Tanisaki introduced generating sets for the defining ideals of the schematic intersections of the closure of conjugacy classes of nilpotent matrices with the set of diagonal matrices. These ideals are naturally labeled by integer partitions. Given such a partition lambda, we define several methods to produce a reduced generating set for the associated ideal I(lambda). For particular shapes we find nice generating sets. By comparing our sets with some generating sets of I(lambda) arising from a work of Weyman, we find a counterexample to a related conjecture of Weyman.
Biagioli R, Faridi S, Rosas M (2008). The Defining Ideals of Conjugacy Classes of Nilpotent Matrices and a Conjecture of Weyman. INTERNATIONAL MATHEMATICS RESEARCH NOTICES, 2008(1), 1-33 [10.1093/imrn/rnn117].
The Defining Ideals of Conjugacy Classes of Nilpotent Matrices and a Conjecture of Weyman
Biagioli R;
2008
Abstract
Tanisaki introduced generating sets for the defining ideals of the schematic intersections of the closure of conjugacy classes of nilpotent matrices with the set of diagonal matrices. These ideals are naturally labeled by integer partitions. Given such a partition lambda, we define several methods to produce a reduced generating set for the associated ideal I(lambda). For particular shapes we find nice generating sets. By comparing our sets with some generating sets of I(lambda) arising from a work of Weyman, we find a counterexample to a related conjecture of Weyman.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
