Wick squares of the Gaussian Free Field and Riemannian rigidity

Abstract

In the present paper, we show that on a compact Riemannian manifold (M,g) of dimension d≤slant 4 whose metric has negative curvature, the renormalized partition function Zg(λ) of a massive Gaussian Free Field determines the length spectrum of (M,g) and imposes some strong geometric constraints on the Riemannian structure of (M,g). In any finite dimensional family of Riemannian metrics of negative sectional curvature bounded from below and above and whose isometry group is trivial, there is only a finite number of isometry classes of metrics with given partition function Zg(λ). When d<4, the same result holds true if the random variable ∫M:φ2:dv has given probability distribution and without the lower bound on the sectional curvatures.