An ergodic theorem for subadditive random functions on vector semigroups

Abstract

Let f=(fx x∈ S), S⊂Zm, be a semigroup of ergodic measure-preserving transformations of a probability space (,P) and h a real random function on S, such that h(x+y,ω) h(x,ω)+h(y,fxω) for all x,y∈ S and ω∈. We prove that there exists a sublinear function q O[-∞;∞) defined on O=int(cone(S)), and a set W⊂ of full probability, such that h(xn,ω)/ xn q(x) for all ω∈ W and all sequences (xn)⊂ S with asymptotic direction x∈ O. The moment condition for this reflects the size of the semigroup f, not that of S. However, an additional independence assumption about h is made.