For a strictly convex set K subset of R^2 of class C^2 we consider its associated sub-Finsler K-perimeter vertical bar partial derivative |\partial E|_K in H^1 and the prescribed mean curvature functional vertical bar partial derivative |\partial E|_K - \int_E f associated to a continuous function f . Given a critical set for this functional with Euclidean Lipschitz and intrinsic regular boundary, we prove that their characteristic curves are of class C^2 and that this regularity is optimal. The result holds in particular when the boundary of E is of class C^1.
Regularity of Lipschitz boundaries with prescribed sub-Finsler mean curvature in the Heisenberg group H^1 / Giovannardi, G; Ritore, M. - In: JOURNAL OF DIFFERENTIAL EQUATIONS. - ISSN 0022-0396. - ELETTRONICO. - 302:(2021), pp. 474-495. [10.1016/j.jde.2021.08.040]
Regularity of Lipschitz boundaries with prescribed sub-Finsler mean curvature in the Heisenberg group H^1
Giovannardi, G;
2021
Abstract
For a strictly convex set K subset of R^2 of class C^2 we consider its associated sub-Finsler K-perimeter vertical bar partial derivative |\partial E|_K in H^1 and the prescribed mean curvature functional vertical bar partial derivative |\partial E|_K - \int_E f associated to a continuous function f . Given a critical set for this functional with Euclidean Lipschitz and intrinsic regular boundary, we prove that their characteristic curves are of class C^2 and that this regularity is optimal. The result holds in particular when the boundary of E is of class C^1.
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