The limiting behavior of solutions to p-Laplacian problems with convection and exponential terms

Abstract

We consider, for a,l≥1, b,s,α>0, and p>q≥1, the homogeneous Dirichlet problem for the equation -pu=λ uq-1+β ua-1 ∇ u b+mul-1eα us in a smooth bounded domain ⊂RN. We prove that under certain setting of the parameters λ, β and m the problem admits at least one positive solution. Using this result we prove that if λ,β>0 are arbitrarily fixed and m is sufficiently small, then the problem has a positive solution up, for all p sufficiently large. In addition, we show that up converges uniformly to the distance function to the boundary of , as p→∞. This convergence result is new for nonlinearities involving a convection term.