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Journal of Integer Sequences, Vol. 11 (2008), Article 08.2.8

A Natural Prime-Generating Recurrence


Eric S. Rowland
Department of Mathematics
Rutgers University
Piscataway, NJ 08854
USA

Abstract:

For the sequence defined by a(n) = a(n-1) + gcd(n,a(n-1)) with a(1) = 7 we prove that a(n) - a(n-1) takes on only 1's and primes, making this recurrence a rare "naturally occurring" generator of primes. Toward a generalization of this result to an arbitrary initial condition, we also study the limiting behavior of a(n)/n and a transience property of the evolution.


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(Concerned with sequences A084662 A084663 A106108 A132199 A134162 A135506 and A137613.)

Received July 1 2008; revised version received July 20 2008. Published in Journal of Integer Sequences, July 20 2008.


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