Uniform a priori bounds for Slightly Subcritical Elliptic Problems

Abstract

We obtain a uniform L∞() a priori bound, for any positive weak solutions to elliptic problem with a nonlinearity f slightly subcritical, slightly superlinear, and regularly varying. To achieve our result, we first obtain a uniform estimate of an specific L1() weighted norm. This, combined with moving planes method and elliptic regularity theory, provides a uniform L∞ bound in a neighborhood of the boundary of . Next, by using Pohozaev's identity, we obtain a uniform estimate of one weighted norm of the solutions. Joining now elliptic regularity theory, and Morrey's Theorem, we estimate from below the radius of a ball where a solution exceeds the half of its L∞()-norm. Finally, going back to the previous uniform weighted norm estimate, we conclude our result.