On the Stieltjes Approximation Error to Logarithmic Integral

Abstract

We study the approximation error (x)=li*(x)-li(x) arising from the classical Stieltjes asymptotic expansion for the logarithmic integral. Our analysis is based on the discrete values k=(ek) and their increments k=k+1-k, for which we derive new unconditional analytic bounds. Using precise integral representations for each increment k, together with sharp upper and lower estimates for the associated kernel integrals, we obtain computable and uniform bounds for k for all k 1, and hence for (x) for all x e. We prove the following unconditional bounds: arrayl 132π(x) + o(1(x)) (x) 132π(x) + o(1(x)) for all e x e1000, array arrayl 132π(x) + o(1(x)) - Cl (x) 132π(x) + o(1(x)) + Cr for all x>e1000 with Cl = 0.0000035462 and Cr=0.0000021511. array These results establish the first fully explicit global bounds for the Stieltjes approximation error. Finally, our findings strongly support the conjectural behaviour: (x) = 132π(x) + o\!(1(x)), x e.