Necessary and sufficient Tauberian conditions for the logarithmic summability of functions and sequences (Q2866760)

Let \(s:[1,\infty) \to \mathbb{C}\) be a locally Lebesgue integrable function. A function \(s\) is said to be summable \((L,1)\) if there exists some \(A \in \mathbb{C}\) such that NEWLINE\[NEWLINE\lim _{t \to \infty} \tau (t)=A,NEWLINE\]NEWLINE where \(\displaystyle{\tau (t)=\frac{1}{\log (t)}\int _{1}^{t}\frac{s(u)}{u}\,du}.\)NEWLINENEWLINEIf the limit \(s(t) \to A\) exists, then \(\tau (t) \to A\) as \(t \to \infty\). But the converse of this implication is not true in general.NEWLINENEWLINEThe author gives necessary and sufficient conditions under which the converse implication is true.