# The Unconditional Case of the S-Inequality for Exponential Measure

Tuesday, September 23, 2014 - 2:00pm - 3:00pm

Lind 305

Piotr Nayar (University of Minnesota, Twin Cities)

Let m be the exponential distribution, i.e., the density of m is equal to 1/2^n exp(-(x_1+...+x_n)). Let K be an unconditional convex set and let P be a strip of the form [-p,p] times R^{n-1} with m(K)=m(P). We prove that m(tK) geq m(tP) for t>1.

This is a joint work with Tomasz Tkocz (University of Warwick).

This is a joint work with Tomasz Tkocz (University of Warwick).