Uniqueness of unbounded component for level sets of smooth Gaussian fields

Abstract

For a large family of stationary continuous Gaussian fields f on Rd, including the Bargmann-Fock and Cauchy fields, we prove that there exists at most one unbounded connected component in the level set \f=\ (as well as in the excursion set \f≥\) almost surely for every level ∈ R, thus proving a conjecture proposed by Duminil-Copin, Rivera, Rodriguez & Vanneuville. As the fields considered are typically very rigid (e.g.~analytic almost surely), there is no sort of finite energy property available and the classical approaches to prove uniqueness become difficult to implement. We bypass this difficulty using a soft shift argument based on the Cameron-Martin theorem.