These tools will no longer be maintained as of December 31, 2024. Archived website can be found here. PubMed4Hh GitHub repository can be found here. Contact NLM Customer Service if you have questions.


BIOMARKERS

Molecular Biopsy of Human Tumors

- a resource for Precision Medicine *

106 related articles for article (PubMed ID: 9961765)

  • 1. Algebraic evaluation of linking numbers of unstable periodic orbits in chaotic attractors.
    Le Sceller L ; Letellier C; Gouesbet G
    Phys Rev E Stat Phys Plasmas Fluids Relat Interdiscip Topics; 1994 May; 49(5):4693-4695. PubMed ID: 9961765
    [No Abstract]   [Full Text] [Related]  

  • 2. Network analysis of chaotic systems through unstable periodic orbits.
    Kobayashi MU; Saiki Y
    Chaos; 2017 Aug; 27(8):081103. PubMed ID: 28863482
    [TBL] [Abstract][Full Text] [Related]  

  • 3. Reconstruction of chaotic saddles by classification of unstable periodic orbits: Kuramoto-Sivashinsky equation.
    Saiki Y; Yamada M; Chian AC; Miranda RA; Rempel EL
    Chaos; 2015 Oct; 25(10):103123. PubMed ID: 26520089
    [TBL] [Abstract][Full Text] [Related]  

  • 4. Construction of an associative memory using unstable periodic orbits of a chaotic attractor.
    Wagner C; Stucki JW
    J Theor Biol; 2002 Apr; 215(3):375-84. PubMed ID: 12054844
    [TBL] [Abstract][Full Text] [Related]  

  • 5. Manifold structures of unstable periodic orbits and the appearance of periodic windows in chaotic systems.
    Kobayashi MU; Saiki Y
    Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Feb; 89(2):022904. PubMed ID: 25353542
    [TBL] [Abstract][Full Text] [Related]  

  • 6. Attractor switching by neural control of chaotic neurodynamics.
    Pasemann F; Stollenwerk N
    Network; 1998 Nov; 9(4):549-61. PubMed ID: 10221579
    [TBL] [Abstract][Full Text] [Related]  

  • 7. Analysis of unstable periodic orbits and chaotic orbits in the one-dimensional linear piecewise-smooth discontinuous map.
    Rajpathak B; Pillai HK; Bandyopadhyay S
    Chaos; 2015 Oct; 25(10):103101. PubMed ID: 26520067
    [TBL] [Abstract][Full Text] [Related]  

  • 8. Unstable periodic orbits and the dimension of chaotic attractors.
    Grebogi C; Ott E; Yorke JA
    Phys Rev A Gen Phys; 1987 Oct; 36(7):3522-3524. PubMed ID: 9899288
    [No Abstract]   [Full Text] [Related]  

  • 9. Unstable periodic orbits and the dimensions of multifractal chaotic attractors.
    Grebogi C; Ott E; Yorke JA
    Phys Rev A Gen Phys; 1988 Mar; 37(5):1711-1724. PubMed ID: 9899850
    [No Abstract]   [Full Text] [Related]  

  • 10. Characterization of unstable periodic orbits in chaotic attractors and repellers.
    Biham O; Wenzel W
    Phys Rev Lett; 1989 Aug; 63(8):819-822. PubMed ID: 10041193
    [No Abstract]   [Full Text] [Related]  

  • 11. Unstable periodic orbits and the natural measure of nonhyperbolic chaotic saddles.
    Dhamala M; Lai YC
    Phys Rev E Stat Phys Plasmas Fluids Relat Interdiscip Topics; 1999 Nov; 60(5 Pt B):6176-9. PubMed ID: 11970527
    [TBL] [Abstract][Full Text] [Related]  

  • 12. Transition to intermittent chaotic synchronization.
    Zhao L; Lai YC; Shih CW
    Phys Rev E Stat Nonlin Soft Matter Phys; 2005 Sep; 72(3 Pt 2):036212. PubMed ID: 16241553
    [TBL] [Abstract][Full Text] [Related]  

  • 13. Time-averaged properties of unstable periodic orbits and chaotic orbits in ordinary differential equation systems.
    Saiki Y; Yamada M
    Phys Rev E Stat Nonlin Soft Matter Phys; 2009 Jan; 79(1 Pt 2):015201. PubMed ID: 19257096
    [TBL] [Abstract][Full Text] [Related]  

  • 14. PoincarĂ© recurrence and measure of hyperbolic and nonhyperbolic chaotic attractors.
    Baptista MS; Kraut S; Grebogi C
    Phys Rev Lett; 2005 Aug; 95(9):094101. PubMed ID: 16197217
    [TBL] [Abstract][Full Text] [Related]  

  • 15. Noise-induced unstable dimension variability and transition to chaos in random dynamical systems.
    Lai YC; Liu Z; Billings L; Schwartz IB
    Phys Rev E Stat Nonlin Soft Matter Phys; 2003 Feb; 67(2 Pt 2):026210. PubMed ID: 12636779
    [TBL] [Abstract][Full Text] [Related]  

  • 16. Comment on "Time-averaged properties of unstable periodic orbits and chaotic orbits in ordinary differential equation systems".
    Zaks MA; Goldobin DS
    Phys Rev E Stat Nonlin Soft Matter Phys; 2010 Jan; 81(1 Pt 2):018201; discussion 018202. PubMed ID: 20365510
    [TBL] [Abstract][Full Text] [Related]  

  • 17. Control of chaos via an unstable delayed feedback controller.
    Pyragas K
    Phys Rev Lett; 2001 Mar; 86(11):2265-8. PubMed ID: 11289905
    [TBL] [Abstract][Full Text] [Related]  

  • 18. Cycling chaotic attractors in two models for dynamics with invariant subspaces.
    Ashwin P; Rucklidge AM; Sturman R
    Chaos; 2004 Sep; 14(3):571-82. PubMed ID: 15446967
    [TBL] [Abstract][Full Text] [Related]  

  • 19. External feedback control of chaos using approximate periodic orbits.
    Yagasaki K; Kumagai M
    Phys Rev E Stat Nonlin Soft Matter Phys; 2002 Feb; 65(2 Pt 2):026204. PubMed ID: 11863629
    [TBL] [Abstract][Full Text] [Related]  

  • 20. Unstable periodic orbits and templates of the Rossler system: Toward a systematic topological characterization.
    Letellier C; Dutertre P; Maheu B
    Chaos; 1995 Mar; 5(1):271-282. PubMed ID: 12780181
    [TBL] [Abstract][Full Text] [Related]  

    [Next]    [New Search]
    of 6.