Differential games and Hamilton-Jacobi equations in the Heisenberg group

Abstract

The purpose of this work is twofold. First we study the solutions of a Hamilton-Jacobi equation of the form ut(t,x)+H(t,x,∇H u(t,x))=0, where ∇H u represents the horizontal gradient of a function u defined on the Heisenberg group I\!\!H. Motivated by the recent paper by Liu, Manfredi and Zhou (LiMaZh2016), we prove a Lipschitz continuity preserving property for u with respect to the Kor\'anyi homogeneous distances dG in I\!\!H. Secondly, we are keenly interested in introducing the game theory in I\!\!H, taking into account its Sub-Riemannian structure: inspired by ideas in the paper of Evans and Souganidis (see EvSo1984), in the paper of and Balogh, Calogero and Pini BaCaPi2014, we prove dG-Lipschitz regularity results for the lower and the upper value functions of a zero game with horizontal curves as its trajectories, and we study the Hamilton-Jacobi-Isaacs equations associated to such zero game. As a consequence, we also provide a representation of the viscosity solution of the initial Hamilton-Jacobi equation.