On the finite (Q-1)-Hausdorff measure of the free boundary in the subelliptic obstacle problem

Abstract

In this note, we prove the finite (Q-1)-Hausdorff measure of the free boundary in the obstacle problem in a Carnot group G. Here, Q represents the homogeneous dimension of G. Our main result, Theorem 1.1, constitutes the subelliptic counterpart of the Euclidean result due to Caffarelli, but the analysis is complicated by the lack of commutation of the left-invariant vector fields. This obstruction is compensated by the use of right-invariant derivatives, and by a delicate compactness argument inspired to Caffarelli's fundamental works.