Restricted Permutations and Permanents of Infinite Amenable Groups

Abstract

Let be an infinite discrete group and A⊂ a nonempty finite subset. The set of permutations σ of such that s-1σ (s)∈ A for every s∈ can be identified with a shift of finite type XA⊂ A over . In this paper we study dynamical properties of such shift spaces, like invariant probability measures, topological entropy, and topological pressure, under the hypothesis that is amenable. In this case the topological entropy htop(XA) can be expressed as logarithmic growth rate of permanents of certain finite (0,1)-matrices associated with right Flner sequences in . Motivated by the difficulty of computing such permanents we introduce the notion of the permanent per(f) for nonnegative elements f in the real group ring R of whose support is the alphabet A of the shift space XA, and compare, for arbitrary f ∈ R , the Fuglede-Kadison determinant det FK(f) with the permanent per(|f|) of the absolute value |f| of f. Although this approach is effective in only few examples, discussed below, it is interesting from a conceptual point of view that the permanent per(f) of a nonnegative element f∈ R can be viewed as topological pressure of the restricted-permutation shift space XA associated with the function f on the alphabet A=supp(f) of XA.