Anti-commuting varieties
Abstract
We study the anti-commuting variety which consists of pairs of anti-commuting n× n matrices. We provide an explicit description of its irreducible components and their dimensions. The GIT quotient of the anti-commuting variety with respect to the conjugation action of GLn is shown to be of pure dimension n. We also show the semi-nilpotent anti-commuting variety (in which one matrix is required to be nilpotent) is of pure dimension n2 and describe its irreducible components.
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