Unbounded Oscillation of Euler-Gompertz Diophantine Errors from Bell and Gould Numbers

Abstract

We investigate the asymptotic behavior of the Diophantine errors δBn-An, where δ=-eEi(-1) denotes the Euler-Gompertz constant and Bn and An are the nth Bell and Gould numbers, respectively. These errors have exponential generating function gδ(z)=(ez-1)(δ- ∫0z(1-et)dt),\:z∈C, and it is known that δBn-An=O(Bn(-cn/((n))2)) for some c∈R>0, implying n→∞(An/Bn)=δ. In the present work, we prove that δBn-An oscillates without bound as n→∞; that is, both n→∞(δBn-An)=∞ and n→∞(δBn-An)=-∞.