1,5

N. J. Fine, Problem 4314, Amer. Math. Monthly, Vol. 57, 1950, 421-423.

N. J. Fine, Basic Hypergeometric Series and Applications, Amer. Math. Soc., 1988; p. 8, (7.323) and p. 39, Example 7.

T. D. Noe, Table of n, a(n) for n = 1..1000

a(n+1)=(A000041(n)+(-1)^n*A000700(n))/2.

a(n+1)=p(n)-p(n-1)+p(n-4)-p(n-9)+... where p(n) is the number of unrestricted partitions of n, A000041. [Fine] - David Callan (callan(AT)stat.wisc.edu), Mar 14 2004

G.f.: A(q) = Sum_{n >= 0} a(n) q^n = 1 + q^2 + q^3 + 3 q^4 + 3 q^5 + 6 q^6 + ...

= Sum_{n >= 0} q^(2n)/(q; q)_{2n}

= ((Prod_{k >= 1} 1/(1-q^k) + (Prod_{k >= 1} 1/(1+q^k))/2 (R. William Gosper (rwg(AT)osots.com), Jun 25 2005)

Also, let B(q) = Sum_{n >= 0} A027193(n) q^n = q + q^2 + 2 q^3 + 2 q^4 + 4 q^5 + 5 q^6 + ...

Then B(q) = Sum_{n >= 0} q^(2n+1)/(q; q)_{2n+1} = ((Prod_{k >= 1} 1/(1-q^k) - (Prod_{k >= 1} 1/(1+q^k))/2.

Also we have the following identity involving 2 X 2 matrices:

Prod_{k >= 1} [ 1/(1-q^2k) q^k/(1-q^2k / q^k/(1-q^2k) 1/(1-q^2k) ]

= [ A(q) B(q) / B(q) A(q) ] (R. William Gosper (rwg(AT)osots.com), Jun 25 2005)

a(2*n)=A046682(2*n), a(2*n+1)=A000701(2*n+1); a(n)=A000041(n)-A027193(n). - Reinhard Zumkeller (reinhard.zumkeller(AT)lhsystems.com), Apr 22 2006

Expansion of (1+phi(q))/(2f(-q)) where phi(),f() are Ramanujan theta functions.

G.f.: (Sum_{k>=0} (-1)^n x^n^2)/(Product_{k>0}(1-x^k)). - Michael Somos Aug 19 2006

a(1) = 1 from the partition 1 = 1; a(2) = 0; a(3) = 1 from 3 = 1+1+1.

(PARI) {a(n)=local(A); if(n<0, 0, A=x*O(x^oo); polcoeff( sum(k=0, sqrtint(n), (-x)^k^2, A)/eta(x+A), n))} /* Michael Somos Aug 19 2006 */

Cf. A027193, A000701, A046682.

Cf. A026838.

Sequence in context: A083751 A034401 A088571 this_sequence A056508 A050065 A078477

Adjacent sequences: A027184 A027185 A027186 this_sequence A027188 A027189 A027190

nonn

Clark Kimberling (ck6(AT)evansville.edu)

This is an example of a sequence where there are two good choices for the offset. Offset 1 is consistent with the first part of the definition. - njas, Aug 27 2006