François Viard
Published 2014-07-23, updated 2016-03-10Version 2
We introduce the notion of "type" of a tableau, that allows us to define new families of tableaux including both balanced and standard Young tableaux. We use these new objects to describe the set of reduced decompositions of any permutation. We then generalize the work of Fomin \emph{et al.} by giving, among other things, a new proof of the fact that balanced and standard tableaux are equinumerous, and by exhibiting many new families of tableaux having similar combinatorial properties to those of balanced tableaux.
Comments: This new version cointains several major changes in order to take new results into account
Permutations all of whose patterns of a given length are distinct
The Location of the First Ascent in a 123-Avoiding Permutation
Expansion of permutations as products of transpositions
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