0,6

The first differences b(n)=a(n+1)-a(n) obey the recurrence b(n+1)-2b(n) = (-3,3,-2,3,-3,2), continued with period 6.

The 2nd differences c(n)=b(n+1)-b(n) obey the recurrence c(n+1)-2c(n) = (6,-5,5,-6,5,-5), periodically continued with period 6.

The hexaperiodic coefficients in these recurrences for A113405, A131666 and their higher order differences define a table,

0, 0, 1, 0, 0, -1 <- A113405

0, 1, -1, 0, -1, 1 <- A131666

1, -2, 1, -1, 2, -1 <- a(n)

-3, 3, -2, 3, -3, 2 <- b(n)

6, -5, 5, -6, 5, -5 <- c(n)

-11,10,-11, 11,-10, 11

21,-21,22,-21, 21,-22

...

in which the first three columns are A024495, A131708 and A024493, multiplied by a checkerboard pattern of signs.

a(n) = A131666(n+1)-A131666(n).

a(n+1)-2a(n) = A131556(n), a sequence with period length 6.

Sequence in context: A124286 A027419 A116969 this_sequence A131935 A119749 A145970

Adjacent sequences: A131087 A131088 A131089 this_sequence A131091 A131092 A131093

easy,nonn

Paul Curtz (bpcrtz(AT)free.fr), Sep 24 2007

Edited by R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Jun 28 2008