Search: id:A060477
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%I A060477
%S A060477 3,1,2,3,6,9,18,30,56,99,186,335,630,1161,2182,4080,7710,14532,27594,
%T A060477 52377,99858,190557,364722,698870,1342176,2580795,4971008,9586395,
%U A060477 18512790,35790267,69273666,134215680,260300986
%N A060477 Number of orbits of length n in map whose periodic points are A048578.
%D A060477 Yash Puri and Thomas Ward, A dynamical property unique to the Lucas sequence, 
               Fibonacci Quarterly, Volume 39, Number 5 (November 2001), pp. 398-402.
%H A060477 Y. Puri and T. Ward, <a href="http://www.cs.uwaterloo.ca/journals/JIS/
               index.html">Arithmetic and growth of periodic orbits</a>, J. Integer 
               Seqs., Vol. 4 (2001), #01.2.1.
%F A060477 If b(n) is the n-th term of A048578, then a(n)=(1/n)* Sum_{d|n}\mu(d)a(n/
               d)
%e A060477 a(3)=2 since the 3rd term of A048578 is 9 and the first term is 3.
%Y A060477 A048578.
%Y A060477 Cf. A001037, A059966 (both nearly identical to this sequence).
%Y A060477 Cf. A093210.
%Y A060477 Sequence in context: A078350 A078719 A087227 this_sequence A080890 A016468 
               A134839
%Y A060477 Adjacent sequences: A060474 A060475 A060476 this_sequence A060478 A060479 
               A060480
%K A060477 easy,nonn
%O A060477 1,1
%A A060477 Thomas Ward (t.ward(AT)uea.ac.uk)

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