Left-Invariant Riemannian Distances on Higher-Rank Sol-Type Groups
Abstract
In this paper, we generalize the results of (Groups, Geom. Dyn., forthcoming) to describe the split left-invariant Riemannian distances on higher-rank Sol-type groups G=N Rk. We show that the rough isometry type of such a distance is determined by a specific restriction of the metric to Rk, and therefore the space of rough similarity types of distances is parameterized by the symmetric space SLk(R)/SOk(R). In order to prove this result, we describe a family of uniformly roughly geodesic paths, which arise by way of the new technique of Euclidean curve surgery.
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