Exact asymptotic volume and volume ratio of Schatten unit balls

Abstract

The unit ball Bpn(R) of the finite-dimensional Schatten trace class Spn consists of all real n× n matrices A whose singular values s1(A),…,sn(A) satisfy s1p(A)+…+snp(A)≤ 1, where p>0. Saint Raymond [Studia Math.\ 80, 63--75, 1984] showed that the limit n∞ n1/2 + 1/p (Vol\, Bpn(R))1/n2 exists in (0,∞) and provided both lower and upper bounds. In this paper we determine the precise limiting constant based on ideas from the theory of logarithmic potentials with external fields. A similar result is obtained for complex Schatten balls. As an application we compute the precise asymptotic volume ratio of the Schatten p-balls, as n∞, thereby extending Saint Raymond's estimate in the case of the nuclear norm (p=1) to the full regime 1≤ p ≤ ∞ with exact limiting behavior.