arXiv:math/0302204 Abstract

arXiv:math/0302204 [math.RT]Abstract References Reviews Resources

Nilpotent commuting varieties of reductive Lie algebras

Published 2003-02-18Version 1

We prove that the nilpotent commuting variety of a reductive Lie algebra over an algebraically closed field of good characteristic is equidimensional. In characteristic zero, this confirms a conjecture of Vladimir Baranovsky. As a by-product, we obtain tat the punctual (local) Hilbert scheme parametrising the ideals of colength $n$ in $k[[X,Y]]$ is irreducible over any algebraically closed field $k$.

Comments: 25 pages

DOI: 10.1007/s00222-003-0315-6

Categories: math.RT

Keywords: nilpotent commuting variety, reductive lie algebra, algebraically closed field, characteristic zero, vladimir baranovsky

Tags: journal article

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arXiv:math/0302204 [math.RT]Abstract References Reviews Resources

Nilpotent commuting varieties of reductive Lie algebras

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Nilpotent commuting varieties of reductive Lie algebras

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arXiv:math/0302204 [math.RT]Abstract References Reviews Resources