Calculation of the constant factor in the six-vertex model

Abstract

In the present paper we calculate explicitly the constant factor C in the large N asymptotics of the partition function ZN of the six-vertex model with domain wall boundary conditions on the critical line between the disordered and ferroelectric phases. On the critical line the weights a,b,c of the model are parameterized by a parameter >1, as a=-12, b=+12, c=1. The asymptotics of ZN on the critical line was obtained earlier in the paper BL2 of Bleher and Liechty: ZN=CFN2GNN1/4(1+O(N-1/2)), where F and G are given by explicit expressions, but the constant factor C>0 was not known. To calculate the constant C, we find, by using the Riemann-Hilbert approach, an asymptotic behavior of ZN in the double scaling limit, as N and tend simultaneously to ∞ in such a way that N t 0. Then we apply the Toda equation for the tau-function to find a structural form for C, as a function of , and we combine the structural form of C and the double scaling asymptotic behavior of ZN to calculate C.