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 *

144 related articles for article (PubMed ID: 25375574)

  • 1. Controlling cluster synchronization by adapting the topology.
    Lehnert J; Hövel P; Selivanov A; Fradkov A; Schöll E
    Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Oct; 90(4):042914. PubMed ID: 25375574
    [TBL] [Abstract][Full Text] [Related]  

  • 2. Adaptive synchronization in delay-coupled networks of Stuart-Landau oscillators.
    Selivanov AA; Lehnert J; Dahms T; Hövel P; Fradkov AL; Schöll E
    Phys Rev E Stat Nonlin Soft Matter Phys; 2012 Jan; 85(1 Pt 2):016201. PubMed ID: 22400637
    [TBL] [Abstract][Full Text] [Related]  

  • 3. Controlling synchrony by delay coupling in networks: from in-phase to splay and cluster states.
    Choe CU; Dahms T; Hövel P; Schöll E
    Phys Rev E Stat Nonlin Soft Matter Phys; 2010 Feb; 81(2 Pt 2):025205. PubMed ID: 20365621
    [TBL] [Abstract][Full Text] [Related]  

  • 4. Clustering in delay-coupled smooth and relaxational chemical oscillators.
    Blaha K; Lehnert J; Keane A; Dahms T; Hövel P; Schöll E; Hudson JL
    Phys Rev E Stat Nonlin Soft Matter Phys; 2013 Dec; 88(6):062915. PubMed ID: 24483539
    [TBL] [Abstract][Full Text] [Related]  

  • 5. Cluster synchronization in networks of coupled nonidentical dynamical systems.
    Lu W; Liu B; Chen T
    Chaos; 2010 Mar; 20(1):013120. PubMed ID: 20370275
    [TBL] [Abstract][Full Text] [Related]  

  • 6. Synchronization patterns: from network motifs to hierarchical networks.
    Krishnagopal S; Lehnert J; Poel W; Zakharova A; Schöll E
    Philos Trans A Math Phys Eng Sci; 2017 Mar; 375(2088):. PubMed ID: 28115613
    [TBL] [Abstract][Full Text] [Related]  

  • 7. Synchronization of delay-coupled nonlinear oscillators: an approach based on the stability analysis of synchronized equilibria.
    Michiels W; Nijmeijer H
    Chaos; 2009 Sep; 19(3):033110. PubMed ID: 19791990
    [TBL] [Abstract][Full Text] [Related]  

  • 8. Partial synchronization and partial amplitude death in mesoscale network motifs.
    Poel W; Zakharova A; Schöll E
    Phys Rev E Stat Nonlin Soft Matter Phys; 2015 Feb; 91(2):022915. PubMed ID: 25768577
    [TBL] [Abstract][Full Text] [Related]  

  • 9. Controlling the onset of Hopf bifurcation in the Hodgkin-Huxley model.
    Xie Y; Chen L; Kang YM; Aihara K
    Phys Rev E Stat Nonlin Soft Matter Phys; 2008 Jun; 77(6 Pt 1):061921. PubMed ID: 18643314
    [TBL] [Abstract][Full Text] [Related]  

  • 10. Transition from phase to generalized synchronization in time-delay systems.
    Senthilkumar DV; Lakshmanan M; Kurths J
    Chaos; 2008 Jun; 18(2):023118. PubMed ID: 18601485
    [TBL] [Abstract][Full Text] [Related]  

  • 11. Delayed feedback control of three diffusively coupled Stuart-Landau oscillators: a case study in equivariant Hopf bifurcation.
    Schneider I
    Philos Trans A Math Phys Eng Sci; 2013 Sep; 371(1999):20120472. PubMed ID: 23960230
    [TBL] [Abstract][Full Text] [Related]  

  • 12. Synchronization of phase oscillators with frequency-weighted coupling.
    Xu C; Sun Y; Gao J; Qiu T; Zheng Z; Guan S
    Sci Rep; 2016 Feb; 6():21926. PubMed ID: 26903110
    [TBL] [Abstract][Full Text] [Related]  

  • 13. Robust control for a biaxial servo with time delay system based on adaptive tuning technique.
    Chen TC; Yu CH
    ISA Trans; 2009 Jul; 48(3):283-94. PubMed ID: 19345940
    [TBL] [Abstract][Full Text] [Related]  

  • 14. Cluster synchronization in oscillatory networks.
    Belykh VN; Osipov GV; Petrov VS; Suykens JA; Vandewalle J
    Chaos; 2008 Sep; 18(3):037106. PubMed ID: 19045480
    [TBL] [Abstract][Full Text] [Related]  

  • 15. Bifurcation analysis of multistability of synchronous states in the system of two delay-coupled oscillators.
    Adilova AB; Balakin MI; Gerasimova SA; Ryskin NM
    Chaos; 2021 Nov; 31(11):113103. PubMed ID: 34881617
    [TBL] [Abstract][Full Text] [Related]  

  • 16. Complete characterization of the stability of cluster synchronization in complex dynamical networks.
    Sorrentino F; Pecora LM; Hagerstrom AM; Murphy TE; Roy R
    Sci Adv; 2016 Apr; 2(4):e1501737. PubMed ID: 27152349
    [TBL] [Abstract][Full Text] [Related]  

  • 17. Assortative and modular networks are shaped by adaptive synchronization processes.
    Avalos-Gaytán V; Almendral JA; Papo D; Schaeffer SE; Boccaletti S
    Phys Rev E Stat Nonlin Soft Matter Phys; 2012 Jul; 86(1 Pt 2):015101. PubMed ID: 23005481
    [TBL] [Abstract][Full Text] [Related]  

  • 18. Onset of chaotic phase synchronization in complex networks of coupled heterogeneous oscillators.
    Ricci F; Tonelli R; Huang L; Lai YC
    Phys Rev E Stat Nonlin Soft Matter Phys; 2012 Aug; 86(2 Pt 2):027201. PubMed ID: 23005889
    [TBL] [Abstract][Full Text] [Related]  

  • 19. Clustering in globally coupled oscillators near a Hopf bifurcation: theory and experiments.
    Kori H; Kuramoto Y; Jain S; Kiss IZ; Hudson JL
    Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Jun; 89(6):062906. PubMed ID: 25019850
    [TBL] [Abstract][Full Text] [Related]  

  • 20. Generic behavior of master-stability functions in coupled nonlinear dynamical systems.
    Huang L; Chen Q; Lai YC; Pecora LM
    Phys Rev E Stat Nonlin Soft Matter Phys; 2009 Sep; 80(3 Pt 2):036204. PubMed ID: 19905197
    [TBL] [Abstract][Full Text] [Related]  

    [Next]    [New Search]
    of 8.