Prime numbers and dynamics of the polynomial x2-1
Abstract
Let n ∈ Z≥slant 2. By P(n) we denote the set of all prime divisors of the integers in the sequence n, n2-1, (n2-1)2-1, …. We ask whether the set P(n) determines n uniquely under the assumption that n ≠ m2-1 for m ∈ Z≥slant 2. This problem originates in the structure theory of infinite-dimensional Lie algebras. We show that the sets P(n) generate infinitely many equivalence classes of positive integers under the equivalence relation n1 n2 P(n1) = P(n2). We also prove that the sets P(n) separate all positive integers up to 229, and we provide some heuristics on why the answer to our question should be positive.
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