R. Basili
Published 2003-01-20Version 1
Given an nxn nilpotent matrix over an algebraically closed field K, we prove some properties of the set of all the nxn nilpotent matrices over K which commute with it. Then we give a proof of the irreducibility of the variety of all the pairs (A,B) of nxn nilpotent matrices over K if either char K = 0 or char K isn't less than n/2. We get as a consequence a proof of the irreducibility of the local Hilbert scheme of n points of a smooth algebraic surface over K with the previous condition on char K.
Comments: LaTex, 27 pages, to appear in J. Algebra
On the irreducibility of multivariate subresultants
Some remarks on varieties of pairs of commuting upper triangular matrices and an interpretation of commuting varieties
Irreducibility of A-hypergeometric systems
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