eprintid: 546
rev_number: 2
eprint_status: archive
userid: 1
dir: disk0/00/00/05/46
datestamp: 2023-11-09 15:48:41
lastmod: 2023-11-09 15:48:41
status_changed: 2023-11-09 15:22:42
type: article
metadata_visibility: show
creators_name: Oxley, A.
title: Detecting the phenomenon of strange non-chaotic attractors
ispublished: pub
note: cited By 1
abstract: I comment on how chaos might be defined. A sample of dynamical systems that have quasi-periodic forcing functions is then considered. The normal approach found in the literature is to start with an ordinary differential equation, change to a difference equation, and then plot a graph. The question of how to detect a strange non-chaotic attractor without the underlying ordinary differential equation is posed and some pointers are given as to a possible method of solution using statistical analysis. © Austral. Mathematical Soc. 2010.
date: 2009
official_url: https://www.scopus.com/inward/record.uri?eid=2-s2.0-78049464341&partnerID=40&md5=1e80fdeda1104f49e86e65dbf559c892
full_text_status: none
publication: ANZIAM Journal
volume: 51
number: SUPPL.
pagerange: C612-C624
refereed: TRUE
issn: 14461811
citation:   Oxley, A.  (2009) Detecting the phenomenon of strange non-chaotic attractors.  ANZIAM Journal, 51 (SUPPL.).  C612-C624.  ISSN 14461811