Lipschitz regularity for almost minimizers of a one-phase p-Bernoulli-type functional in Carnot Groups of step two
Abstract
In this paper, in a Carnot group G of step 2 and homogeneous dimension Q, we prove that almost minimizers of the (horizontal) one-phase p-Bernoulli-type functional Jp(u,):=∫( |∇G u(x)|p+\u>0\(x))\,dx whenever p>p\#:=2QQ+2, are locally Lipschitz continuous with respect Carnot-Carath\'eodory distance on G. This implies an H\"older continuous regularity from an Euclidean point of view.
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