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A q-weighted version of the Robinson-Schensted algorithm

Research output: Contribution to journalArticle

  • Neil O'Connell
  • Yuchen Pei
Original languageEnglish
Article number95
JournalElectronic Journal of Probability
Volume18
DOIs
DatePublished - 29 Oct 2013

Abstract

We introduce a q-weighted version of the Robinson-Schensted (column insertion) algorithm which is closely connected to q-Whittaker functions (or Macdonald polynomials with t = 0) and reduces to the usual Robinson-Schensted algorithm when q = 0. The q-insertion algorithm is 'randomised', or 'quantum', in the sense that when inserting a positive integer into a tableau, the output is a distribution of weights on a particular set of tableaux which includes the output which would have been obtained via the usual column insertion algorithm. There is also a notion of recording tableau in this setting. We show that the distribution of weights of the pair of tableaux obtained when one applies the q-insertion algorithm to a random word or permutation takes a particularly simple form and is closely related to q-Whittaker functions. In the case 0 ≤ q <1, the q-insertion algorithm applied to a random word also provides a new framework for solving the q-TASEP interacting particle system introduced (in the language of q-bosons) by Sasamoto and Wadati [41] and yields formulas which are equivalent to some of those recently obtained by Borodin and Corwin [7] via a stochastic evolution on discrete Gelfand-Tsetlin patterns (or semistandard tableaux) which is coupled to the q-TASEP. We show that the sequence of P-tableaux obtained when one applies the q-insertion algorithm to a random word defines another, quite different, evolution on semistandard tableaux which is also coupled to the q-TASEP.

    Research areas

  • Macdonald polynomials, Q-whittaker functions

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