Sophomore's dream function: asymptotics, complex plane behavior and relation to the error function

Abstract

Sophomore's dream sum S=Σn=1∞ n-n is extended to the function f(t,a)=t∫01(ax)-txdx with f(1,1)=S. Asymptotic behavior for a large |t| is obtained, which is exponential for t>0 and t<0,a>1, and inverse-logarithmic for t<0,a<1. An advanced approximation includes a half-derivative of the exponent and is expressed in terms of the error function. This approach provides excellent interpolation description in the complex plane. The function f(t,a) demonstrates for a>1 oscillating behavior along the imaginary axis with slowly increasing amplitude and the period of 2π iea, modulation by high-frequency oscillations being present. Also, f(t,a) has non-trivial zeros in the left complex half-plane with Imtn 2(n-1/8)π e/a for a ≥ 1. The results obtained describe analytical integration of the function xtx.