The periodic integral orbits of polynomial recursions with integer coefficients
Abstract
We show that polynomial recursions xn+1=xnm-k where k,m are integers and m is positive have no nontrivial periodic integral orbits for m≥3. If m=2 then the recursion has integral two-cycles for infinitely many values of k but no higher period orbits. We also show that these statements are true for all quadratic recursions.
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