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Your query: Keywords = "periodic point"

  1. 1.Interior periodic points of a Lotka–Volterra map

    TitleInterior periodic points of a Lotka–Volterra map
    Par.titleVnútorné periodické body Lotkovho Volterrovho zobrazenia
    Author infoPeter Maličký
    Author Maličký Peter 1956- (100%) UMBFP10 - Katedra matematiky
    Source document Journal of Difference Equations and Applications. Vol. 18, no. 4 (2012), pp. 553-567. - Abingdon : Taylor & Francis Group, 2012
    Keywords periodické body   Jacobiho matica - Jacobian matrix   sedlový pevný bod   itinerár   Brouwerova veta   periodic point   saddle fixed point   itinerary   Brouwer theorem  
    LanguageEnglish
    CountryGreat Britian
    systematics 514
    AnnotationPre rovinný trojuholník s vrcholmi [0,0], [4,0] a [0,4] skúmame transformáciu F, ktorá zobrazuje bod[x,y] do bodu [xy,x(4-x-y)]. Dokazujeme existenciu vnútorných periodických bodov s periódou n väčšou než 3. Jedna periodická orbita s periódou 6 je vyjadrená explicitne. Dokazujeme tiež, že pre každý dolný sedlový periodický bod existuje vnútorný periodický bod s tým istým itinerárom (vzhľadom na rozklad daný zvislou strednou priečkou). For the plain triangle with vertices [0,0], [4,0] and [0,4] we consider transform F, which maps the point [x,y] to point [xy,x(4-x-y)]. We prove the existence of interior periodic points of periods n greater than 3. One of the periodic orbits of period 6 is given explicitly. We also prove that for any lower periodic saddle point, there is an interior periodic point with the same itinerary (with respect to the natural decomposition of D given by the vertical middle line)
    Public work category ADC
    No. of Archival Copy23322
    Repercussion category MUKHAMEDOV, Farrukh - ABDUGANIEV, A. On pure quasi-quantum quadratic operators of M-2(C). In Open systems & information dynamics. ISSN 1230-1612, 2013, vol. 20, no. 4, article no. 1350018.
    BEL'MESOVA, S. S. - EFREMOVA, L. S. On the concept of integrability for discrete dynamical systems. Investigation of wandering points of some trace map. In Springer proceedings in mathematics and statistics : 4th international workshop on nonlinear maps and their applications, NOMA 2013, Zaragoza, 3rd September - 4th September 2013. New York : Springer, 2015. ISBN 978-331912327-1, pp. 127-158.
    BALIBREA, Francisco. Some problems connected with the thue-morse and Fibonacci sequences. In Advances in dynamical systems and control. ISSN 2198-4182, 2016, vol. 69, pp. 273-293.
    Catal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Databasexpca - PUBLIKAČNÁ ČINNOSŤ
    ReferencesPERIODIKÁ-Súborný záznam periodika
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  2. 2.On number of interior periodic points of a Lotka-Voltera map

    TitleOn number of interior periodic points of a Lotka-Voltera map
    Author infoPeter Maličký
    Author Maličký Peter 1956- (100%) UMBFP10 - Katedra matematiky
    Source document Acta Universitatis Matthiae Belii : series Mathematics : special issue dedicated to the 75th birthday of Professor Beloslav Riečan, No. 19 (2011). S. 21-30. - Banská Bystrica : Ústav vedy a výskumu Univerzity Mateja Bela v Banskej Bystrici, 2011 / Haviar Miroslav 1965-
    NoteBibl.: s. 30
    Keywords periodic point   Jacobiho matica - Jacobian matrix   saddle fixed point   itinerary   Brouwer theorem  
    LanguageEnglish
    CountrySlovak Republic
    systematics 51
    AnnotationRes. angl.
    Public work category AED
    No. of Archival Copy20700
    Repercussion category BALIBREA, Francisco. Some problems connected with the thue-morse and Fibonacci sequences. In Advances in dynamical systems and control. ISSN 2198-4182, 2016, vol. 69, pp. 273-293.
    Catal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Databasexpca - PUBLIKAČNÁ ČINNOSŤ
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  3. 3.Dynamics of a Map of a Triangle and Some Open Problem in Theory of Numbers

    TitleDynamics of a Map of a Triangle and Some Open Problem in Theory of Numbers
    Par.titleDynamika jedného zobrazenia trojuholníka a niektoré otvorené problémy teórie čísel
    Author infoPeter Maličký
    Author Maličký Peter 1956- (100%) UMBFP10 - Katedra matematiky
    Source document 11. Konferencia košických matematikov. S. 8-9. - Košice : Technická univerzita , Fakulta elektrotechniky a informatiky, 2010
    Keywords periodické body   Artinova hypotéza   Wieferichovo prvočíslo   prvočíslo Sophie Germainovej   periodic point   Artin conjecture   Wieferich prime   Sophie Germain prime  
    LanguageEnglish
    CountrySlovak Republic
    systematics 511
    AnnotationPre Lotkovo Volterrovo zobrazenie, ktoré zobrazuje na seba trojuholník s vrcholmi (0,0), (4,0) a (0,4) a je definované predpisom F(x,y)=(x(4-x-y),xy), bol dlho otvorený problém vnútorných periodických bodov. Doteraz bol známy iba pevný bod (1,2) a jedna vnútorná periodická orbita s periodou 4. V riešení tohto problému sme urobili podstatný pokrok. Objavili sme hlboký vzťah medzi periodickými bodmi na spodnej strane a vnútornými periodickými bodmi. Zistili sme tiež, že spomínaný problém súvisí s otvorenými problémami teórie čísiel (Artinova hypotéza, Wieferichove prvočísla a prvočísla Sophie Germainovej). For the Lotka-Volterra map, which is defined by F(x,y)=(x(4-x-y),xy) and maps the triangle with vertices (0,0), (4,0) a (0,4) onto itself, the problem of interior periodic ponts was open for a long time. Till now it was known only the fixed point (1,2) and an interior periodic point with period 4. We have made an essential progress in the solution of this problem. We have discovered a deep relation between periodic points on the lower side and interior periodic points. We have also found that the above problem is concerned with some open problems in number theory (the Artin conjecture, Wieferich primes and Sophie Germain primes)
    Public work category AFH
    No. of Archival Copy16932
    Catal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Databasexpca - PUBLIKAČNÁ ČINNOSŤ
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  4. 4.Periodic Solutions of the Lotka-Volterra System of Difference Equations

