Mathematics – Commutative Algebra
Scientific paper
2007-09-14
Mathematics
Commutative Algebra
Substantial revision after referee and other comments. The main results are the same but there are also new results and exampl
Scientific paper
Let K be an infinite field and denote by H(n,K) the family of pairs (A,B) of commuting nilpotent n by n matrices with entries in K. There has been substantial recent study of the connection between H(n,K) and the fibre H[n] of the punctual Hilbert scheme of the plane, over an n-fold point of the symmetric product, by V. Baranovsky, R. Basili, and A. Premet. We study the stratification of H(n,K) by the Hilbert function of the Artinian ring K[A,B]. We show that when dim_K K[A,B] = n, then the generic element of the pencil A+\lambda B, \lambda \in K, has Jordan partition the maximum partition P(H) whose diagonal lengths are the Hilbert function of K[A,B]. We denote by Q(P) the maximum Jordan partition of a nilpotent A commuting with a nilpotent B of Jordan partition P. We show that the stable partitions - those such that Q(P)=P - are those whose parts differ by at least two. In characteristic zero, the latter is a special case of a result of D. Panyushev. Our result on pencils shows that Q(P) has decreasing parts. In related work, T. Kosir and P. Oblak have shown further that Q(P) is itself stable.
Basili Roberta
Iarrobino Anthony
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