Birational equivalence of the Zassenhaus varieties for basic classical Lie superalgebras and their purely-even reductive Lie subalgebras in odd characteristic

Bin Shu; Lisun Zheng; Ye Ren

doi:10.1515/forum-2023-0326

Article

Birational equivalence of the Zassenhaus varieties for basic classical Lie superalgebras and their purely-even reductive Lie subalgebras in odd characteristic

Bin Shu , Lisun Zheng and Ye Ren

Published/Copyright: June 26, 2024

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From the journal Forum Mathematicum Volume 37 Issue 3

Abstract

Let 𝔤 = 𝔤 0 ¯ ⊕ 𝔤 1 ¯ be a basic classical Lie superalgebra over an algebraically closed field 𝐤 of characteristic p > 2 . Denote by 𝒵 the center of the universal enveloping algebra U ⁢ ( 𝔤 ) . Then 𝒵 turns out to be finitely-generated purely-even commutative algebra without nonzero divisors. In this paper, we demonstrate that the fraction Frac ⁡ ( 𝒵 ) is isomorphic to Frac ⁡ ( ℨ ) for the center ℨ of U ⁢ ( 𝔤 0 ¯ ) . Consequently, both Zassenhaus varieties for 𝔤 and 𝔤 0 ¯ are birationally equivalent via a subalgebra 𝒵 ~ ⊂ 𝒵 , and Spec ⁡ ( 𝒵 ) is rational under the standard hypotheses.

Keywords: Basic classical Lie superalgegbras; centers of universal enveloping algebras; maximal spectrums; Zassenhaus varieties

MSC 2020: 17B50; 17B35; 17B45; 14E08; 14M20

Communicated by Jan Frahm

Funding source: National Natural Science Foundation of China

Award Identifier / Grant number: 12071136

Award Identifier / Grant number: 12271345

Funding statement: This work is partially supported by the National Natural Science Foundation of China (12071136 and 12271345), and by Science and Technology Commission of Shanghai Municipality (No. 22DZ2229014).

Acknowledgements

The authors are grateful to the referee for his/her helpful comments and suggestions which enable them to improve and revise the manuscript.

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Received: 2023-09-07

Revised: 2024-04-26

Published Online: 2024-06-26

Published in Print: 2025-02-01

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Articles in the same Issue

https://doi.org/10.1515/forum-2023-0326

Keywords for this article

Basic classical Lie superalgegbras; centers of universal enveloping algebras; maximal spectrums; Zassenhaus varieties