Royen's proof of the Gaussian correlation inequality as a supersymmetric dimensional reduction

Abstract

We revisit Royen's proof of the Gaussian correlation inequality from a supersymmetric point of view. Many key elements in Royen's proof of this inequality have natural geometric interpretations in terms of supersymmetric dimensional reduction from R3|2 to R1|0. In particular, the auxiliary multivariate Gamma distributions appearing in Royen's Laplace-transform argument arise naturally as the body of a supersymmetric radial variable on R3|2. The generalization to the half-integer multivariate Gamma case also follows naturally as a dimensional reduction from Rk+2|2 to Rk|0. This provides an example in which the supersymmetric localization method is applied to prove correlation inequalities with continuous parameters.