\input zb-basic
\input zb-matheduc
\iteman{ZMATH 2016a.00802}
\itemau{Bourb\u{a}cu\c{t}, Nicolae}
\itemti{Monotony and convergence of recursive sequences. (Monotonia \c{s}i convergen\c{t}a unor \c{s}iruri recurente.)}
\itemso{Gaz. Mat., Ser. B 119, No. 12, 552-557 (2014).}
\itemab
Summary: Given a real-valued function, we consider three real sequences defined as convex combinations. For a increasing function we infer that the sequences are monotonic, while for a continuous function we have convergent sequences. Some applications are presented.
\itemrv{~}
\itemcc{I30}
\itemut{recursive sequences; iterations; monotony; convergence; fixed points}
\itemli{}
\end