A priori bounds and multiplicity results for slightly superlinear and sublinear elliptic p-Laplacian equations

Abstract

We consider the following problem -pu= h(x,u) in , u∈ W1,p0(), where is a bounded domain in RN, 1<p<N, with a smooth boundary. In this paper we assume that h(x,u)=a(x)f(u)+b(x)g(u) such that f is regularly varying of index p-1 and superlinear at infinity. The function g is a p-sublinear function at zero. The coefficients a and b belong to Lk() for some k>Np and they are without sign condition. Firstly, we show a priori bound on solutions, then by using variational arguments, we prove the existence of at least two nonnegative solutions. One of the main difficulties is that the nonlinearity term h(x,u) does not satisfy the standard Ambrosetti and Rabinowitz condition.

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