Jeu de taquin

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In the mathematical field of combinatorics, jeu de taquin is a construction due to Schützenberger^[1] which defines an equivalence relation on the set of skew standard Young tableaux. A jeu de taquin slide is a transformation where the numbers in a tableau are moved around in a way similar to how the pieces in the fifteen puzzle move.^[2] Two tableaux are jeu de taquin equivalent if one can be transformed into the other via a sequence of such slides.

1 Definition of a jeu de taquin slide
2 Applications
3 Notes
4 References

[edit] Definition of a jeu de taquin slide

A diagram is needed in this article

Given a skew standard Young tableau T of skew shape $\lambda\setminus\mu$ , pick an adjacent empty cell c that can be added to $\lambda\setminus\mu$ ; what this means is that c must share at least one edge with some cell in T, and $\{c\} \cup \lambda\setminus\mu$ must also be a skew shape. There are two kinds of slide, depending on whether c lies to the upper left of T or to the lower right. Suppose to begin with that c lies to the upper left. Slide the number from its neighbouring cell into c; if c has neighbours both to its right and below, then pick the smallest of these two numbers. (This rule is designed so that the tableau property of having increasing rows and columns will be preserved.) If the cell that just has been emptied has no neighbour to its right or below, then the slide is completed. Otherwise, slide a number into that cell according to the same rule as before, and continue in this way until the slide is completed. After this transformation, the resulting tableau is still a skew (or possibly straight) standard Young tableux.

The other kind of slide, when c lies to the lower right of T, just goes in the opposite direction. In this case, one slides numbers into an empty cell from the neighbour to its left or above, picking the larger number whenever there is a choice. The two types of slides are mutual inverses – a slide of one kind can be undone using a slide of the other kind.

[edit] Applications

Jeu de taquin is closely connected to such topics as the Robinson–Shensted–Knuth correspondence, the Littlewood–Richardson rule, and Knuth equivalence.

[edit] Notes

^ Schützenberger 1977
^ "Jeu de taquin" (literally "teasing game") is in fact just the French name for the fifteen puzzle.

[edit] References

Schützenberger, Marcel-Paul (1977), “La correspondance de Robinson”, in Foata, Dominique, Combinatoire et représentation du groupe symétrique (Actes Table Ronde CNRS, Univ. Louis-Pasteur Strasbourg, Strasbourg, 1976), Lecture Notes in Math. 579, Berlin: Springer, pp. 59–113

Stanley, Richard P. (1999), Enumerative Combinatorics, vol. 2, Cambridge Studies in Advanced Mathematics 62, Cambridge University Press, ISBN 0-521-56069-1, <http://www-math.mit.edu/~rstan/ec/>

Sagan, Bruce E. (2001), The Symmetric Group: Representations, Combinatorial Algorithms, and Symmetric Functions (2nd ed.), Graduate Texts in Mathematics 203, New York: Springer, ISBN 0-387-95067-2