Open Access Library Journal
Vol.05 No.08(2018), Article ID:86647,5 pages
10.4236/oalib.1104775
Compact-Open and Point Wise Convergence Topologies
Mohammed Nokhas Murad Kaki
Department of Mathematics, College of Science, University of Sulaimani, Sulaimani, Iraq
Copyright © 2018 by author and Open Access Library Inc.
This work is licensed under the Creative Commons Attribution International License (CC BY 4.0).
http://creativecommons.org/licenses/by/4.0/
Received: July 13, 2018; Accepted: August 11, 2018; Published: August 14, 2018
ABSTRACT
In this paper, we have investigated and introduced some new definitions of transitivity on the set of all continuous maps, denoted by , called the point-wise convergence transitive, the compact-open transitive and point wise convergence topological transitive sets. Relationship between these new definitions is studied. Finally, we have introduced a number of very important topological concepts and shown that every compact-open convergence transitive map implies point wise transitive maps but the converse not necessarily true.
Subject Areas:
Mathematical Analysis
Keywords:
Compact-Open Topology, Transitive Set, Chaotic Sets, Point Wise Convergence Mixing
1. Introduction
Let and be two topological spaces and be the set of all continuous maps from X into Y. Consider all possible sets of maps of the form
where K is a compact set in X and U an open set in Y. The topology generated by these sets as a subbase is called the compact-open topology on . Note that any open set in is called co-open set and is called co-topological space. The compliment of co-open set is called co-closed set. We have introduced some new definitions of transitivity on , called the point-wise convergence transitive set, the compact-open transitive and point wise convergence topological transitive sets in C(X, Y). Relationship between these new definitions is studied. Finally, we have introduced a number of very important topological concepts and shown that every compact-open convergence transitive set implies point wise transitive set and that every compact-open-mixing system implies point wise convergence system but not conversely. Finally, we have shown that every strongly compact-open-mixing set implies strongly point wise convergence mixing set but the converse not necessarily true.
2. New Theorems of Point Wise-Convergence Topology
Definition 2.1. Consider in the sets
where , are open sets in Y.
The topology generated by these sets in their capacity as a subset is called the topology of point-wise convergence on .
Note that any open set in is called pc-open set and is called pc-topological space. The compliment of pc-open set is called pc-closed set.
Definition 2.2. A function is called pc-irresolute if the inverse image of each pc-open set is a pc-open set in .
Definition 2.3. A map is pcr-homeomorphism if it is bijective and thus invertible and both F and are pc-irresolute.
The systems and are topologically pcr-conjugate if there is a pcr-homeomorphism such that .
Let be a pc-topological space. The intersection of all pc-closed sets of containing A is called the pc-closure of A and is denoted by .
Definition 2.4. Let be a point wise convergence-topological space, and be a map. The map F is said to have pc-dense orbit if there exists such that .
Definition 2.5. Let be a pc-topological space, and be a pc-irresolute map, then F is said to be a point-wise-converge-transitive (shortly pc-transitive) map if for every pair of pc-open sets U and V in there is a positive integer n such that .
Definition 2.6. Let be a point wise convergence-topological space, and be a pc-irresolute then the set is called pc-type transitive set if for every pair of non-empty pc-open sets U and V in with and there is a positive integer n such that .
Definition 2.7. 1) Let be a point-wise convergence-topological space, and be a pc-irresolute then the set is called is called topologically pc-mixing set if, given any nonempty pc-open subsets with and then such that for all .
2) The set is called a weakly pc-mixing set of if for any choice of nonempty pc-open subsets of A and nonempty pc-open subsets of with and there exists such that and .
3) The set is strongly pc-mixing if for any pair of pc-open sets U and V with and , there exist some such that for any .
4) Any element such that its orbit is pc-dense in X. is called hypercyclic element.
5) A system is said to be topologically pc-mixing if, given pc-open sets U and V in , there exists an integer N, such that, for all , one has .
6) A system is called topologically pc-mixing if for any non-empty pc-open set U, there exists such that is pc-dense in .
3. Definitions and Theorems of Compact-Open Topology
The following definition supplies another version of a topology on the set .
Definition 3.1. Consider all possible sets of maps of the form [1]
where K is a compact set in X and U an open set in Y. The topology generated by these sets as a subbase is called the compact-open topology on .
Note that any open set in is called co-open set and is called co-topological space. The compliment of co-open set is called co-closed set.
Definition 3.2. Let be a co-topological space. The map is called co-irresolute if for every subset , . or, equivalently, F is co-irresolute if and only if for every co-closed set A, is co-closed set.
Definition 3.3. A map is cor-homeomorphism if it is bijective and thus invertible and both F and are co-irresolute.
The systems and are topologically cor-conjugate if there is a cor-homeomorphism such that .
Let be a co-topological space. The intersection of all co-closed sets of containing A is called the co-closure of A and is denoted by .
Definition 3.4. Let be a compact-open topological space, and be a map. The map F is said to have co-dense orbit if there exists such that .
Definition 3.5. Let be a co-topological space, and be a co-irresolute map, then F is said to be a compact-open-transitive ( shortly co-transitive) map if for every pair of co-open sets U and V in there is a positive integer n such that is not empty.
Definition 3.6. Let be a co-topological space, and be a co-irresolute then the set is called co-type transitive set if for every pair of non-empty co-open sets U and V in with and there is a positive integer n such that .
Definition 3.7. 1) Let be a co-topological space, and be a co-irresolute then the set is called is called topologically co-mixing set if, given any nonempty co-open subsets with and then such that for all .
2) The set is called a weakly co-mixing set of if for any choice of nonempty co-open subsets of A and nonempty co-open subsets of with and there exists such that and .
3) The set is strongly co-mixing if for any pair of co-open sets U and V with and , there exist some such that for any .
4) A system is said to be topologically co-mixing if, given co-open sets U and V in , there exists an integer N, such that, for all , one has . For related works about weakly mixing see [2] , [3] and [4] .
4. Conclusions
We have the following results:
1) Every compact-open-transitive set implies point wise convergence set but not conversely.
2) Every compact-open-mixing system implies point wise convergence system but not conversely.
3) Every strongly compact-open-mixing set implies strongly point wise convergence mixing set.
Acknowledgements
First, thanks to my family for having the patience with me for having taking yet another challenge which decreases the amount of time I can spend with them. Specially, my wife who has taken a big part of that sacrifices, also, my son Sarmad who helps me for typing my research. Thanks to all my colleagues for helping me for completing my research.
Conflicts of Interest
The author declares no conflicts of interest regarding the publication of this paper.
Cite this paper
Kaki, M.N.M. (2018) Compact-Open and Point Wise Convergence Topologies. Open Access Library Journal, 5: e4775. https://doi.org/10.4236/oalib.1104775
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