The Subelliptic ∞-Laplace System on Carnot-Carath\'eodory Spaces

Abstract

Given a Carnot-Carath\'eodory space n with associated vector fields X=\X1,...,Xm\, we derive the subelliptic ∞-Laplace system for mappings u : N, which reads \[ 1 X∞ u \, :=\, (Xu Xu + \|Xu\|2 [Xu] I ) : XX u\, = \, 0 1 \] in the limit of the subelliptic p-Laplacian as p ∞. Here Xu is the horizontal gradient and [Xu] is the projection on its nullspace. Next, we identify the Variational Principle characterizing 1, which is the "Euler-Lagrange PDE" of the supremal functional \[ 2 E∞(u,)\ := \ \|Xu\|L∞() 2 \] for an appropriately defined notion of Horizontally ∞-Minimal Mappings. We also establish a maximum principle for \|Xu\| for solutions to 1. These results extend previous work of the author K1, K2 on vector-valued Calculus of Variations in L∞ from the Euclidean to the subelliptic setting.