<?xml version="1.0" encoding="UTF-8"?><!DOCTYPE article  PUBLIC "-//NLM//DTD Journal Publishing DTD v3.0 20080202//EN" "http://dtd.nlm.nih.gov/publishing/3.0/journalpublishing3.dtd"><article xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" dtd-version="3.0" xml:lang="en" article-type="research article"><front><journal-meta><journal-id journal-id-type="publisher-id">OALibJ</journal-id><journal-title-group><journal-title>Open Access Library Journal</journal-title></journal-title-group><issn pub-type="epub">2333-9705</issn><publisher><publisher-name>Scientific Research Publishing</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.4236/oalib.1104775</article-id><article-id pub-id-type="publisher-id">OALibJ-86647</article-id><article-categories><subj-group subj-group-type="heading"><subject>Articles</subject></subj-group><subj-group subj-group-type="Discipline-v2"><subject>Biomedical&amp;Life Sciences</subject><subject> Business&amp;Economics</subject><subject> Chemistry&amp;Materials Science</subject><subject> Computer Science&amp;Communications</subject><subject> Earth&amp;Environmental Sciences</subject><subject> Engineering</subject><subject> Medicine&amp;Healthcare</subject><subject> Physics&amp;Mathematics</subject><subject> Social Sciences&amp;Humanities</subject></subj-group></article-categories><title-group><article-title>
 
 
  Compact-Open and Point Wise Convergence Topologies
 
</article-title></title-group><contrib-group><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>Mohammed</surname><given-names>Nokhas Murad Kaki</given-names></name><xref ref-type="aff" rid="aff1"><sub>1</sub></xref></contrib></contrib-group><aff id="aff1"><label>1</label><addr-line>Department of Mathematics, College of Science, University of Sulaimani, Sulaimani, Iraq</addr-line></aff><author-notes><corresp id="cor1">* E-mail:</corresp></author-notes><pub-date pub-type="epub"><day>03</day><month>08</month><year>2018</year></pub-date><volume>05</volume><issue>08</issue><fpage>1</fpage><lpage>5</lpage><history><date date-type="received"><day>13,</day>	<month>July</month>	<year>2018</year></date><date date-type="rev-recd"><day>11,</day>	<month>August</month>	<year>2018</year>	</date><date date-type="accepted"><day>14,</day>	<month>August</month>	<year>2018</year></date></history><permissions><copyright-statement>&#169; Copyright  2014 by authors and Scientific Research Publishing Inc. </copyright-statement><copyright-year>2014</copyright-year><license><license-p>This work is licensed under the Creative Commons Attribution International License (CC BY). http://creativecommons.org/licenses/by/4.0/</license-p></license></permissions><abstract><p>
 
 
  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 defini-tions is studied. Finally, we have introduced a number of very important topo-logical concepts and shown that every compact-open convergence transitive map implies point wise transitive maps but the converse not necessarily true.
 
</p></abstract><kwd-group><kwd>Compact-Open Topology</kwd><kwd> Transitive Set</kwd><kwd> Chaotic Sets</kwd><kwd> Point Wise Convergence Mixing</kwd></kwd-group></article-meta></front><body><sec id="s1"><title>1. Introduction</title><p>Let ( X , τ ) and ( Y , σ ) be two topological spaces and C ( X , Y ) be the set of all continuous maps from X into Y. Consider all possible sets of maps of the form</p><p>[ K , U ] = { f ∈ C ( X , Y ) : f ( K ) ⊂ U } ,</p><p>where K is a compact set in X and U an open set in Y. The topology τ 3 generated by these sets [ K , U ] as a subbase is called the compact-open topology on C ( X , Y ) . Note that any open set in τ 3 is called co-open set and ( C ( X , Y ) , τ 3 ) 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 C ( X , Y ) , 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.</p></sec><sec id="s2"><title>2. New Theorems of Point Wise-Convergence Topology</title><p>Definition 2.1. Consider in C ( X , Y ) the sets</p><p>{ x i , U i } i 1 k = { f ∈ C ( X , Y ) : f ( x i ) ∈ U i , i = 1 , ⋯ , k }</p><p>where x 1 , ⋯ , x k ∈ X , U 1 , ⋯ , U k are open sets in Y.