Dimensional lower bounds for contact surfaces of Cheeger sets

Abstract

We carry on an analysis of the size of the contact surface of a Cheeger set E with the boundary of its ambient space . We show that this size is strongly related to the regularity of ∂ by providing bounds on the Hausdorff dimension of ∂ E ∂. In particular we show that, if ∂ has C1,α regularity then Hd-2+α(∂ E ∂)>0. This shows that a sufficient condition to ensure that Hd-1(∂ E ∂ )>0 is that ∂ has C1,1 regularity. Since the Hausdorff bounds can be inferred in dependence of the regularity of ∂ E as well, we obtain that convex, which yields ∂ E∈ C1,1, is also a sufficient condition. Finally, we construct examples showing that such bounds are optimal in dimension d=2.