Exponential integrability for log-concave measures

Abstract

Talagrand observed that finiteness of E\, e12|∇ f(X)|2 implies finiteness of E\, e\, f(X) where X is the standard Gaussian vector in Rn and f is a smooth function with zero average. However, in this paper we show that finiteness of E\, e12|∇ f|2 (1+|∇ f|)-1 implies finiteness of E\, e\, f(X), and we also obtain quantitative bounds align* \, E\, e\, f ≤ 10\, E\, e12|∇ f|2 (1+|∇ f|)-1. align* Moreover, the extra factor (1+|∇ f|)-1 is the best possible in the sense that there is smooth f with E\, e\,f =∞ but E\, e12|∇ f|2 (1+|∇ f|)-c<∞ for all c>1. As an application we show corresponding dual inequalities for the discrete time dyadic martingales and its quadratic variations.