H\"older continuity of bounded, weak solutions of a variational system in the critical case

Abstract

Let ⊂R2 be a bounded, Lipschitz domain. We consider bounded, weak solutions (u∈ W1, 2 L∞(;RN)) of the vector-valued, Euler-Lagrange system: div ( A(x, u)Du)=g(x, u, Du) . Under natural growth conditions on the principal part and the inhomogeneity, but without any further restriction on the growth of the inhomogeneity (for example, via a smallness condition), we use a blow-up argument to prove that every bounded, weak solution of the system is H\"older continuous. Since the dimension of is 2 and u∈ W1, 2(;RN), we are in the critical setting, and hence, cannot use the Sobolev embedding theorem to deduce H\"older continuity. Our results are connected to a particular case of the open problem of whether all solutions (and not just extremals) of variational systems are H\"older continuous in the critical setting.