On the normality of commuting scheme for general linear Lie algebra
Abstract
The commuting scheme Cdg for reductive Lie algebra g over an algebraically closed field K is the subscheme of gd defined by quadratic equations, whose K-valued points are d-tuples of commuting elements in g over K. There is a long-standing conjecture that the commuting scheme Cdg is reduced. Moreover, a higher dimensional analog of Chevalley restriction conjecture was conjectured by Chen-Ng\o. We show that the commuting scheme of C2gln is Cohen-Macaulay and normal. As a corollary, we prove a 2-dimensional Chevalley restriction theorem for general linear group in positive characteristic.
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