</p><p>The topology τ 2 generated by these sets in their capacity as a subset is called the topology of point-wise convergence on C ( X , Y ) .</p><p>Note that any open set in τ 2 is called pc-open set and ( C ( X , Y ) , τ 2 ) is called pc-topological space. The compliment of pc-open set is called pc-closed set.</p><p>Definition 2.2. A function F : C ( X , Y ) → C ( X , Y ) is called pc-irresolute if the inverse image of each pc-open set is a pc-open set in C ( X , Y ) .</p><p>Definition 2.3. A map F : C ( X , Y ) → C ( X , Y ) is pcr-homeomorphism if it is bijective and thus invertible and both F and F − 1 are pc-irresolute.</p><p>The systems F : C ( X , X ) → C ( X , X ) and G : C ( Y , Y ) → C ( Y , Y ) are topologically pcr-conjugate if there is a pcr-homeomorphism H : C ( X , X ) → C ( Y , Y ) such that H ∘ F = G ∘ H .</p><p>Let ( C ( X , Y ) , τ 2 ) be a pc-topological space. The intersection of all pc-closed sets of ( C ( X , Y ) , τ 2 ) containing A is called the pc-closure of A and is denoted by C l p c ( A ) .</p><p>Definition 2.4. Let ( C ( X , Y ) , τ 2 ) be a point wise convergence-topological space, and F : C ( X , Y ) → C ( X , Y ) be a map. The map F is said to have pc-dense orbit if there exists f ∈ C ( X , Y ) such that C l p c ( O F ( f ) ) = C ( X , Y ) .</p><p>Definition 2.5. Let ( C ( X , Y ) , τ 2 ) be a pc-topological space, and F : C ( X , Y ) → C ( X , Y ) 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 ( C ( X , Y ) , τ 2 ) there is a positive integer n such that F n ( U ) ∩ V ≠ ϕ .</p><p>Definition 2.6. Let ( C ( X , Y ) , τ 2 ) be a point wise convergence-topological space, and F : C ( X , Y ) → C ( X , Y ) be a pc-irresolute then the set A ⊆ C ( X , Y ) is called pc-type transitive set if for every pair of non-empty pc-open sets U and V in C ( X , Y ) with A ∩ U ≠ ϕ and A ∩ V ≠ ϕ there is a positive integer n such that F n ( U ) ∩ V ≠ ϕ .</p><p>Definition 2.7. 1) Let ( C ( X , Y ) , τ 1 ) be a point-wise convergence-topological space, and F : C ( X , Y ) → C ( X , Y ) be a pc-irresolute then the set A ⊆ C ( X , Y ) is called is called topologically pc-mixing set if, given any nonempty pc-open subsets U , V ⊆ C ( X , Y ) with A ∩ U ≠ ϕ and A ∩ V ≠ ϕ then ∃ N &gt; 0 such that F n ( U ) ∩ V ≠ ϕ for all n &gt; N .</p><p>2) The set A ⊆ C ( X , Y ) is called a weakly pc-mixing set of ( C ( X , Y ) , F ) if for any choice of nonempty pc-open subsets V 1 , V 2 of A and nonempty pc-open subsets U 1 , U 2 of C ( X , Y ) with A ∩ U 1 ≠ ϕ and A ∩ U 2 ≠ ϕ there exists n ∈ N such that F n ( V 1 ) ∩ U 1 ≠ ϕ and F n ( V 1 ) ∩ U 2 ≠ ϕ .</p><p>3) The set A ⊆ C ( X , Y ) is strongly pc-mixing if for any pair of pc-open sets U and V with U ∩ A ≠ ϕ and V ∩ A ≠ ϕ , there exist some n ∈ N such that F k ( U ) ∩ V ≠ ϕ for any k ≥ n .</p><p>4) Any element f ∈ C ( X , Y ) such that its orbit O F ( f ) is pc-dense in X. is called hypercyclic element.</p><p>5) A system ( C ( X , Y ) , F ) is said to be topologically pc-mixing if, given pc-open sets U and V in C ( X , Y ) , there exists an integer N, such that, for all n &gt; N , one has F n ( U ) ∩ V ≠ ϕ .</p><p>6) A system ( C ( X , Y ) , F ) is called topologically pc-mixing if for any non-empty pc-open set U, there exists n ∈ N such that ∪ n ≥ N F n ( U ) is pc-dense in C ( X , Y ) .</p></sec><sec id="s3"><title>3. Definitions and Theorems of Compact-Open Topology</title><p>The following definition supplies another version of a topology on the set C ( X , Y ) .</p><p>Definition 3.1. Consider all possible sets of maps of the form [<xref ref-type="bibr" rid="scirp.86647-ref1">1</xref>]</p><p>[ K , U ] = { f ∈ C ( X , Y ) : f ( K ) ⊂ U }</p><p>where K is a compact set in X and U an open set in Y. The topology τ 3 generated by these sets [ K , U ] as a subbase is called the compact-open topology on C ( X , Y ) .</p><p>Note that any open set in τ 3 is called co-open set and ( C ( X , Y ) , τ 3 ) is called co-topological space. The compliment of co-open set is called co-closed set.</p><p>Definition 3.2. Let ( C ( X , Y ) , τ 3 ) be a co-topological space. The map F : C ( X , Y ) → C ( X , Y ) is called co-irresolute if for every subset A ∈ τ 3 , F − 1 ( A ) ∈ τ 3 . or, equivalently, F is co-irresolute if and only if for every co-closed set A, F − 1 ( A ) is co-closed set.