-760
domain: Z
Appears in sequences
- McKay-Thompson series of class 6D for Monster.at n=11A007257
- Expansion of Product_{k>=1} (1 - x^k)^20.at n=3A010826
- McKay-Thompson series of class 6D for Monster with a(0) = 1.at n=11A045487
- Expansion of q^(-1/24) (m (1-m) / 16)^(1/24) in powers of q, where m = k^2 is the parameter and q is the nome for Jacobian elliptic functions.at n=37A081360
- McKay-Thompson series of class 12f for the Monster group.at n=19A112149
- McKay-Thompson series of class 6D for the Monster group with a(0) = -4.at n=11A121667
- Inverse of Riordan array (1/(1-x)^3, x/(1-x)^3).at n=24A127894
- a(n) = -(n - 4)*(n - 5)*(n - 12)/6.at n=18A167541
- Coefficients of partition Hermite-MacMahon polynomials: p(x,n)= If[n == 0, 1, HermiteH[n, x]*Sum[MacMahon[n-1, k-1]*x^(k - 1), {k, 1, n}]/2^Floor[n/2]].at n=25A171533
- Coefficients in the q-expansion of the Gamma_0(6) weight -2 meromorphic modular form F(z) (see Formula section for definition).at n=5A181102
- Array of coefficients of polynomials providing the third term of the numerator of the generating function for odd powers (2*m+1) of Chebyshev S-polynomials. The present polynomials are called P(m;2,x^2), m >= 2.at n=28A217479
- a(n) = Sum_{i=0..n-1} K(i,n)*i, where K(,) is Kronecker symbol.at n=94A228131
- Expansion of q^(-1/4) * eta(q)^8 * eta(q^4)^2 / eta(q^2)^5 in powers of q.at n=25A244276
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 459", based on the 5-celled von Neumann neighborhood.at n=19A272290
- Irregular triangle read by rows T(n,m), coefficients in power/Fourier series expansion of an arbitrary anharmonic oscillator's exact phase space angular velocity.at n=56A276814
- Expansion of Product_{n>0} ((1-x^n)/(1+x^n))^n in powers of x.at n=20A285675
- Expansion of Product_{n>0} ((1-x^n)/(1+x^n))^n in powers of x.at n=21A285675
- Expansion of Product_{k>0} (1 - k^2*x^k)^(1/k).at n=12A294620
- Expansion of Sum_{k>=1} k * x^k * (1 - x^k) / (1 + x^k)^3.at n=37A326238
- Expansion of e.g.f. sqrt(1 - 2*x*exp(x)).at n=5A380028