Longest increasing subsequences for distributions with atoms, and an inhomogeneous Hammersley process

Abstract

A famous result by Hammersley and Versik-Kerov states that the length Ln of the longest increasing subsequence among n iid continuous random variables grows like 2n. We investigate here the asymptotic behavior of Ln for distributions with atoms. For purely discrete random variables, we characterize the asymptotic order of Ln through a variational problem and provide explicit estimates for classical distributions. The proofs rely on a coupling with an inhomogeneous version of the discrete-time continuous-space Hammersley process. This reveals that, in contrast to the continuous case, the discrete setting exhibits a wide range of growth rates between O(1) and o(n), depending on the tail behavior of the distribution. We can then easily deduce the asymptotics of Ln for a completely arbitrary distribution.