Non-Gaussian effects and multifractality in the Bragg glass

Abstract

We study, beyond the Gaussian approximation, the decay of the translational order correlation function for a d-dimensional scalar periodic elastic system in a disordered environment. We develop a method based on functional determinants, equivalent to summing an infinite set of diagrams. We obtain, in dimension d=4-epsilon, the even n-th cumulant of relative displacements as <[u(r)-u(0)]n>c = An ln r, with An = -(ε/3)n (n-1/2) ζ(2n-3)/π(1/2), as well as the multifractal dimension xq of the exponential field eq u(r). As a corollary, we obtain an analytic expression for a class of n-loop integrals in d=4, which appear in the perturbative determination of Konishi amplitudes, also accessible via AdS/CFT using integrability.