Regularity of minimizers of semilinear elliptic problems up to dimension four

Abstract

We consider the class of semi-stable solutions to semilinear equations - u=f(u) in a bounded smooth domain of Rn (with convex in some results). This class includes all local minimizers, minimal, and extremal solutions. In dimensions n ≤ 4, we establish an priori L∞ bound which holds for every positive semi-stable solution and every nonlinearity f. This estimate leads to the boundedness of all extremal solutions when n=4 and is convex. This result was previously known only in dimensions n≤ 3 by a result of G. Nedev. In dimensions 5 ≤ n ≤ 9 the boundedness of all extremal solutions remains an open question. It is only known to hold in the radial case =BR by a result of A. Capella and the author.