Minimal Nilpotent Orbits and Toric Varieties
Abstract
Let Omin ( n+ n-) be the collection of elements of sln+1( C) with rank less than or equal to 1 and with all diagonal entries equal to zero. We show that the coordinate ring C[Omin ( n+ n-)] of the scheme-theoretic intersection Omin ( n+ n-) has a flat degeneration to the ring of ( C×)n-equivariant cohomology of the projective toric variety associated with the fan of compatible subsets of almost positive roots of type Cn. Then we compute the Hilbert series of C[Omin ( n+ n-)] and prove that Omin ( n+ n-) is reduced and Gorenstein. Moreover, our proof method allows us to prove that the scheme-theoretic intersection Omin n+, of which the irreducible components are known as the ``orbital varieties'', is reduced and Cohen-Macaulay.
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