The Magic and Mystery of Component Tableaux
Abstract
Let G be a simple algebraic group over the complex field C, P a parabolic subgroup containing B its Borel subgroup, P' its derived group and m the Lie algebra of its nilradical. The nilfibre N for this action is the zero locus of the augmentation I+ of the semi-invariant algebra I= C[ m]P'. For G=SL(n) practically nothing was known previously. The only result of comparable, but lesser complexity, is for V:= O n, with O a nilptent G orbit and n the set of strictly upper triangular matrices. Then V is equidimensional with components known as orbital varieties, parameterised by standard tableaux whose shape is dictated by O. Here the components of N are studied for G=SL(n). They increase exponentially in n with no a priori discernable pattern. For each choice of numerical data C, a semi-standard tableau T C, is constructed from T. A delicate and tightly interlocking analysis constructs a set of excluded root vectors from m such that the complementary space u C has the following properties. First it is a subalgebra of m. Secondly C:=B. u C lies in N to which, thirdly, a Weierstrass section can be associated. Fourthly C = dim m-g, where g is the number of generators of the polynomial algebra I. Fifthly the Weierstrass section, is shown to imply that C an irreducible component of N, yet C is only sometimes an orbital variety closure. The resulting Component Map T C C is shown to be injective. Evidence for its surjectivity is given.
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