Unilateral global bifurcation and nodal solutions for the p-Laplacian with sign-changing weight

Abstract

In this paper, we shall establish a Dancer-type unilateral global bifurcation result for a class of quasilinear elliptic problems with sign-changing weight. Under some natural hypotheses on perturbation function, we show that (μk(p),0) is a bifurcation point of the above problems and there are two distinct unbounded continua, (Ck)+ and (Ck)-, consisting of the bifurcation branch Ck from (μk(p), 0), where μk(p) is the k-th positive or negative eigenvalue of the linear problem corresponding to the above problems, ∈\+,-\. As the applications of the above unilateral global bifurcation result, we study the existence of nodal solutions for a class of quasilinear elliptic problems with sign-changing weight. Moreover, based on the bifurcation result of Dr\'abek and Huang (1997) [DH], we study the existence of one-sign solutions for a class of high dimensional quasilinear elliptic problems with sign-changing weight.