Intrinsically Lipschitz functions with normal target in Carnot groups
Nyckelord:
Carnot groups, intrinsically Lipschitz functions, Rademacher theorem, area formulaAbstract
We provide a Rademacher theorem for intrinsically Lipschitz functions \(\phi\colon U\subseteq\mathbf{W}\to\mathbf{L}\), where \(U\) is a Borel set, \(\mathbf{W}\) and \(\mathbf{L}\) are complementary subgroups of a Carnot group, where we require that \(\mathbf{L}\) is a normal subgroup. Our hypotheses are satisfied for example when \(\mathbf{W}\) is a horizontal subgroup. Moreover, we provide an area formula for this class of intrinsically Lipschitz functions.Referera så här
Antonelli, G., & Merlo, A. (2021). Intrinsically Lipschitz functions with normal target in Carnot groups. Annales Fennici Mathematici, 46(1), 571–579. Hämtad från https://afm.journal.fi/article/view/109691
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