Bruhat order Bruhat order is a partial order on the elements of a Coxeter group , that corresponds to the inclusion order on Schubert varieties .History The Bruhat order on the Schubert varieties of a flag manifold or a Grassmannian was first studied by, and the analogue for more general semisimple algebraic groups was studied by. started the combinatorial study of the Bruhat order on the Weyl group , and introduced the name "Bruhat order" because of the relation to the Bruhat decomposition introduced by François Bruhat .left and right weak Bruhat orderings were studied by.Definition If is a Coxeter system with generators S , then the Bruhat order is a partial order on the group W . Recall that a reduced word for an element w of W is a minimal length expression of w as a product of elements of S , and the length ℓ of w is the length of a reduced word .The Bruhat order is defined by u ≤ v if some substring of some reduced word for v is a reduced word for u . The weak left order is defined by u ≤L v if some final substring of some reduced word for v is a reduced word for u . The weak right order is defined by u ≤R v if some initial substring of some reduced word for v is a reduced word for u . see the article weak order of permutations .The Bruhat graph is a directed graph related to the Bruhat order. The vertex set is the set of elements of the Coxeter group and the edge set consists of directed edges whenever u = tv for some reflection t and ℓ < ℓ . One may view the graph as an edge-labeled directed graph with edge labels coming from the set of reflections . strong Bruhat order on the symmetric group has Möbius function given by,produced by the rank function on the poset.
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