Birational equivalence of the Zassenhaus varieties for basic classical Lie superalgebras and their purely-even reductive Lie subalgebras in odd characteristic
Abstract
Let g=g 0g 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 mathcalZ⊂Z, and Spec(Z) is rational under the standard hypotheses.
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