A222411 Numerators in Taylor series expansion of (x/(exp(x) - 1))^(3/2)*exp(x/2).
1, -1, -1, 5, 7, -19, -869, 715, 2339, -200821, -12863, 2117, 7106149, -64604977, -131301607, 7629931291, 174053933, -19449462373, -46949081169401, 355455588729389, 10635113572583999, -6511303438681407901, -349640201588122693, 9112944418860287
Offset: 0
Examples
The first few fractions are 1, -1/4, -1/32, 5/384, 7/10240, -19/40960, -869/61931520, 715/49545216, ... = A222411/A222412. - _Petros Hadjicostas_, May 14 2020
Links
- Alois P. Heinz, Table of n, a(n) for n = 0..300
- David Broadhurst, Relations between A241885/A242225, A222411/A222412, and A350194/A350154.
- F. J. Dyson, N. E. Frankel and M. L. Glasser, Lehmer's Interesting Series, arXiv:1009.4274 [math-ph], 2010-2011.
- F. J. Dyson, N. E. Frankel and M. L. Glasser, Lehmer's interesting series, Amer. Math. Monthly, 120 (2013), 116-130.
- D. H. Lehmer, Interesting series involving the central binomial coefficient, Amer. Math. Monthly, 92(7) (1985), 449-457.
Programs
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Maple
gf:= (x/(exp(x)-1))^(3/2)*exp(x/2): a:= n-> numer(coeff(series(gf, x, n+3), x, n)): seq(a(n), n=0..25); # Alois P. Heinz, Mar 02 2013
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Mathematica
Series[(x/(Exp[x]-1))^(3/2)*Exp[x/2], {x, 0, 25}] // CoefficientList[#, x]& // Numerator (* Jean-François Alcover, Mar 18 2014 *)