Wydawnictwa / Czasopisma IMPAN / Colloquium Mathematicum / Wszystkie zeszyty

Streszczenie

Schmidt's Tauberian theorem says that if a sequence $(x_k)$ of real numbers is slowly decreasing and $\mathop {\rm lim}_{n\to \infty } (1/n) \sum ^n_{k=1} x_k = L$, then $\mathop {\rm lim}_{k\to \infty } x_k = L$. The notion of slow decrease includes Hardy's two-sided as well as Landau's one-sided Tauberian conditions as special cases. We show that ordinary summability $(C,1)$ can be replaced by the weaker assumption of statistical summability $(C,1)$ in Schmidt's theorem. Two recent theorems of Fridy and Khan are also corollaries of our Theorems 1 and 2. In the Appendix, we present a new proof of Vijayaraghavan's lemma under less restrictive conditions, which may be useful in other contexts.