6533b827fe1ef96bd12866b4

RESEARCH PRODUCT

Regularity properties of spheres in homogeneous groups

Enrico Le DonneSebastiano Nicolussi Golo

subject

Mathematics - Differential GeometryPure mathematicsGeodesicjoukot (matematiikka)General MathematicsGroup Theory (math.GR)algebra01 natural sciencessets (mathematics)Homothetic transformationMathematics - Metric Geometry0103 physical sciencesEuclidean geometryFOS: MathematicsHeisenberg groupMathematics::Metric GeometryMathematics (all)spheres0101 mathematicsMathematics28A75 22E25 53C60 53C17 26A16homogeneous groupsmatematiikkamathematicsGroup (mathematics)Applied Mathematicsta111010102 general mathematicsLie groupMetric Geometry (math.MG)Lipschitz continuityAutomorphismDifferential Geometry (math.DG)regularity properties010307 mathematical physicsMathematics - Group TheoryMathematics (all); Applied Mathematics

description

We study left-invariant distances on Lie groups for which there exists a one-parameter family of homothetic automorphisms. The main examples are Carnot groups, in particular the Heisenberg group with the standard dilations. We are interested in criteria implying that, locally and away from the diagonal, the distance is Euclidean Lipschitz and, consequently, that the metric spheres are boundaries of Lipschitz domains in the Euclidean sense. In the first part of the paper, we consider geodesic distances. In this case, we actually prove the regularity of the distance in the more general context of sub-Finsler manifolds with no abnormal geodesics. Secondly, for general groups we identify an algebraic criterium in terms of the dilating automorphisms, which for example makes us conclude the regularity of homogeneous distances on the Heisenberg group.In such a group, we analyze in more details the geometry of metric spheres. We also provide examples of homogeneous groups where spheres presents cusps.

yearjournalcountryeditionlanguage
2015-09-13
10.1090/tran/7038http://hdl.handle.net/11568/977871