planar systems with heterogeneous nonnegative weights

Abstract

This paper studies the global structure of the set of nodal solutions of a generalized Sturm--Liouville boundary value problem associated to the quasilinear equation -(φ(u'))'= λ u + a(t)g(u), λ∈ R, where a(t) is non-negative with some positive humps separated away by intervals of degeneracy where a 0. When φ(s)=s this equation includes a generalized prototype of a classical model going back to Moore and Nehari, 1959. This is the first paper where the general case when λ∈R has been addressed when a 0. The semilinear case with a 0 has been recently treated by L\'opez-G\'omez and Rabinowitz.

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