Exact order of subsets of asymptotic bases

We study the asymptotics of subset counts for the uniformly random partition of the set [n]. It is known that typically most of the subsets of the random partition are of size r, with re r =n. Confirming a conjecture formulated by Arratia and Tavare , we prove that the counts of other subsets are cl

## Abstract Association analysis provides a powerful tool for complex disease gene mapping. However, in the presence of genetic heterogeneity, the power for association analysis can be low since only a fraction of the collected families may carry a specific disease susceptibility allele. Ordered‐su

If n # N then A(n) denotes the number of a # A with 1 a n. In this paper bases A, B, C of order two are given such that lim A(n)

By using entropy inequalities with coherent states we prove that for atoms and molecules the partition function of Thomas-Fermi theory becomes exact in the limit Z+ co, in the appropriate scaling. Furthermore the Gibbs state over a suitable algebra converges to a pure state over classical densities