Asymptotic estimates of functions based on the behavior of their Laplace transforms near singular points (Q358204)

The author proves two Tauberian theorems for the Laplace-Stieltjes transform \(F(s)\) with the charge \(d\nu(t)\), which conclude from asymptotic inequalities for \(F\) to corresponding inequalities concerning \(\nu'(t)\) resp. \(\nu(t)\), which are sharp. Four corollaries are given concerning Mellin integrals, Dirichlet series and Riemann's zeta function under the assumption that the Riemann conjecture is true.