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January 2022 Addendum to: Maximal tori of extrinsic symmetric spaces and meridians
Jost-Hinrich Eschenburg, Peter Quast, Makiko Sumi Tanaka
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Osaka J. Math. 59(1): 113-114 (January 2022).


Improving a theorem in [1] we observe that a maximal torus of an extrinsic symmetric space in a euclidean space $V$ is itself extrinsic symmetric in some affine subspace of $V$.


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Jost-Hinrich Eschenburg. Peter Quast. Makiko Sumi Tanaka. "Addendum to: Maximal tori of extrinsic symmetric spaces and meridians." Osaka J. Math. 59 (1) 113 - 114, January 2022.


Received: 1 June 2020; Revised: 20 October 2020; Published: January 2022
First available in Project Euclid: 31 January 2022

MathSciNet: MR4373486
zbMATH: 1490.53074

Primary: 53C35
Secondary: 53C40

Rights: Copyright © 2022 Osaka University and Osaka City University, Departments of Mathematics

Vol.59 • No. 1 • January 2022
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