A second-order operator for horizontal quasiconvexity in the Heisenberg group and application to convexity preserving for horizontal curvature flow

TL;DR

This paper introduces a second-order PDE operator to analyze horizontal quasiconvexity in the Heisenberg group and demonstrates its application in preserving convexity during horizontal curvature flow.

Contribution

It develops a nonlinear second order elliptic operator framework for h-quasiconvex functions and applies it to prove convexity preservation in horizontal curvature flow.

Findings

H-quasiconvex functions characterized as viscosity subsolutions.

Convexity preservation for star-shaped h-convex sets under curvature flow.

Established conditions for h-quasiconvexity in the Heisenberg group.

Abstract

This paper is concerned with a PDE approach to horizontally quasiconvex (h-quasiconvex) functions in the Heisenberg group based on a nonlinear second order elliptic operator. We discuss sufficient conditions and necessary conditions for upper semicontinuous, h-quasiconvex functions in terms of the viscosity subsolution to the associated elliptic equation. Since the notion of h-quasiconvexity is equivalent to the horizontal convexity (h-convexity) of the function's sublevel sets, we further adopt these conditions to study the h-convexity preserving property for horizontal curvature flow in the Heisenberg group. Under the comparison principle, we show that the curvature flow starting from a star-shaped h-convex set preserves the h-convexity during the evolution.