@article {MATHEDUC.06515112,
author = {Bourb\u{a}cu\c{t}, Nicolae},
title = {Monotony and convergence of recursive sequences. (Monotonia \c{s}i convergen\c{t}a unor \c{s}iruri recurente.)},
year = {2014},
journal = {Gazeta Matematic\u{a}. Seria B},
volume = {119},
number = {12},
issn = {1584-9333},
pages = {552-557},
publisher = {Romanian Mathematical Society (Societatea de \c{S}tiin\c{t}e Matematice din Rom\^ania), Bucharest},
abstract = {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.},
msc2010 = {I30xx},
identifier = {2016a.00802},
}