Overdetermined problems for gauge balls in the Heisenberg group
Abstract
In this paper we aim at characterizing the gauge balls in the Heisenberg group Hn as the only domains where suitable overdetermined problems of Serrin type can be solved. We discuss a one parameter family of overdetermined problems where both the source functions and the Neumann-like data are non-constant and they are related to the geometry of the underlying setting. The uniqueness results are established in the class of domains in Hn having partial symmetries of cylindrical type for any n≥ 1, and they are sharper in the lowest dimensional cases of H1 and H2 where we can respectively treat domains with S1 and S1× S1 invariances.
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