</p><p>Definition 3.3. A map F : C ( X , Y ) → C ( X , Y ) is cor-homeomorphism if it is bijective and thus invertible and both F and F − 1 are co-irresolute.</p><p>The systems F : C ( X , X ) → C ( X , X ) and G : C ( Y , Y ) → C ( Y , Y ) are topologically cor-conjugate if there is a cor-homeomorphism H : C ( X , X ) → C ( Y , Y ) such that H ∘ F = G ∘ H .</p><p>Let ( C ( X , Y ) , τ 3 ) be a co-topological space. The intersection of all co-closed sets of ( C ( X , Y ) , τ 3 ) containing A is called the co-closure of A and is denoted by C l c o ( A ) .</p><p>Definition 3.4. Let ( C ( X , Y ) , τ 3 ) be a compact-open topological space, and F : C ( X , Y ) → C ( X , Y ) be a map. The map F is said to have co-dense orbit if there exists f ∈ C ( X , Y ) such that C l c o ( O F ( f ) ) = C ( X , Y ) .</p><p>Definition 3.5. Let ( C ( X , Y ) , τ 3 ) be a co-topological space, and F : C ( X , Y ) → C ( X , Y ) 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 ( C ( X , Y ) , τ 3 ) there is a positive integer n such that F n ( U ) ∩ V is not empty.</p><p>Definition 3.6. Let ( C ( X , Y ) , τ 3 ) be a co-topological space, and F : C ( X , Y ) → C ( X , Y ) be a co-irresolute then the set A ⊆ C ( X , Y ) is called co-type transitive set if for every pair of non-empty co-open sets U and V in C ( X , Y ) with A ∩ U ≠ ϕ and A ∩ V ≠ ϕ there is a positive integer n such that F n ( U ) ∩ V ≠ ϕ .</p><p>Definition 3.7. 1) Let ( C ( X , Y ) , τ 3 ) be a co-topological space, and F : C ( X , Y ) → C ( X , Y ) be a co-irresolute then the set A ⊆ C ( X , Y ) is called is called topologically co-mixing set if, given any nonempty co-open subsets U , V ⊆ C ( X , Y ) with A ∩ U ≠ ϕ and A ∩ V ≠ ϕ then ∃ N &gt; 0 such that F n ( U ) ∩ V ≠ ϕ for all n &gt; N .</p><p>2) The set A ⊆ C ( X , Y ) is called a weakly co-mixing set of ( C ( X , Y ) , F ) if for any choice of nonempty co-open subsets V 1 , V 2 of A and nonempty co-open subsets U 1 , U 2 of C ( X , Y ) with A ∩ U 1 ≠ ϕ and A ∩ U 2 ≠ ϕ there exists n ∈ N such that F n ( V 1 ) ∩ U 1 ≠ ϕ and F n ( V 1 ) ∩ U 2 ≠ ϕ .</p><p>3) The set A ⊆ C ( X , Y ) is strongly co-mixing if for any pair of co-open sets U and V with U ∩ A ≠ ϕ and V ∩ A ≠ ϕ , there exist some n ∈ N such that F k ( U ) ∩ V ≠ ϕ for any k ≥ n .</p><p>4) A system ( C ( X , Y ) , F ) is said to be topologically co-mixing if, given co-open sets U and V in C ( X , Y ) , there exists an integer N, such that, for all n &gt; N , one has F n ( U ) ∩ V ≠ ϕ . For related works about weakly mixing see [<xref ref-type="bibr" rid="scirp.86647-ref2">2</xref>] , [<xref ref-type="bibr" rid="scirp.86647-ref3">3</xref>] and [<xref ref-type="bibr" rid="scirp.86647-ref4">4</xref>] .</p></sec><sec id="s4"><title>4. Conclusions</title><p>We have the following results:</p><p>1) Every compact-open-transitive set implies point wise convergence set but not conversely.</p><p>2) Every compact-open-mixing system implies point wise convergence system but not conversely.</p><p>3) Every strongly compact-open-mixing set implies strongly point wise convergence mixing set.</p></sec><sec id="s5"><title>Acknowledgements</title><p>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.</p></sec><sec id="s6"><title>Conflicts of Interest</title><p>The author declares no conflicts of interest regarding the publication of this paper.</p></sec><sec id="s7"><title>Cite this paper</title><p>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</p></sec></body><back><ref-list><title>References</title><ref id="scirp.86647-ref1"><label>1</label><mixed-citation publication-type="other" xlink:type="simple">Borsovich, Y.U., Blizntakov, N., Izrailevich, Y.A. and Fomenko, T. (1985) Introduction to Topology. Mir Publisher, Mos-cow.</mixed-citation></ref><ref id="scirp.86647-ref2"><label>2</label><mixed-citation publication-type="other" xlink:type="simple">Chacon, R.V. (1969) Weakly Mixing Transformations Which Are Not Strongly Mixing. 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