Pointwise bounds for positive supersolutions of nonlinear elliptic problems involving the p-Laplacian and application

Abstract

We derive a priori bounds for positive supersolutions of - p u = (x) f(u) , where p>1 and p is the p-Laplace operator, in a smooth bounded domain of RN with zero Dirichlet boundary conditions. We apply the results to nonlinear elliptic eigenvalue problem - p u = λ f(u) , with Dirichlet boundary condition, where f is a nondecreasing continuous differentiable function on [0,∞] such that f(0) > 0 , f(t)1p-1 is superlinear at infinity, and give sharp upper and lower bounds for the extremal parameter λp* . In particular, we consider the nonlinearities f(u) = eu and f(u) = (1+u)m ( m > p-1 ) and give explicit estimates on λp* . As a by-product of our results, we obtain a lower bound for the principal eigenvalue of the p -Laplacian that improves obtained results in the recent literature for some range of p and N .