Multiplicity of positive solutions for (p,q)-Laplace equations with two parameters

Abstract

We study the zero Dirichlet problem for the equation -p u -q u = α |u|p-2u+β |u|q-2u in a bounded domain ⊂ RN, with 1<q<p. We investigate the relation between two critical curves on the (α,β)-plane corresponding to the threshold of existence of special classes of positive solutions. In particular, in certain neighbourhoods of the point (α,β) = (\|∇ p\|pp/\|p\|pp, \|∇ p\|qq/\|p\|qq), where p is the first eigenfunction of the p-Laplacian, we show the existence of two and, which is rather unexpected, three distinct positive solutions, depending on a relation between the exponents p and q.