On a reverse form of the Brascamp-Lieb inequality

As it appears in recent articles by Helffer or Sjo strand and Naddaf Spencer, the analysis, in the context of the statistical mechanics, of measures of the type exp &8(x) dx is connected with the analysis of suitable Witten Laplacians on 1-forms. For illustrating this point of view, we present here

## This paper deals with questions concerning a transformation-based form of the Cauchy-Schwarz inequality (f f) (g, g) > ( A g) (g, f ) where f and g are complex vectors. In the case ofa linear transformation restricted to be real a rejinement ofthe inequality can be given. The classes of tr

Let (Σ , g) be a compact Riemannian surface without boundary. In this paper we shall use blowing up analysis to prove that sup Furthermore we show that there exists an extremal function for the above inequality. In other words, we show that sup Σ |∇u| 2 f dV g =1, Σ udV g =0 Σ e 4π f u 2 dV g is at