Alfonso Sorrentino
Published 2019-04-02Version 1
In this article we describe how the celebrated result by Lions, Papanicolau and Varadhan on the Homogenization of Hamilton-Jacobi equation can be extended beyond the Euclidean setting. More specifically, we show how to obtain a homogenization result in the case of Hamiltonians that are invariant under the action of a discrete (virtually) nilpotent group (i.e., with polynomial growth), following ideas of M. Gromov [18] and P. Pansu [28].
Comments: 43 pages (This article is a revised version of some unpublished notes by the author from 2015)
Restriction of viscosity solutions of the Hamilton-Jacobi equation to a submanifold M of \mathbb{R}^{d}
Front tracking and iterated minmax for Hamilton-Jacobi equation in one space variable
Quantitative compactness estimates for Hamilton-Jacobi equations
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