Asymptotics of the maximal radius of an Lr-optimal sequence of quantizers

Abstract

Let P be a probability distribution on Rd (equipped with an Euclidean norm |·|). Let r> 0 and let (αn)n ≥1 be an (asymptotically) Lr(P)-optimal sequence of n-quantizers. We investigate the asymptotic behavior of the maximal radius sequence induced by the sequence (αn)n ≥1 defined for every n ≥1 by (αn) = |a|, a ∈αn. When ((P)) is infinite, the maximal radius sequence goes to |x|, x ∈supp(P) as n goes to infinity. We then give the exact rate of convergence for two classes of distributions with unbounded support: distributions with hyper-exponential tails and distributions with polynomial tails. In the one-dimensional setting, a sharp rate and constant are provided for distributions with hyper-exponential tails.