    TitlePeriodic Solutions of the Lotka-Volterra System of Difference Equations
    Par.titlePeriodické riešenia Lotkovho Volterovho systému diferenčných rovníc
    Author infoPeter Maličký
    Author Maličký Peter 1956- (100%) UMBFP10 - Katedra matematiky
    Source document CDDEA 2010 : abstracts : conference on Differential and difference equations and applications : June 21-25, 2010, Rajecké Teplice. S. 28. - Žilina : University of Žilina, Faculty of Science, 2010 / Diblík J. ; Kúdelčíková M. ; Růžičková M.
    Keywords periodické riešenie   periodické body   Artinova hypotéza   Wieferichovo prvočíslo   prvočíslo Sophie Germainovej   periodic solution   periodic point   Artin conjecture   Wieferich prime   Sophie Germain prime  
    LanguageEnglish
    CountrySlovak Republic
    systematics 51
    AnnotationPre Lotkovo Volterrovo zobrazenie, ktoré zobrazuje na seba trojuholník s vrcholmi (0,0), (4,0) a (0,4) a je definované predpisom F(x,y)=(x(4-x-y),xy), bol dlho otvorený problém vnútorných periodických bodov. Doteraz bol známy iba pevný bod (1,2) a jedna vnútorná periodická orbita s periodou 4. V riešení tohto problému sme urobili podstatný pokrok. Objavili sme hlboký vzťah medzi periodickými bodmi na spodnej strane a vnútornými periodickými bodmi. Zistili sme tiež, že spomínaný problém súvisí s otvorenými problémami teórie čísiel (Artinova hypotéza, Wieferichove prvočísla a prvočísla Sophie Germainovej). For the Lotka-Volterra map, which is defined by F(x,y)=(x(4-x-y),xy) and maps the triangle with vertices (0,0), (4,0) a (0,4) onto itself, the problem of interior periodic ponts was open for a long time. Till now it was known only the fixed point (1,2) and an interior periodic point with period 4. We have made an essential progress in the solution of this problem. We have discovered a deep relation between periodic points on the lower side and interior periodic points. We have also found that the above problem is concerned with some open problems in number theory (the Artin conjecture, Wieferich primes and Sophie Germain primes)
    Public work category AFH
    No. of Archival Copy16931
    Catal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Databasexpca - PUBLIKAČNÁ ČINNOSŤ
    unrecognised

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  5. 5.Periodic points of the Lotka-Volterra Map and Some Open Problem in Theory of Numbers

    TitlePeriodic points of the Lotka-Volterra Map and Some Open Problem in Theory of Numbers
    Par.titlePeriodické body Lotkovho Volterrovho zobrazenia a niektoré otvorené problémy teórie čísel
    Author infoPeter Maličký
    Author Maličký Peter 1956- (100%) UMBFP10 - Katedra matematiky
    Source document AMSE 2010 : 13th International Conference Applications of Mathematics and Statistics in Economy, August 26 - 29, 2010, Demänovská dolina : book of abstracts. S. 25. - Banská Bystrica : Univerzita Mateja Bela, Ekonomická fakulta, 2010 / Kráľ Pavol 1978- ; Laco Peter 1975- ; Zimka Rudolf 1943- ; AMSE 2010 International Conference Applications of Mathematics and Statistics in Economy
    Keywords periodické body   Artinova hypotéza   Wieferichovo prvoeíslo   prvočíslo Sophie Germainovej   periodic point   Artin conjecture   Wieferich prime   Sophie Germain prime  
    LanguageEnglish
    CountrySlovak Republic
    systematics 511
    AnnotationPre Lotkovo Volterrovo zobrazenie, ktoré zobrazuje na seba trojuholník s vrcholmi (0,0), (4,0) a (0,4) a je definované predpisom F(x,y)=(x(4-x-y),xy), bol dlho otvorený problém vnútorných periodických bodov. Doteraz bol známy iba pevný bod (1,2) a jedna vnútorná periodická orbita s periodou 4. V riešení tohto problému sme urobili podstatný pokrok. Objavili sme hlboký vzťah medzi periodickými bodmi na spodnej strane a vnútornými periodickými bodmi. Zistili sme tiež, že spomínaný problém súvisí s otvorenými problémami teórie čísiel (Artinova hypotéza, Wieferichove prvočísla a prvočísla Sophie Germainovej). For the Lotka-Volterra map, which is defined by F(x,y)=(x(4-x-y),xy) and maps the triangle with vertices (0,0), (4,0) a (0,4) onto itself, the problem of interior periodic ponts was open for a long time. Till now it was known only the fixed point (1,2) and an interior periodic point with period 4. We have made an essential progress in the solution of this problem. We have discovered a deep relation between periodic points on the lower side and interior periodic points. We have also found that the above problem is concerned with some open problems in number theory (the Artin conjecture, Wieferich primes and Sophie Germain primes)
    Public work category AFH
    No. of Archival Copy16588
    Catal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Databasexpca - PUBLIKAČNÁ ČINNOSŤ
    unrecognised

    unrecognised

      To the basket"


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