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arxiv: 1902.06234 · v1 · pith:RWPNGEB6 · submitted 2019-02-17 · math.CO

Enumerative combinatorics on determinants and signed bigrassmannian polynomials

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classification math.CO
keywords bigrassmanniandeterminantpolynomialssignedcombinatoricsenumerativestatisticafterward
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As an application of linear algebra for enumerative combinatorics, we introduce two new ideas, signed bigrassmannian polynomials and bigrassmannian determinant. First, a signed bigrassmannian polynomial is a variant of the statistic given by the number of bigrassmannian permutations below a permutation in Bruhat order as Reading suggested (2002) and afterward the author developed (2011). Second, bigrassmannian determinant is a $q$-analog of the determinant with respect to our statistic. It plays a key role for a determinantal expression of those polynomials. We further show that bigrassmannian determinant satisfies weighted condensation as a generalization of Dodgson, Jacobi-Desnanot and Robbins-Rumsey (1986).

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