The Jacobi-orthogonality in indefinite scalar product spaces
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Published:2024
Issue:129
Volume:115
Page:33-44
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ISSN:0350-1302
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Container-title:Publications de l'Institut Mathematique
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language:en
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Short-container-title:Publ Inst Math (Belgr)
Affiliation:
1. Faculty of Mathematics, University of Belgrade, Belgrade, Serbia
Abstract
We generalize the property of Jacobi-orthogonality to indefinite scalar
product spaces. We compare various principles and investigate relations
between Osserman, Jacobi-dual, and Jacobi-orthogonal algebraic curvature
tensors. We show that every quasi-Clifford tensor is Jacobi-orthogonal. We
prove that a Jacobi-diagonalizable Jacobi-orthogonal tensor is Jacobi-dual
whenever JX has no null eigenvectors for all nonnull X. We show that any
algebraic curvature tensor of dimension 3 is Jacobi-orthogonal if and only
if it is of constant sectional curvature. We prove that every 4-dimensional
Jacobidiagonalizable algebraic curvature tensor is Jacobi-orthogonal if and
only if it is Osserman.
Funder
Ministry of Education, Science and Technological Development of the Republic of Serbia
Publisher
National Library of Serbia