论文信息 - Horn inequalities and quivers

Horn inequalities and quivers

Let G be a complex reductive group acting on a finite-dimensional complex vector space H. Let B be a Borel subgroup of G and let T be the associated torus. The Mumford cone is the polyhedral cone generated by the T-weights of the polynomial functions on H which are semi-invariant under the Borel subgroup. In this article, we determine the inequalities of the Mumford cone in the case of the linear representation associated to a quiver and a dimension vector n=(n_x). We give these inequalities in terms of filtered dimension vectors, and we directly adapt Schofield's argument to inductively determine the dimension vectors of general subrepresentations in the filtered context. In particular, this gives one further proof of the Horn inequalities for tensor products.

[1] Terence Tao,et al. The honeycomb model of GL(n) tensor products I: proof of the saturation conjecture , 1998, math/9807160.

[2] Michael Walter,et al. Inequalities for Moment Cones of Finite-Dimensional Representations , 2014, 1410.8144.

[3] A. Schofield. General Representations of Quivers , 1992 .

[4] Nicolas Ressayre,et al. GIT-cones and quivers , 2009, 0903.1202.

[5] T. Tao,et al. The honeycomb model of _{}(ℂ) tensor products I: Proof of the saturation conjecture , 1999 .

[6] Harm Derksen,et al. Semi-invariants of quivers and saturation for Littlewood-Richardson coefficients , 2000 .

[7] A. King. MODULI OF REPRESENTATIONS OF FINITE DIMENSIONAL ALGEBRAS , 1994 .

[8] Prakash Belkale. Geometric proofs of horn and saturation conjectures , 2002 .

[9] Nicolas Ressayre,et al. Geometric invariant theory and the generalized eigenvalue problem , 2007, 0704.2127.

[10] C. Sherman. Quiver Generalization of a Conjecture of King, Tollu, and Toumazet , 2016, 1603.05626.

[11] Linda Ness,et al. A Stratification of the Null Cone Via the Moment Map , 1984 .

[12] A. Horn. Eigenvalues of sums of Hermitian matrices , 1962 .

[13] Michael Walter,et al. The Horn inequalities from a geometric point of view , 2016 .

[14] Michel Van den Bergh,et al. Semi-invariants of quivers for arbitrary dimension vectors , 1999 .