Random section and random simplex inequality

Abstract

Consider some convex body K⊂ Rd. Let X1,…, Xk, where k≤ d, be random points independently and uniformly chosen in K, and let k be a uniformly distributed random linear k-plane. We show that for p≥-d+k+1, \[ E\,|Kk|d+p≤ cd,k,p ·|K|k\, \, E\,|conv(0,X1, …,Xk)|p, \] where |·| and conv denote the volume of correspondent dimension and the convex hull. The constant cd,k,p is such that for k>1 the equality holds if and only if K is an ellipsoid centered at the origin, and for k=1 the inequality turns to equality. If p=0, then the inequality reduces to the Busemann intersection inequality, and if k=d -- to the Busemann random simplex inequality. We also present an affine version of this inequality which similarly generalizes the Schneider inequality and the Blaschke-Gr\"omer inequality.