On the shape of bruhat intervals
Webweak Bruhat interval modules. We prove that this is a natural lift of the Mackey formula due to Bergeron and Li [3], which works for elements of the Grothendieck ring of 0-Hecke … WebWe begin by deriving an action of the -Hecke algebra on standard reverse composition tableaux and use it to discover -Hecke modules whose quasisymmetric characteristics are the natural refinements of Schur functions kn…
On the shape of bruhat intervals
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WebMotivated by the recent discovery of a simple quantization procedure for Schubert polynomials we study the expansion of Schur and Schubert polynomials into standard elementary monomials (SEM). The SEM expansion of Schur polynomials can be described algebraically by a simple variant of the Jacobi–Trudi formula and combinatorially by a … WebAbstract. In this paper, we prove that if the dual of a Bruhat interval in a Weyl group is a zircon, then that interval is rationally smooth. Investigating when the converse holds, and drawing inspiration from conjectures by Delanoy, leads us to pose two conjectures. If true, they imply that for Bruhat intervals in type A, duals of smooth ...
WebThe Bruhat order encodes algebraic and topological information of Schubert varieties in the flag manifold and possesses rich combinatorial properties. In this talk, we discuss three interrelated stories regarding the Bruhat order: self-dual Bruhat intervals, Billey-Postnikov decompositions, and automorphisms of the Bruhat graph. WebOn the shape of Bruhat intervals Item Preview remove-circle Share or Embed This Item. Share to Twitter. Share to Facebook. Share to Reddit. Share to Tumblr. Share to …
WebCORE is not-for-profit service delivered by the Open University and Jisc. WebA Bruhat interval polytope Qv,w is toric if and only if every subin-terval [x,y] of [v,w] is realized as a face of Qv,w. The above theorem implies that if Qv,w is toric, then its combinatorial type is determined by the poset structure of [v,w], and hence Qv,w and Qv−1,w−1 are combinatorially equivalent.
Webmaximal element. The main result of §3 is that every Bruhat interval [u, w] in W/V is lexicographically shellable (cf. Definition 3.1). From this combinatorial property we deduce that the simplicial complex of chains in a nonempty open Bruhat interval (u,w) of W/V triangulates a sphere or a ball, and is therefore
Web15 de jun. de 2024 · We prove that the grades of simple modules indexed by boolean permutations, over the incidence algebra of the symmetric group with respect to the Bruhat order, are given by Lusztig's a-function.... graph online functionWebThe Bruhat graph G W of (W;S) is the graph with vertex set W, and an edge between x;y2W if and only if tx= yfor some t2T. Because each edge xyis labelled by a unique re … chi slh the woodlands hospitalWeb31 de ago. de 2005 · One of the most celebrated combinatorial and algebraic problems is to study its Bruhat graph and its Bruhat intervals [a, b] = {z ∈ S n : a ≤ z ≤ b} for a, b ∈ S n … graph online vectorsWeb31 de jul. de 2005 · Furthermore, we express when an initial and final interval of the f's is symmetric around the middle in terms of Kazhdan-Lusztig polynomials. It is also shown that if W is finite then the sequence of f's cannot grow too rapidly. Som result mirroring our … graph online plottergraph online learningWeb6 de mar. de 2014 · We start with the observation that every indecomposable direct summand of these modules has a basis isomorphic to a left weak Bruhat interval of S n as posets when it is equipped with the... chislic basketWeb1 de abr. de 2024 · Classical conformal blocks via AdS/CFT correspondence. Article. Full-text available. Apr 2015. J HIGH ENERGY PHYS. Kostya Alkalaev. Vladimir Belavin. View. Show abstract. graph online plotten