Factorial Schur Functions and the Yang-Baxter Equation
نویسندگان
چکیده
Factorial Schur functions are generalizations of Schur functions that have, in addition to the usual variables, a second family of “shift” parameters. We show that a factorial Schur function times a deformation of the Weyl denominator may be expressed as the partition function of a particular statistical-mechanical system (six-vertex model). The proof is based on the Yang-Baxter equation. There is a deformation parameter t which may be specialized in different ways. If t = −1, then we recover the expression of the factorial Schur function as a ratio of alternating polynomials. If t = 0, we recover the description as a sum over tableaux. If t = ∞ we recover a description of Lascoux that was previously considered by the second author. We also are able to prove using the Yang-Baxter equation the asymptotic symmetry of the factorial Schur functions in the shift parameters. Finally, we give a proof using our methods of the dual Cauchy identity for factorial Schur functions. Thus using our methods we are able to give thematic proofs of many of the properties of factorial Schur functions. Dedicated to Professor Fumihiro Sato
منابع مشابه
Generating Functions for the Coefficients of the Cremmer-gervais R-matrices
The coefficients of certain operators on V ⊗V can be constructed using generating functions. Necessary and sufficient conditions are given for some such operators to satisfy the Yang-Baxter equation. As a corollary we obtain a simple, direct proof that the Cremmer-Gervais R-matrices satisfy the Yang-Baxter equation. This approach also clarifies Cremmer and Gervais’s original proof via the dynam...
متن کاملProducts of Schur and Factorial Schur Functions
The product of any finite number of Schur and factorial Schur functions can be expanded as a Z[y]-linear combination of Schur functions. We give a rule for computing the coefficients in such an expansion which generalizes the classical Littlewood-Richardson rule.
متن کاملUniversal exponential solution of the Yang - Baxter equation
Exponential solutions of the Yang-Baxter equation give rise to generalized Schubert polynomials and corresponding symmetric functions. We provide several descriptions of the local stationary algebra defined by this equation. This allows to construct various exponential solutions of the YBE. The Bn and G2 cases are also treated.
متن کاملA Littlewood-Richardson Rule for factorial Schur functions
We give a combinatorial rule for calculating the coe cients in the expansion of a product of two factorial Schur functions. It is a special case of a more general rule which also gives the coe cients in the expansion of a skew factorial Schur function. Applications to Capelli operators and quantum immanants are also given.
متن کاملTwisted affine Lie superalgebra of type Q and quantization of its enveloping superalgebra
We introduce a new quantum group which is a quantization of the enveloping superalgebra of a twisted affine Lie superalgebra of type Q. We study generators and relations for superalgebras in the finite and twisted affine cases, and also universal central extensions. Afterwards, we apply the FRT formalism to a certain solution of the quantum Yang-Baxter equation to define that new quantum group ...
متن کامل