Centers and Azumaya loci for finite W-algebras in positive characteristic
Abstract: In this paper, we study the center Z of the finite W-algebra $${\mathcal{T}}({\mathfrak{g}},e)$$ associated with a semi-simple Lie algebra $$\mathfrak{g}$$ over an algebraically closed field $$\mathbb{k}$$ of characteristic p≫0, and an arbitrarily given nilpotent element $$e \in{\mathfrak{g}} $$ We obtain an analogue of Veldkamp’s theorem on the center. For the maximal spectrum Specm(Z), we s… Show more
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Birational equivalence of the Zassenhaus varieties for basic classical Lie superalgebras and their purely-even reductive Lie subalgebras in odd characteristic
Let 𝔤 = 𝔤 0 ¯ ⊕ 𝔤 1 ¯ {{\mathfrak{g}}={\mathfrak{g}}_{\bar{0}}\oplus{\mathfrak{g}}_{\bar{1}}} be a basic classical Lie superalgebra over an algebraically closed field 𝐤 {{\mathbf{k}}} of characteristic p > 2 {p>2} . Denote by 𝒵 {\mathcal{Z}} the center of the universal enveloping algebra U ( 𝔤 ) {U({\mathfrak{g}})} . Then 𝒵 {\mathcal{Z}} turns out to be finitely-generated purely-even commutative algebra without nonzero divisors. In this paper, we demonstrate that the fraction Frac ( 𝒵 ) {\operatorname{Frac}(\mathcal{Z})} is isomorphic to Frac ( ℨ ) {\operatorname{Frac}(\mathfrak{Z})} for the center ℨ {\mathfrak{Z}} of U ( 𝔤 0 ¯ ) {U({\mathfrak{g}}_{\bar{0}})} . Consequently, both Zassenhaus varieties for 𝔤 {{\mathfrak{g}}} and 𝔤 0 ¯ {{\mathfrak{g}}_{\bar{0}}} are birationally equivalent via a subalgebra 𝒵 ~ ⊂ 𝒵 {\widetilde{\mathcal{Z}}\subset\mathcal{Z}} , and Spec ( 𝒵 ) {\operatorname{Spec}(\mathcal{Z})} is rational under the standard hypotheses.
Birational equivalence of the Zassenhaus varieties for basic classical Lie superalgebras and their purely-even reductive Lie subalgebras in odd characteristic
Let 𝔤 = 𝔤 0 ¯ ⊕ 𝔤 1 ¯ {{\mathfrak{g}}={\mathfrak{g}}_{\bar{0}}\oplus{\mathfrak{g}}_{\bar{1}}} be a basic classical Lie superalgebra over an algebraically closed field 𝐤 {{\mathbf{k}}} of characteristic p > 2 {p>2} . Denote by 𝒵 {\mathcal{Z}} the center of the universal enveloping algebra U ( 𝔤 ) {U({\mathfrak{g}})} . Then 𝒵 {\mathcal{Z}} turns out to be finitely-generated purely-even commutative algebra without nonzero divisors. In this paper, we demonstrate that the fraction Frac ( 𝒵 ) {\operatorname{Frac}(\mathcal{Z})} is isomorphic to Frac ( ℨ ) {\operatorname{Frac}(\mathfrak{Z})} for the center ℨ {\mathfrak{Z}} of U ( 𝔤 0 ¯ ) {U({\mathfrak{g}}_{\bar{0}})} . Consequently, both Zassenhaus varieties for 𝔤 {{\mathfrak{g}}} and 𝔤 0 ¯ {{\mathfrak{g}}_{\bar{0}}} are birationally equivalent via a subalgebra 𝒵 ~ ⊂ 𝒵 {\widetilde{\mathcal{Z}}\subset\mathcal{Z}} , and Spec ( 𝒵 ) {\operatorname{Spec}(\mathcal{Z})} is rational under the standard hypotheses.
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