术语(n>0)可以写为一个左对齐数组,行长度为2^m,m>=0:
2,
3, 3,
5, 4, 5, 4,
8, 7, 7, 5, 8, 7, 7, 5,
13,11,12, 9,11,10, 9, 6,13,11,12, 9,11,10, 9, 6,
21,18,19,14,19,17,16,11,18,15,17,13,14,13,11, 7,21,18,19,14,19,17,...
所有列都具有斐波那契数列性质:a(2^(m+2)+k)=a(2^(m+1)+k)+a(2^m+k),m>=0,0<=k<2^m(经验观察)。
术语(n>0)也可以写为右对齐数组,行长度为2^m,m>=0:
2,
3, 3,
5, 4, 5, 4,
8, 7, 7, 5, 8, 7, 7, 5,
13,11,12, 9,11,10, 9, 6,13,11,12, 9,11,10, 9, 6,
..., 18,15,17,13,14,13,11, 7,21,18,19,14,19,17,16,11,18,15,17,13,14,13,11, 7,
每一列都是一个算术序列。算术序列的差异给出了序列A071585号:a(2^(m+1)-1-k)-a(2^m-1-k)=A071585号(k) ,m>=0,0<=k<2^m。