Explicit correlation functions for the six-vertex model in the free-fermion regime

Abstract

In this article, we show that, in the free-fermion regime of the six-vertex model, all k-point correlation functions of vertex types admit a determinantal representation: align* P( p=1k \ vertex at vp has type tp \ ) = ( Πp=1k atp ) [ L(xi,yj) ]i,j=12k, align* where t1,…,tk ∈ \1,…,6\ label the six possible vertex types, and \at : 1 ≤ t ≤ 6\ are the corresponding six-vertex weights. For each 1 ≤ p ≤ k, the four points x2p-1, x2p, y2p-1, y2p ∈ (Z/2)2 are tp-dependent choices among the midpoints of the edges incident to vp. The correlation kernel L has the contour integral representation align* L(x,y) = |w1|=1 |w2|=1 dw12π i\, w1\, dw22π i\, w2\, w1\,y1 - x1\, w2\,y2 - x2\, h(c(x),c(y);w1,w2), align* where h(c(x),c(y);w1,w2) is a simple rational function of (w1,w2) that depends on x and y only through their orientations c(x) and c(y). Our proof is fully self-contained: we construct a determinantal point process on Z2 and identify the six-vertex model as its pushforward under an explicit mapping.

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