Parallel spin wave for the Villain model

Abstract

In this paper, we study the Villain model in Zd in dimension d≥ 3. It is conjectured, that the parallel correlation function in the infinite volume Gibbs state, i.e., the map x θ(0) θ(x) μVil, β -( θ(0) μVil, β )2, decays like |x|-2(d-2) as |x| ∞ at low temperature. The results of Bricmont, Fontaine, Lebowitz, Lieb, and Spencer (1981) show that for the related XY model, this correlation decays at least as fast as |x|2-d. We prove the optimal upper and lower bounds for the Villain model in d=3, up to a logarithmic correction, and also improve the upper bound in general dimensions. Our proof builds upon the approach developed in our previous article, which in turn is inspired by a key observation of Fr\"ohlich and Spencer (1982): in the low temperature regime, a combination of duality transformation and renormalisation allows certain properties of the Villain model to be analysed in terms of a (vector-valued) ∇ interface model. This latter model can be investigated using the Helffer-Sj\"ostrand representation formula combined with tools of elliptic and parabolic regularity.