Existence of C1,1 critical subsolutions in discrete weak KAM theory

Abstract

In this article, following a first work of the author, we study critical subsolutions in discrete weak KAM theory. In particular, we establish that if the cost function c:M × M defined on a smooth connected manifold is locally semi-concave and verifies twist conditions, then there exists a C1,1 critical subsolution strict on a maximal set (namely, outside of the Aubry set). We also explain how this applies to costs coming from Tonelli Lagrangians. Finally, following ideas introduced in the work of Fathi-Maderna and Mather, we study invariant cost functions and apply this study to certain covering spaces, introducing a discrete analogue of Mather's α function on the cohomology.