Intrinsic volumes of p-balls and a continuum of Maxwell--Poincar\'e--Borel laws for their curvature measures

Abstract

For p>1, we derive explicit formulas for the intrinsic volumes V0( Bpn),…,Vn-1( Bpn) of the n-dimensional p-balls Bpn = \x∈ Rn:\ |x1|p+…+|xn|p 1\ and, more generally, of their coordinate-weighted analogues. The formula is given in terms of a one-dimensional integral involving the special function Fp(t;) = ∫ R|u| e-|u|p-t|u|2p-2\,du. Previously known formulas for the intrinsic volumes of ellipsoids, weighted crosspolytopes, and rectangular boxes arise as special or limiting cases. We also obtain asymptotic formulas for Vj(n)( Bpn) in the high-dimensional regime n∞, where the index j(n) is allowed to depend on n. We further investigate the curvature measures of Bpn. These are finite measures 0( Bpn,·),…,n-1( Bpn,·) on ∂ Bpn that localize the intrinsic volumes. We prove a Maxwell--Poincar\'e--Borel type limit theorem: if Xn is a random boundary point of Bpn distributed according to the normalized curvature measure j(n)( Bpn,·)/Vj(n)( Bpn), where j(n)/nα∈[0,1] as n∞, then for every fixed r∈ N, the joint distribution of the first r coordinates of n1/pXn converges weakly to the product measure p,α r. Here p,α is an explicit probability measure on R depending on p>1 and α∈[0,1]. The main tool underlying these results is an explicit characterization of the curvature measures of coordinate-weighted p-balls, and in particular an explicit formula for their mixed moments.