We apply a theorem of Gel'fand, Goresky, MacPherson, and Serganova about
matroid polytopes to study semistability of partial flags relative to a
T-linearized ample line bundle of a flag space F = SL(n)/P where T is a maximal
torus in SL(n) and P is a parabolic subgroup containing T. We find that the
semistable points are all detected by invariant sections of degree one
regardless of the line bundle or linearization thereof, provided there exists
at least one nonzero invariant section of degree one. In this case the degree
one sections are sufficient to give a well defined map from the G.I.T. quotient
F//T to projective space.
  Additionally, we show that the closure of any T-orbit in SL(n)/P is a
projectively normal toric variety for any projective embedding of SL(n)/P.Comment: 14 page

Benjamin Howard

Dissertation Professor

John Millson

English

arXiv

Let Î» and Âµ be weights of G = SL(n,C) such that Î» is dominant. Let VÎ» be the irreducible representation of G with highest weight Î», and let VÎ»[Âµ] denote the Âµ-th weight space within VÎ». That is, VÎ»[Âµ] is an isotypic component of the representation VÎ» pulled back to the maximal torus T â\u8a\u82 G of diagonal matrices. The vector space RÎ»,Âµ 

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Matroids and geometric invariant theory of torus actions on flag spaces

This thesis investigates the structure of the projective coordinate rings  of SL(n,C) weight varieties.  An SL(n,C) weight variety is a Geometric Invariant Theory quotient of the space of full flags by the maximal torus in SL(n,C).  Special cases include configurations of n-tuples of points in  projective space modulo automorphisms of projective space.    There are three main results.  The first is an explicit finite set of generators for the coordinate ring.  The second is that the lowest degree  elements of the coordinate ring provide a well-defined map from the weight variety to projective space.  The third theorem is an explicit presentation for the ring of projective invariants of n ordered points on the Riemann sphere, in the case that each point is weighted by an even integer.   The methods applied involve matroid theory and degenerations of the weight varieties to toric varieties attached to Gelfand Tsetlin polytopes

Howard, Benjamin James

Digital Repository at the University of Maryland

Matroids and Geometric Invariant Theory of torus actions on flag spaces

AbstractLet F//T be a Geometric Invariant Theory quotient of a partial flag variety F=SL(n,C)/P by the action t⋅gP=tgP of the maximal torus T in SL(n,C), where P is a parabolic subgroup containing T. The construction of F//T depends upon the choice of a T-linearized line bundle L of F. This note concerns the case L=Lλ is a very ample homogeneous line bundle determined by a dominant weight λ, meaning the associated character λ:T→C* extends to P and to no larger parabolic subgroup.If Vλ denotes the irreducible representation of SL(n,C) with highest weight λ, and Vλ[μ] is the isotypic component corresponding to a weight μ of the torus, then F//T is equal to Proj(⊕N=0∞VNλ[Nμ]). The weight μ is used to twist the canonical T-linearization of Lλ, where the canonical T-linearization of Lλ is obtained by restricting the unique SL(n,C)-linearization of Lλ to T.We apply a theorem of Gel'fand, Goresky, MacPherson, and Serganova concerning matroid polytopes to show that if Vλ[μ]≠0 then one gets a well-defined map F//T→CPdimVλ[μ]−1 by taking any basis of Vλ[μ]. Equivalently, all the semistable partial flags are detected by degree one T-invariants provided Vλ[μ] is nonzero.We also show that the closure of any T-orbit in F is projectively normal for the projective embedding ιλ:F→CPdimVλ−1

Matroids and Geometric Invariant Theory of torus actions on flag spaces

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