English

Half quasi-Cauchy sequences

General Mathematics 2012-05-17 v1

Abstract

A real function ff is ward continuous if ff preserves quasi-Cauchyness, i.e. (f(xn))(f(x_{n})) is a quasi-Cauchy sequence whenever (xn)(x_{n}) is quasi-Cauchy; and a subset EE of R\textbf{R} is quasi-Cauchy compact if any sequence x=(xn)\textbf{x}=(x_{n}) of points in EE has a quasi-Cauchy subsequence where R\textbf{R} is the set of real numbers. These known results suggest to us introducing a concept of upward (respectively, downward) half quasi-Cauchy continuity in the sense that a function ff is upward (respectively, downward) half quasi-Cauchy continuous if it preserves upward (respectively, downward) half quasi-Cauchy sequences, and a concept of upward (respectively, downward) half quasi-Cauchy compactness in the sense that a subset EE of R\textbf{R} is upward (respectively, downward) half quasi-Cauchy compact if any sequence of points in EE has an upward (respectively, downward) half quasi-Cauchy subsequence. We investigate upward(respectively, downward) half quasi-Cauchy continuity and upward (respectively, downward) half quasi-Cauchy compactness, and prove related theorems.

Keywords

Cite

@article{arxiv.1205.3674,
  title  = {Half quasi-Cauchy sequences},
  author = {Huseyin Cakalli},
  journal= {arXiv preprint arXiv:1205.3674},
  year   = {2012}
}

Comments

24 pages. arXiv admin note: substantial text overlap with arXiv:1103.1230, arXiv:1102.1531, arXiv:1204.2445

R2 v1 2026-06-21T21:05:02.673Z