Moore-Penrose Inverse, Parabolic Subgroups, and Jordan Pairs

E. Tevelev

doi:10.5802/jolt.274

E. Tevelev

Journal of Lie Theory, Volume 12 (2002) no. 2, pp. 461-481

Abstract

A Moore-Penrose inverse of an arbitrary complex matrix A is defined as a unique matrix A⁺ such that AA⁺A = A, A⁺AA⁺ = A⁺, and AA⁺, A⁺A are Hermite matrices. We show that this definition has a natural generalization in the context of shortly graded simple Lie algebras corresponding to parabolic subgroups with "aura" (abelian unipotent radical) in simple complex Lie groups, or equivalently in the context of simple complex Jordan pairs. We give further generalizations and applications.

arXiv EuDML Zbl

DOI: 10.5802/jolt.274

Classification: 15A09, 17B45, 22E10
Keywords: Lie groups, generalized inverse, Moore-Penrose inverse, simple Lie algebras, bilinear forms, Moore-Penrose orbits, parabolic subgroups

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     author = {E. Tevelev},
     title = {Moore-Penrose {Inverse,} {Parabolic} {Subgroups,} and {Jordan} {Pairs}},
     journal = {Journal of Lie Theory},
     pages = {461--481},
     year = {2002},
     volume = {12},
     number = {2},
     doi = {10.5802/jolt.274},
     zbl = {1002.15008},
     url = {https://jolt.centre-mersenne.org/articles/10.5802/jolt.274/}
}

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E. Tevelev. Moore-Penrose Inverse, Parabolic Subgroups, and Jordan Pairs. Journal of Lie Theory, Volume 12 (2002) no. 2, pp. 461-481. doi: 10.5802/jolt.274

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