Topological and control theoretic properties of Hamilton-Jacobi equations via Lax-Oleinik commutators
- Resource Type
- Working Paper
- Authors
- Cannarsa, Piermarco; Cheng, Wei; Hong, Jiahui
- Source
- Subject
- Mathematics - Analysis of PDEs
Mathematics - Dynamical Systems
- Language
In the context of weak KAM theory, we discuss the commutators $\{T^-_t\circ T^+_t\}_{t\geqslant0}$ and $\{T^+_t\circ T^-_t\}_{t\geqslant0}$ of Lax-Oleinik operators. We characterize the relation $T^-_t\circ T^+_t=Id$ for both small time and arbitrary time $t$. We show this relation characterizes controllability for evolutionary Hamilton-Jacobi equation. Based on our previous work on the cut locus of viscosity solution, we refine our analysis of the cut time function $\tau$ in terms of commutators $T^+_t\circ T^-_t-T^+_t\circ T^-_t$ and clarify the structure of the super/sub-level set of the cut time function $\tau$.