English

$delta$-Quasi Cauchy Sequences

Functional Analysis 2010-09-24 v3 Classical Analysis and ODEs General Topology

Abstract

Recently, a concept of forward continuity and a concept of forward compactness are introduced in the senses that a function ff is forward continuous if limnΔf(xn)=0\lim_{n\to\infty} \Delta f(x_{n})=0 whenever limnΔxn=0\lim_{n\to\infty} \Delta x_{n}=0,\; and a subset EE of R\textbf{R} is forward compact if any sequence x=(xn)\textbf{x}=(x_{n}) of points in EE has a subsequence z=(zk)=(xnk)\textbf{z}=(z_{k})=(x_{n_{k}}) of the sequence x\textbf{x} such that limkΔzk=0\lim_{k\to \infty} \Delta z_{k}=0 where Δzk=zk+1zk\Delta z_{k}=z_{k+1}-z_{k}. These concepts suggest us to introduce a concept of second forward continuity in the sense that a function ff is second forward continuous if limnΔ2f(xn)=0\lim_{n\to\infty}\Delta^{2}f(x_{n})=0 whenever limnΔ2xn=0\lim_{n\to\infty}\Delta^{2}x_{n}=0, and a subset EE of R\textbf{R} is second forward compact if whenever x=(xn)\textbf{x}=(x_{n}) is a sequence of points in EE there is a subsequence z=(zk)=(xnk)\textbf{z}=(z_{k})=(x_{n_{k}}) of x\textbf{x} with limkΔ2zk=0\lim_{k\to \infty} \Delta^{2}z_{k}=0 where Δ2yn=yn+22yn+1+yn\Delta^{2} y_{n}=y_{n+2}-2y_{n+1}+y_{n}. We investigate the impact of changing the definition of convergence of sequences on the structure of forward continuity in the sense of second forward continuity, and compactness of sets in the sense of second forward compactness, and prove related theorems.

Keywords

Cite

@article{arxiv.1005.4940,
  title  = {$delta$-Quasi Cauchy Sequences},
  author = {Huseyin Cakalli},
  journal= {arXiv preprint arXiv:1005.4940},
  year   = {2010}
}

Comments

I withdraw my paper due to the acceptance in the journal "Mathematical and Computer Modelling"

R2 v1 2026-06-21T15:28:21.963Z