Finite orbits in random subshifts of finite type

Abstract

For each n, d ∈ N and 0 < α < 1, we define a random subset of A\1, 2, …, n\d by independently including each element with probability α and excluding it with probability 1-α, and consider the associated random subshift of finite type. Extending results of McGoff and of McGoff and Pavlov, we prove there exists α0 = α(d, |A|) > 0 such that for α < α0 and with probability tending to 1 as n ∞, this random subshift will contain only finitely many elements. In the case d = 1, we obtain the best possible such α0, 1/|A|.