Rate of convergence of the mean for sub-additive ergodic sequences

Abstract

For sub-additive ergodic processes \Xm,n\ with weak dependence, we analyze the rate of convergence of EX0,n/n to its limit g. We define an exponent γ given roughly by EX0,n ng + nγ, and, assuming existence of a fluctuation exponent that gives Var~X0,n n2, we provide a lower bound for γ of the form γ ≥ . The main requirement is that ≠ 1/2. In the case =1/2 and under the assumption Var~X0,n = O(n/( n)β) for some β>0, we prove γ ≥ - c(β) for a β-dependent constant c(β). These results show in particular that non-diffusive fluctuations are associated to non-trivial γ. Various models, including first-passage percolation, directed polymers, the minimum of a branching random walk and bin packing, fall into our general framework, and the results apply assuming exists. In the case of first-passage percolation in Zd, we provide a version of γ ≥ -1/2 without assuming existence of .