Threshold for the expected measure of random polytopes

Abstract

Let μ be a log-concave probability measure on Rn and for any N>n consider the random polytope KN= conv\X1,… ,XN\, where X1,X2,… are independent random points in Rn distributed according to μ . We study the question if there exists a threshold for the expected measure of KN. Our approach is based on the Cramer transform μ of μ . We examine the existence of moments of all orders for μ and establish, under some conditions, a sharp threshold for the expectation EμN[μ (KN)] of the measure of KN: it is close to 0 if N Eμ (μ ) and close to 1 if N Eμ (μ ). The main condition is that the parameter β(μ)= Varμ (μ )/( Eμ (μ ))2 should be small.