Maximum principles for weakly 1-coercive operators with applications to capillary and prescribed mean curvature graphs

Abstract

In this paper we establish maximum principles for weakly 1-coercive operators L on complete, non-compact Riemannian manifolds M. In particular, we search for conditions under which one can guarantee that solutions u of differential equations of the form L(u)≥ f(u) satisfy f(u)≤ 0 on M. The case of weakly p-coercive operators with p>1, including the p-Laplacian and in particular the Laplace-Beltrami operator for p=2, has been considered in a recent paper of ours. As a consequence of the main results we infer comparison principles for that kind of operators. Furthermore we apply them to geometric situations dealing with the mean curvature operator, which is a typical weakly 1-coercive operator. We first consider the case of C1 operators L acting on functions u of class C2 and, in the last section of the paper, we show how our results can be extended to the case of less regular operators L acting on functions u which are just continuous and locally W1,1 regular.