0,1

This constant appears in Benoit Cloitre's generalized Euler-Gauss formula for the Gamma function (see Cloitre link) and is involved in the exact determination of asymptotic limits of certain order-8 linear recursions with varying coefficients (see A097682 for example).

A. M. Odlyzko, Linear recurrences with varying coefficients, in Handbook of Combinatorics, Vol. 2, R. L. Graham, M. Grotschel and L. Lovasz, eds., Elsevier, Amsterdam, 1995, pp. 1135-1138.

Benoit Cloitre, On a generalization of Euler-Gauss formula for the Gamma function, pre-print 2004.

Xavier Gourdon and Pascal Sebah, Introduction to the Gamma Function.

Andrew Odlyzko, Asymptotic enumeration methods, in Handbook of Combinatorics, vol. 2, 1995, pp. 1063-1229.

c = (1+sqrt(2))^(sqrt(2))/2*exp(-Pi/2*(sqrt(2)-1))

c = 0.90724581788216460753879452479208121378777525423587495906871...

RealDigits[(1 + Sqrt[2])^(Sqrt[2])/2E^(-Pi/2*(Sqrt[2] - 1)), 10, 105][[1]] (from Robert G. Wilson v Aug 27 2004)

(PARI) 8*exp(psi(3/8)+Euler)

Cf. A097663-A097673, A097675-A097676.

Sequence in context: A068467 A131223 A093766 this_sequence A097669 A019820 A019985

Adjacent sequences: A097671 A097672 A097673 this_sequence A097675 A097676 A097677

cons,nonn

Paul D. Hanna (pauldhanna(AT)juno.com), Aug 25 2004

More terms from Robert G. Wilson v (rgwv(AT)rgwv.com), Aug 27 2004