Zassenhaus varieties of general linear Lie algebras
Abstract
Let g be a Lie algebra over an algebraically closed field of characteristic p>0 and let U(g) be the universal enveloping algebra of g. We prove in this paper that for g=gln and g=sln the centre of U(g) is a unique factorisation domain and its field of fractions is rational. For g=sln our argument requires the assumption that p n while for g=gln it works for any p. It turned out that our two main results are closely related to each other. The first one confirms in type A a recent conjecture of A.Braun and C.Hajarnavis while the second answers a question of J.Alev.
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