%I A051015
%S A051015 105,1419,1729,1885,4505,5719,15387,24211,25085,27559,31929,54205,59081,
%T A051015 114985,207177,208681,233569,287979,294409,336611,353977,448585,507579,
%U A051015 721907,982513,1012121,1073305,1242709,1485609,2089257,2263811,2953711,
               3077705,3506371,3655861,3973085,4648261,5069629,6173179,6253085,6985249,
               7355239,7355671,7558219,8011459,8413179,8444431,8712985,9271805,9773731,
               15411785,18175361,18578113,19827641,20771801,23691481,26000605,26758057
%N A051015 Zeisel numbers.
%C A051015 Pick any integers A and B and consider the linear recurrence relation 
               given by p(0) = 1, p(i + 1) = A*p(i) + B. If for some n > 2, p(1), 
               p(2), ..., p(n) are distinct primes, then the product of these primes 
               is called a Zeisel number.
%H A051015 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               ZeiselNumber.html">Link to a section of The World of Mathematics.</
               a>
%Y A051015 Sequence in context: A033593 A058844 A165382 this_sequence A076377 A165374 
               A024198
%Y A051015 Adjacent sequences: A051012 A051013 A051014 this_sequence A051016 A051017 
               A051018
%K A051015 nonn
%O A051015 0,1
%A A051015 Eric Weisstein (eric(AT)weisstein.com)
%E A051015 More terms from David Wasserman (wasserma(AT)spawar.navy.mil), Feb 19 
               2002
%E A051015 Corrected and extended by Karsten Meyer (arblo01(AT)gmx.de), Jun 08 2006