Topological and control theoretic properties of Hamilton-Jacobi equations via Lax-Oleinik commutators
Abstract
In the context of weak KAM theory, we discuss the commutators \T-t T+t\t≥slant0 and \T+t T-t\t≥slant0 of Lax-Oleinik operators. We characterize the relation T-t 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 τ in terms of commutators T+t T-t-T+t T-t and clarify the structure of the super/sub-level set of the cut time function τ.
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