|
%I #10 Jul 04 2013 21:12:10
%S 1,347,7055,177337,212665,219913,379541,413803,822535,1391321,8013899,
%T 21619279,21834347,28306063,37550317,168536521,189763177
%N Conjectured record-breaking maximal values, for ascending positive integers k, of the minimal elements of the primitive cycles of positive integers under iteration by the Collatz-like 3x+k function.
%C A cycle is called primitive if its elements are not a common multiple of the elements of another cycle.
%C The 3x+k function T_k is defined by T_k(x) = x/2 if x is even, (3x+k)/2 if x is odd, where k is odd.
%C For primitive cycles, GCD(k,6)=1.
%e a(1)=1 because {1,2}, with minimal element 1, is the only known '3x+1' cycle of positive integers.
%e k=5 is the next value of k>1 with GCD(k,6)=1. The minimal element in each of the five known primitive '3x+5' cycles of positive integers is 1, 19, 23, 187 and 347. 347>a(1) so a(2)=347.
%Y k = A226666(n).
%Y Cf. A226607, A226681.
%K nonn
%O 1,2
%A _Geoffrey H. Morley_, Jun 16 2013
|
