Rectangular Young tableaux with local decreases and the density method for uniform random generation

In this article, we consider a generalization of Young tableaux in which we allow some consecutive pairs of cells with decreasing labels. We show that this leads to a rich variety of combinatorial formulas, which suggest that these new objects could be related to deeper structures, similarly to the ubiquitous Young tableaux. Our methods rely on variants of hook-length type formulas, and also on a new efficient generic method (which we call the density method) which allows not only to generate constrained combinatorial objects, but also to enumerate them. We also investigate some repercussions of this method on the D-finiteness of the generating functions of combinatorial objects encoded by linear extension diagrams, and give a limit law result for the average number of local decreases.

[1]  R. Stanley Enumerative Combinatorics: Volume 1 , 2011 .

[2]  B. Salvy,et al.  Algorithmes Efficaces en Calcul Formel , 2017 .

[3]  Jean-Raymond Abrial,et al.  On B , 1998, B.

[4]  Curtis Greene,et al.  Another Probabilistic Method in the Theory of Young Tableaux , 1984, J. Comb. Theory, Ser. A.

[5]  Philippe Flajolet,et al.  Analytic Combinatorics , 2009 .

[6]  Philippe Marchal,et al.  Periodic Pólya Urns and an Application to Young Tableaux , 2018, AofA.

[7]  Young-Ming Chen The Chung-Feller theorem revisited , 2008, Discret. Math..

[8]  K. Chung,et al.  On fluctuations in coin tossing. , 1949, Proceedings of the National Academy of Sciences of the United States of America.

[10]  A. Vershik Randomization of Algebra and Algebraization of Probability , 2001 .

[11]  P. Marchal Rectangular Young tableaux and the Jacobi ensemble , 2015, Discrete Mathematics & Theoretical Computer Science.

[12]  I. G. MacDonald,et al.  Symmetric functions and Hall polynomials , 1979 .

[13]  Charalambos A. Charalambides,et al.  Enumerative combinatorics , 2018, SIGA.