Asymptotic fitting shadowing property
Other Title(s)
خاصية مقارب التظليل المناسب
Joint Authors
al-Jabburi, Rad Safah Abbud
al-Shara, Iftikhar Mudar Talib
Source
Issue
Vol. 7, Issue 13-14 (30 Jun. 2018), pp.41-50, 10 p.
Publisher
Publication Date
2018-06-30
Country of Publication
Iraq
No. of Pages
10
Main Subjects
Abstract EN
Let (M, ɗ ) be a metric space, ɸ be a map from a metric space (M, ɗ ) to itself and satisfy the Asymptotic Fitting Shadowing property(AFSP) then these results are satisfy: For every m∈N, ɸm has asymptotic fitting shadowing property and ɸ is chain transitive, also, if ψ has the asymptotic fitting shadowing property then ɸ×ψ has the asymptotic fitting shadowing property.
In addition to the other results on the asymptotic fitting shadowing property.
American Psychological Association (APA)
al-Shara, Iftikhar Mudar Talib& al-Jabburi, Rad Safah Abbud. 2018. Asymptotic fitting shadowing property. Albahir Journal،Vol. 7, no. 13-14, pp.41-50.
https://search.emarefa.net/detail/BIM-1291697
Modern Language Association (MLA)
al-Shara, Iftikhar Mudar Talib& al-Jabburi, Rad Safah Abbud. Asymptotic fitting shadowing property. Albahir Journal Vol. 7, no. 13-14 (2018), pp.41-50.
https://search.emarefa.net/detail/BIM-1291697
American Medical Association (AMA)
al-Shara, Iftikhar Mudar Talib& al-Jabburi, Rad Safah Abbud. Asymptotic fitting shadowing property. Albahir Journal. 2018. Vol. 7, no. 13-14, pp.41-50.
https://search.emarefa.net/detail/BIM-1291697
Data Type
Journal Articles
Language
English
Notes
-
Record ID
BIM-1291697