Sub-Lorentzian geodesics on GL+(2,C) with the generating space of Hermitian matrices in the Lie algebra gl+(2,C)

Abstract

The Lie subgroup GL+(2,C) of all matrices in the Lie group GL(2,C) with positive real determinant is equipped with a left-invariant sub-Lorentzian (anti)metric defined by the natural structure of the 4-dimensional Minkowski space-time on the subspace of Hermitian matrices in its Lie algebra. In base of the corresponding time-anti-optimal control problem, formulated in the paper, and Pontryagin minimum principle for it, using geodesics and shortest arcs of the corresponding left-invariant sub-Riemannian metric on the Lie subgroup SL(2,C), the authors found sub-Lorentzian nonspacelike geodesics and longest arcs.

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