SVD-closed subgroups of the unitary group: generalized principal logarithms and minimizing geodesics

Abstract

We study the set of generalized principal g-logarithms of any matrix belonging to a connected SVD-closed subgroup G of Un, with Lie algebra g. This set is a non-empty disjoint union of a finite number of subsets diffeomorphic to homogeneous spaces, and it is related to a suitable set of minimizing geodesics. Many particular cases for the group G are explicitly analysed.

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