Sharp Asymptotics for q-Norms of Random Vectors in High-Dimensional pn-Balls

Abstract

Sharp large deviation results of Bahadur-Ranga Rao type are provided for the q-norm of random vectors distributed on the pn-ball Bnp according to the cone probability measure or the uniform distribution for 1 q<p < ∞ , thereby furthering previous large deviation results by Kabluchko, Prochno and Th\"ale in the same setting. These results are then applied to deduce sharp asymptotics for intersection volumes of different pn-balls in the spirit of Schechtman and Schmuckenschl\"ager, and for the length of the projection of an pn-ball onto a line with uniform random direction. The sharp large deviation results are proven by providing convenient probabilistic representations of the q-norms, employing local limit theorems to approximate their densities, and then using geometric results for asymptotic expansions of Laplace integrals to integrate these densities and derive concrete probability estimates.