General Linear and Symplectic Nilpotent Orbit Varieties

Abstract

The condition of nilpotency is studied in the general linear Lie algebra gln(K) and the symplectic Lie algebra sp2m(K) over an algebraically closed field of characteristic 0. In particular, the conjugacy class of nilpotent matrices is described through nilpotent orbit varieties Oλ and an algorithm is provided for computing the closure Oλ Spec(K[X]/Jλ). We provide new generators for the ideal Jλ defining the affine variety Oλ which show that the generators provided in [J.Weyman - "The equations of conjugacy classes of nilpotent matrices", 1989] are not minimal. Furthermore, we conjecture the existence of local weak N\'eron models for nilpotent orbit varieties based on bounding p in the polynomial ring with p-adic integer coefficients for which the equations defining Oλ can embed.