Add to ORKGWe elaborate on the results in ``Splitting the square of a Schur function into its symmetric and antisymmetric parts '' [Carre Leclerc, J. algebr. combinat. 4, 1995]. We give bijective proof of a number of identities that were established there, in particular between the Yamanouchi domino tableaux, and the ordinary Littlewood-Richardson fillings that correspond to the same tensor product decomposition
We define an action of the symmetric group S[n/2] on the set of domino tableaux, and prove that the ...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
We elaborate on the results in ``Splitting the square of a Schur function into its symmetric and ant...
The connection between the generating functions of various sets of tableaux and the appropriate fami...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
Cette thèse se situe au carrefour de la combinatoire énumérative, algébrique et bijective. Elle se c...
Cette thèse se situe au carrefour de la combinatoire énumérative, algébrique et bijective. Elle se c...
AbstractThe Robinson-Schensted correspondence, a bijection between nonnegative matrices and pair of ...
AbstractWe study some properties of domino insertion, focusing on aspects related to Fomin's growth ...
Robinson–Schensted–Knuth (RSK) correspondence is a bijective correspondence between two-rowed arrays...
We present a new family of symmetric functions, denoted by HI(q), defined in terms of domino tableau...
We define an action of the symmetric group S[n/2] on the set of domino tableaux, and prove that the ...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
We elaborate on the results in ``Splitting the square of a Schur function into its symmetric and ant...
The connection between the generating functions of various sets of tableaux and the appropriate fami...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
This thesis is at the crossroads of enumerative, algebraic and bijective combinatorics. It studies s...
Cette thèse se situe au carrefour de la combinatoire énumérative, algébrique et bijective. Elle se c...
Cette thèse se situe au carrefour de la combinatoire énumérative, algébrique et bijective. Elle se c...
AbstractThe Robinson-Schensted correspondence, a bijection between nonnegative matrices and pair of ...
AbstractWe study some properties of domino insertion, focusing on aspects related to Fomin's growth ...
Robinson–Schensted–Knuth (RSK) correspondence is a bijective correspondence between two-rowed arrays...
We present a new family of symmetric functions, denoted by HI(q), defined in terms of domino tableau...
We define an action of the symmetric group S[n/2] on the set of domino tableaux, and prove that the ...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
International audienceThe Cauchy identity is a fundamental formula in algebraic combinatorics that c...
