Determinant formula for the partition function of the six-vertex model with a non-diagonal reflecting end

Abstract We construct an integrable colored six-vertex model whose partition function is a double Grothendieck polynomial. This gives an integrable systems interpretation of bumpless pipe dreams and recent results of Weigandt relating double Grothendieck polynomias with bumpless pipe dreams. For vexillary permutations, we then construct a new model that we call the semidual version model. We use our semidual model and the five-vertex model of Motegi and Sakai to give a new proof that double Grothendieck polynomials for vexillary permutations are equal to flagged factorial Grothendieck polynomials. Taking the stable limit of double Grothendieck polynomials, we obtain a new proof that the stable limit is a factorial Grothendieck polynomial as defined by McNamara. The states of our semidual model naturally correspond to families of nonintersecting lattice paths, where we can then use the Lindström–Gessel–Viennot lemma to give a determinant formula for double Schubert polynomials corresponding to vexillary permutations.

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Tokuyama's Identity for Factorial Schur $P$ and $Q$ Functions

The Electronic Journal of Combinatorics ◽

10.37236/4971 ◽

2015 ◽

Vol 22 (2) ◽

Cited By ~ 6

Author(s):

Angèle M. Hamel ◽

Ronald C. King

Keyword(s):

Partition Function ◽

Lattice Paths ◽

Schur Function ◽

Vertex Model ◽

Shifted Tableaux

A recent paper of Bump, McNamara and Nakasuji introduced a factorial version of Tokuyama's identity, expressing the partition function of six vertex model as the product of a $t$-deformed Vandermonde and a Schur function. Here we provide an extension of their result by exploiting the language of primed shifted tableaux, with its proof based on the use of non-interesecting lattice paths.

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Partition function of the eight-vertex model with domain wall boundary condition

Journal of Mathematical Physics ◽

10.1063/1.3205448 ◽

2009 ◽

Vol 50 (8) ◽

pp. 083518 ◽

Cited By ~ 12

Author(s):

Wen-Li Yang ◽

Yao-Zhong Zhang

Keyword(s):

Boundary Condition ◽

Partition Function ◽

Domain Wall ◽

Vertex Model ◽

Wall Boundary Condition ◽

Wall Boundary

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On some representations of the six vertex model partition function

Physics Letters A ◽

10.1016/s0375-9601(03)01043-0 ◽

2003 ◽

Vol 315 (3-4) ◽

pp. 231-236 ◽

Cited By ~ 6

Author(s):

F. Colomo ◽

A.G. Pronko

Keyword(s):

Partition Function ◽

Vertex Model

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Integrable equations for the partition function of the six-vertex model

Journal of Mathematical Sciences ◽

10.1007/bf02675734 ◽

2000 ◽

Vol 100 (2) ◽

pp. 2141-2146 ◽

Cited By ~ 4

Author(s):

A. G. Izergin ◽

E. Karjalainen ◽

N. A. Kitanin

Keyword(s):

Partition Function ◽

Vertex Model ◽

Integrable Equations

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Domain wall partition function of the eight-vertex model with a non-diagonal reflecting end

Nuclear Physics B ◽

10.1016/j.nuclphysb.2011.01.029 ◽

2011 ◽

Vol 847 (2) ◽

pp. 367-386 ◽

Cited By ~ 12

Author(s):

Wen-Li Yang ◽

Xi Chen ◽

Jun Feng ◽

Kun Hao ◽

Kang-Jie Shi ◽

...

Keyword(s):

Partition Function ◽

Domain Wall ◽

Vertex Model

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GAUGE TRANSFORMATION AND VERTEX MODELS: A POLYNOMIAL FORMULATION

International Journal of Modern Physics B ◽

10.1142/s0217979295001233 ◽

1995 ◽

Vol 09 (24) ◽

pp. 3209-3217 ◽

Cited By ~ 1

Author(s):

G. ROLLET ◽

F. Y. WU

Keyword(s):

Ising Model ◽

Partition Function ◽

Gauge Transformation ◽

Vertex Model ◽

Arbitrary Graph ◽

Vertex Models ◽

Polynomial Formulation

We consider vertex models on an arbitrary graph and propose a new polynomial formulation for its gauge transformation under which the partition function is invariant. Our formulation recovers in a simple way various, previously obtained results including the condition under which the vertex model is equivalent to an Ising model.

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Some exact results for the Ashkin-Teller model

Proceedings of the Royal Society of London Series A - Mathematical and Physical Sciences ◽

10.1098/rspa.1979.0023 ◽

1979 ◽

Vol 365 (1722) ◽

pp. 371-380 ◽

Cited By ~ 9

Keyword(s):

Renormalization Group ◽

Partition Function ◽

Potts Model ◽

Critical Line ◽

Square Lattice ◽

Direct Connection ◽

Exact Results ◽

Renormalization Group Theory ◽

Vertex Model ◽

Special Cases

It is shown that various cases of the Ashkin-Teller model on the square, triangular and hexagonal lattices can be transformed by the dual and star-triangle transformations and, further, that these problems can be reduced to special cases of the eight vertex model on the Kagomé lattice. In general, we can only obtain the partition function of the Ashkin-Teller model if we are on its line of fixed points, and it then turns out that it is reducible to the six vertex model. Since the partition function of the q -state Potts model at its critical point can also be related to the six vertex model, a direct connection between the Ashkin-Teller model and the Potts model can be made. It turns out that moving along the critical line of the Ashkin-Teller model corresponds to varying q for the Potts model. For the square lattice comparison is made with renormalization group calculations, and the agreement found is a satisfactory check of renormalization group theory.

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Cylinder partition function of the 6-vertex model from algebraic geometry

Journal of High Energy Physics ◽

10.1007/jhep06(2020)169 ◽

2020 ◽

Vol 2020 (6) ◽

Cited By ~ 2

Author(s):

Zoltan Bajnok ◽

Jesper Lykke Jacobsen ◽

Yunfeng Jiang ◽

Rafael I. Nepomechie ◽

Yang Zhang

Keyword(s):

Algebraic Geometry ◽

Partition Function ◽

Vertex Model

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Diagonally and antidiagonally symmetric alternating sign matrices of odd order

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.6346 ◽

2020 ◽

Vol DMTCS Proceedings, 28th... ◽

Author(s):

Roger Behrend ◽

Ilse Fischer ◽

Matjaz Konvalinka

Keyword(s):

Partition Function ◽

General Expression ◽

Schur Function ◽

Vertex Model ◽

Grid Graph ◽

Alternating Sign Matrices ◽

Odd Order ◽

International Audience ◽

Reflection Equations

International audience We study the enumeration of diagonally and antidiagonally symmetric alternating sign matrices (DAS- ASMs) of fixed odd order by introducing a case of the six-vertex model whose configurations are in bijection with such matrices. The model involves a grid graph on a triangle, with bulk and boundary weights which satisfy the Yang– Baxter and reflection equations. We obtain a general expression for the partition function of this model as a sum of two determinantal terms, and show that at a certain point each of these terms reduces to a Schur function. We are then able to prove a conjecture of Robbins from the mid 1980's that the total number of (2n + 1) × (2n + 1) DASASMs is∏n (3i)! ,andaconjectureofStroganovfrom2008thattheratiobetweenthenumbersof(2n+1)×(2n+1) i=0 (n+i)! DASASMs with central entry −1 and 1 is n/(n + 1). Among the several product formulae for the enumeration of symmetric alternating sign matrices which were conjectured in the 1980's, that for odd-order DASASMs is the last to have been proved.

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