Some Combinatorial Properties of Schubert Polynomials |
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| Authors: | Sara C. Billey William Jockusch Richard P. Stanley |
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| Affiliation: | (1) Department of Mathematics, Massachusetts Institute of Technology, Cambridge, MA, 02139;(2) Present address: Department of Mathematics, UCSD, La Jolla, CA, 92093;(3) Present address: Department of Mathematics, University of Michigan, Ann Arbor, MI, 48109 |
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| Abstract: | ![]()
Schubert polynomials were introduced by Bernstein et al. and Demazure, and were extensively developed by Lascoux, Schützenberger, Macdonald, and others. We give an explicit combinatorial interpretation of the Schubert polynomial  in terms of the reduced decompositions of the permutation w. Using this result, a variation of Schensted's correspondence due to Edelman and Greene allows one to associate in a natural way a certain set  of tableaux with w, each tableau contributing a single term to  . This correspondence leads to many problems and conjectures, whose interrelation is investigated. In Section 2 we consider permutations with no decreasing subsequence of length three (or 321-avoiding permutations). We show for such permutations that  is a flag skew Schur function. In Section 3 we use this result to obtain some interesting properties of the rational function  , where  denotes a skew Schur function.Sara C. Billey: Supported by the National Physical Science Consortium. William Jockusch: Supported by an NSF Graduate Fellowship. Richard P. Stanley: Partially supported by NSF grants DMS-8901834 and DMS-9206374 |
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| Keywords: | divided difference operator Schubert polynomial reduced decomposition Edelman-Greene correspondence 321-avoiding permutation flag skew Schur function principal specialization |
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