An Asymptotic Expansion of the Double Gamma Function

We complement a recent calculation (P. B. Gossiaux and the present authors, Ann. Phys. (N.Y.) 268 (1998), 273) of the autocorrelation function of the conductance versus magnetic field strength for ballistic electron transport through microstructures with the shape of a classically chaotic billiard

dn u + k cn u A . (dn u + k cn u)~'", A . ( d n u -k c n u d n u -k c n u the expansions for A (u) and A (u) being suitable for ~-dnu+(:nu i I > -; d n u h c c n u 3c B.(-. dn u ~-+ k cn -) u d n u -k c n u the expansions for H [ x (u)] and B [ z (u)] being suitable for -~ B . -\_ \_ ~ , -( dn uk cn

Two simple pairs of asymptotic expansions in terms of Hermite functions are obtained for the'solutions of the ellipsoidal wave equation.

I t is shown that a simple pair of asymptotic expansions exists for solutions of the ellipsoidal wave equation. An asymptotic expansion for t,he characteristic numbers is also obtained.

The aim of this paper is to give a bivariate asymptotic expansion of the coefficient \(y_{n k}=\left[x^{n}\right] y(x)^{k}\), where \(y(x)=\sum y_{n} x^{n}\) has a power series expansion with non-negative coefficients \(y_{n} \geqslant 0\). Such expansions are known for \(k / n \in[a, b]\) with \(a>

We consider functions f and g which are holomoxphic on closed sectors in 4: where they admit an asymptotic representation at 00 in the form of power series in z-' . We give a simple geometrical condition under which the Hadamard product f \* g of f and g porsemes again an ~y m p totic expansion at 0