Antoni Kijowski, Qing Liu, Xiaodan Zhou
Published 2022-05-04Version 1
This paper is concerned with a PDE-based approach to the horizontally quasiconvex (h-quasiconvex for short) envelope of a given continuous function in the Heisenberg group. We provide a characterization for upper semicontinuous, h-quasiconvex functions in terms of the viscosity subsolution to a first-order nonlocal Hamilton-Jacobi equation. We also construct the corresponding envelope of a continuous function by iterating the nonlocal operator. One important step in our arguments is to prove the uniqueness and existence of viscosity solutions to the Dirichlet boundary problems for the nonlocal Hamilton-Jacobi equation. Applications of our approach to the h-convex hull of a given set in the Heisenberg group are discussed as well.
Gradient-type systems on unbounded domains of the Heisenberg group
$C^{1,α}$-Regularity of Quasilinear equations on the Heisenberg Group
Differential games and Hamilton-Jacobi equations in the Heisenberg group
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