Improved Lipschitz approximation of H-perimeter minimizing boundaries
Abstract
We prove two new approximation results of H-perimeter minimizing boundaries by means of intrinsic Lipschitz functions in the setting of the Heisenberg group Hn with n2. The first one is an improvement of a result of Monti and is the natural reformulation in Hn of the classical Lipschitz approximation in Rn. The second one is an adaptation of the approximation via maximal function developed by De Lellis and Spadaro.
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