Description of B-orbit closures of order 2 in upper-triangular matrices
Abstract
Let nn(C) be the algebra of strictly upper-triangular n x n matrices over the field of complex numbers and X2 the subset of matrices of nilpotent order 2. Let Bn(C) be the group of invertible upper-triangular matrices acting on nn(C) by conjugation. Let B(u) be the orbit of u in X2 with respect to this action. Let Sn2 be the subset of involutions in the symmetric group Sn. We define a new partial order on Sn2 which gives the combinatorial description of the closure of B(u). We also construct an ideal I(B(u)) in symmetric algebra S(nn(C)* whose variety V(I(B(u))) equals the closure of B(u) (in Zariski topology). We apply these results to orbital varieties of nilpotent order 2 in sln(C) in order to give a complete combinatorial description of the closure of such an orbital variety in terms of Young tableaux. We also construct the ideal of definition of such an orbital variety up to taking the radical.
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