Cycles and divergent trajectories for a class of permutation sequences

Abstract

Let f be a permutation from N0 onto N0. Let x∈N0 and consider a (finite or infinite) sequence s= (x,f(x),f2(x),·s). We call s a permutation sequence. Let D be the set of elements of s. If D is a finite set then the sequence s is a cycle, and if D is an infinite set the sequence s is a divergent trajectory. We derive theoretical and computational bounds for cycles and divergent trajectories for a defined class of permutations.

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