Eigenvalues, bifurcation and one-sign solutions for the periodic p-Laplacian

Abstract

In this paper, we establish a unilateral global bifurcation result for a class of quasilinear periodic boundary problems with a sign-changing weight. By the Ljusternik-Schnirelmann theory, we first study the spectrum of the periodic p-Laplacian with the sign-changing weight. In particular, we show that there exist two simple, isolated, principal eigenvalues λ0+ and λ0-. Furthermore, under some natural hypotheses on perturbation function, we show that (λ0,0) is a bifurcation point of the above problems and there are two distinct unbounded sub-continua C+ and C-, consisting of the continuum C emanating from (λ0, 0), where ∈\+,-\. As an application of the above result, we study the existence of one-sign solutions for a class of quasilinear periodic boundary problems with the sign-changing weight. Moreover, the uniqueness of one-sign solutions and the dependence of solutions on the parameter λ are also studied.