L∞ a-priori estimates for subcritical p-laplacian equations with a Carath\'eodory nonlinearity

Abstract

We present new L∞ a priori estimates for weak solutions of a wide class of subcritical p-laplacian equations in bounded domains. No hypotheses on the sign of the solutions, neither of the non-linearities are required. This method is based in elliptic regularity for the p-laplacian combined either with Gagliardo-Nirenberg or Caffarelli-Kohn-Nirenberg interpolation inequalities. Let us consider a quasilinear boundary value problem -p u= f(x,u), in , with Dirichlet boundary conditions, where ⊂ RN , with p<N, is a bounded smooth domain strictly convex, and f is a subcritical Carath\'eodory non-linearity. We provide L∞ a priori estimates for weak solutions, in terms of their Lp*-norm, where p*= NpN-p\ is the critical Sobolev exponent. By a subcritical non-linearity we mean, for instance, |f(x,s)| |x|-μ\, f(s), where μ∈(0,p), and f(s)/|s|pμ*-1 0 as |s| ∞, here p*μ:=p(N-μ)N-p is the critical Sobolev-Hardy exponent. Our non-linearities includes non-power non-linearities. In particular we prove that when f(x,s)=|x|-μ\,|s|p*μ-2s[(e+|s|)]α\,, with μ∈[1,p), then, for any >0 there exists a constant C>0 such that for any solution u∈ H10(), the following holds [(e+\|u\|∞)]α C \, (1+\|u\|p*)\, (p*μ-p)(1+)\, , where C is independent of the solution u.