Riemannian cubics in quadratic matrix Lie groups

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摘要

Quadratic matrix Lie groups are subgroups of the general linear group that satisfy a quadratic matrix identity. The main purpose of this paper is to consider Riemannian cubics in quadratic matrix Lie groups with left-invariant metrics. Results for Riemannian cubics in quadratic matrix Lie groups extend those in SO(n) since the group SO(n) with bi-invariant metric is a very special case. By examining Riemannian cubics in SO(2, 1) and SO(3, 1), we find that the so-called null Lie quadratics in so(p,q) (p > 0, q > 0), and even more generally for any quadratic matrix Lie group, can be given in closed forms in terms of Lie quadratics in so(p) and so(q). Further, we present some quantitative analyses of non-null Lie quadratics in so(p,q).

论文关键词:Riemannian cubic,Lie quadratic,Quadratic matrix Lie group,Generalized orthogonal group,Symplectic group

论文评审过程:Received 29 August 2019, Revised 12 December 2019, Accepted 19 January 2020, Available online 7 February 2020, Version of Record 7 February 2020.

论文官网地址:https://doi.org/10.1016/j.amc.2020.125082