Crystal Growth on Locally Finite Partially Ordered Sets

Abstract

We consider a Markovian growth process on a partially ordered set , equivalent to last passage percolation (LPP) with independent (not necessarily identical) exponentially distributed weights on the elements of . Such a process includes inhomogeneous exponential LPP on the Euclidean lattice N0d. We give non-asymptotic bounds on the mean and variance, as well as higher, central, and exponential moments of the passage time τA to grow any set A ⊂eq in terms of characteristics of A. We also give a limit shape theorem when is equipped with a monoid structure. Methods involve making use of the backward equation associated to the Markovian evolution and comparison inequalities with respect to the time-reversed generator.