1,2

The limit of the local maxima, lim A081252(n)/n^2 = 1/10. For local minima cf. A081253.

K. Brockhaus, Illustration for A053646, A081252, A081253 and A081254

a(n) = floor(2^n*5/3)

a(n) = a(n-2) + 5*2^(n-2) for n > 1; a(n+2) - a(n) = A020714(n); a(n) + a(n-1) = A052549(n) for n > 0; a(2n) = A020989(n); a(2n+1) = A072197(n); a(n+1) - a(n) = A048573(n);

G.f.: -(x^2 - x - 1)/((x - 1)*(x + 1)*(2*x - 1)).

a(n)=5*2^n/3-(-1)^n/6-1/2. a(n)=2a(n-1)+(1-(-1)^n)/2, a(0)=1. - Paul Barry (pbarry(AT)wit.ie), Mar 24 2003

a(2n)=2*a(2n-1), a(2n+1)=2*a(2n)+1, a(0)=1 . a(n)=A000975(n)+2^n . - Philippe DELEHAM (kolotoko(AT)wanadoo.fr), Oct 15 2006

13 is a term since A081252(12)/12^2 = 15/144 = 0.104, A081252(13)/13^2 = 18/169 = 0.107, A081252(14)/14^2 = 20/196 = 0.102.

Cf. A053646, A081252, A081253, A020714, A052549, A020989, A072197, A048573, A000975.

Adjacent sequences: A081251 A081252 A081253 this_sequence A081255 A081256 A081257

Sequence in context: A079941 A019300 A072762 this_sequence A125049 A123247 A112306

nonn

Klaus Brockhaus (klaus-brockhaus(AT)t-online.de), Mar 17 2003