Unobstructed Stanley-Reisner Degenerations for Dual Quotient Bundles on G(2,n)
Abstract
Let Q* denote the dual of the quotient bundle on the Grassmannian G(2,n). We prove that the ideal of Q* in its natural embedding has initial ideal equal to the Stanley-Reisner ideal of a certain unobstructed simplicial complex. Furthermore, we show that the coordinate ring of Q* has no infinitesimal deformations for n>5.
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