Dynamics and Chaotic of Polynomials on Quasi Banach Spaces

Authors

  • Naseif Jasim Al-Jawari Department of Mathematics, College of Science, University of Al-Mustansiriyah, Baghdad,Iraq
  • Arwa Nazar Mustafa Department of Mathematics, College of Science, University of Al-Mustansiriyah, Baghdad,Iraq

Keywords:

Quasi-Banach space, Polynomials, Quasi Hypercyclic, Quasi Chaos, Julia set

Abstract

In the present paper, the concepts of a quasi-metric space, quasi-Banach space
have been introduced. We prove some facts which are defined on these spaces and
define some polynomials on quasi-Banach spaces and studied their dynamics, such
as, quasi cyclic and quasi hypercyclic. We show the existence of quasi chaotic in the
sense of Devaney (quasi D-chaotic) polynomials on quasi Banach space of qsummable
sequences lq , 0<q<1 such polynomials P is defined by P((xi)i)=(p(xi+m))i
where p:CC, p(0) = 0. In general we also prove that P is quasi chaotic in the sense
of Auslander and Yorke (quasi AY-chaotic) if and only if 0 belong to the Julia set of
p, mN. And then we prove that if the above polynomial P on lq , 0<q<1 is quasi
AY-chaotic then so is P where R+ with 1 and Pn for each n2.

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Published

2023-04-30

Issue

Section

Mathematics

How to Cite

Dynamics and Chaotic of Polynomials on Quasi Banach Spaces. (2023). Iraqi Journal of Science, 56(2A), 1111-1123. https://ijs.uobaghdad.edu.iq/index.php/eijs/article/view/10201

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