An Integral representation of R(s) due to Gabcke

Abstract

Gabcke proved a new integral expression for the auxiliary Riemann function \[ R(s)=2s/2πs/2eπ i(s-1)/4∫-1212 e-π i u2/2+π i u2iπ uU(s-12,2πeπ i/4u)\,du,\] where U(,z) is the usual parabolic cylinder function. We give a new, shorter proof, which avoids the use of the Mordell integral. And we write it in the form equation R(s)=-2s πs/2eπ i s/4∫-∞∞ e-π x2H-s(xπ)1+e-2πω x\,dx.equation where H(z) is the generalized Hermite polynomial.

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