%I #4 Mar 31 2012 13:21:13
%S 0,1,2,3,4,4,6,6,0,9,2,3,12,12,6,6,0,1,18,3,4,4,6,6,0,9,18,3,12,12,6,
%T 6,32,33,32,33,36,36,36,36,32,33,32,33,36,36,36,36,48,33,48,33,36,36,
%U 36,36,48,33,48,33,36,36,36,36,0,1,66,67,4,4,6,6,0,9,66,67,12,12,6,6
%N A106486-encoding of the canonical representative of the combinatorial game with code n.
%H A. Karttunen, <a href="/A126000/a126000.scm.txt">Scheme-program for computing this sequence.</a>
%e 25 (= 2^(2*2) + 2^(2*0) + 2^(1+2*1)) encodes the game {-1,0|1}, where, as the option -1 is dominated by option 0, the former can be deleted, giving us the game {0|1}, i.e. the canonical (minimal) form of the game 1/2, encoded as 2^(2*0) + 2^(1+2*1) = 9, thus a(25)=9 and a(9)=9. Similarly a(65536)=1, as 65536 (= 2^(2*(2^(1+2*1)))) encodes the game {{|1}|}, which is reversible to the game {0|}, i.e. the game 1, which is encoded as 2^(2*0) = 1.
%Y A126011 gives the distinct terms (and also the records).
%K nonn
%O 0,3
%A _Antti Karttunen_, Dec 18 2006