Locally serially coalescent classes of Lie algebras
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| Author |
Honda, Masanobu
Faculty of Pharmaceutical Sciences, Niigata University of Pharmacy and Medical and Life Sciences
Sakamoto, Takanori
Department of Mathematics, University of Teacher Education Fukuoka
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| Abstract | We assume that a basic field k has zero characteristic. We show that any Fitting class is serially coalescent for locally finite Lie algebras. We also show that any class X satisfying N ≤ X ≤ ˆGr (e.g. Ft, B, Z, Gr, lN, rN, `e(◁)ˆA, ˆe(◁)ˆA, `Gr) is locally serially coalescent for locally finite Lie algebras, and, for any locally finite Lie algebra L, the X-ser radical of L is locally nilpotent.
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| Keywords | Lie algebra
serial subalgebra
locally coalescent class
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| Note | Mathematics Subject Classification. Primary 17B65; Secondary 17B30.
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| Published Date | 2025-01
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| Publication Title |
Mathematical Journal of Okayama University
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| Volume | volume67
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| Issue | issue1
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| Publisher | Department of Mathematics, Faculty of Science, Okayama University
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| Start Page | 67
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| End Page | 74
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| ISSN | 0030-1566
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| NCID | AA00723502
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| Content Type |
Journal Article
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| language |
English
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| Copyright Holders | Copyright ©2025 by the Editorial Board of Mathematical Journal of Okayama University
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| File Version | publisher
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| Refereed |
True
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| Submission Path | mjou/vol67/iss1/4
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