Compactness estimates for Hamilton-Jacobi equations depending on space

Abstract

We study quantitative estimates of compactness in W1,1loc for the map St, t>0 that associates to every given initial data u0∈ Lip(RN) the corresponding solution St u0 of a Hamilton-Jacobi equation ut+H(x, ∇\!x u)=0\,, t≥ 0, x∈ RN, with a convex and coercive Hamiltonian H=H(x,p). We provide upper and lower bounds of order 1/N on the the Kolmogorov -entropy in W1,1 of the image through the map St of sets of bounded, compactly supported initial data. Quantitative estimates of compactness, as suggested by P.D. Lax, could provide a measure of the order of "resolution" and of "complexity" of a numerical method implemented for this equation. We establish these estimates deriving accurate a-priori bounds on the Lipschitz, semiconcavity and semiconvexity constant of a viscosity solution when the initial data is semiconvex. The derivation of a small time controllability result is also fundamental to establish the lower bounds on the -entropy.