1,1

Recalling the Collatz map (cf. A006370 ) : x->x/2 if x is even; x->3x+1 if x is odd, let C_m(n) denotes the image of n after m iterations. Then b(n)= lim k -> infinity C_3k(n) (from the Collatz conjecture C_3k(n) is constant =1,2 or 4 for k large enough). Curiously the graph for a(n) presents "regularities" around zero and a pattern coming bigger and bigger. Compared with a random sequence of form : 7*n-3*sum(k=1,n,r(k)) where r(k) takes random values among (1;2;4).

since 3->10->5->16->8->4->2->1 etc. C_6(3)=2 and then for any k>=2 C_3k(3)=2, hence b(3)=2.

Sequence in context: A077061 A072508 A075566 this_sequence A082486 A106591 A106592

Adjacent sequences: A076084 A076085 A076086 this_sequence A076088 A076089 A076090

sign

Benoit Cloitre (benoit7848c(AT)orange.fr), Oct 30 2002