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 *

145 related articles for article (PubMed ID: 31330591)

  • 41. Propagation through heterogeneous substrates in simple excitable media models.
    Bub G; Shrier A
    Chaos; 2002 Sep; 12(3):747-753. PubMed ID: 12779603
    [TBL] [Abstract][Full Text] [Related]  

  • 42. Dynamics of FitzHugh-Nagumo excitable systems with delayed coupling.
    Burić N; Todorović D
    Phys Rev E Stat Nonlin Soft Matter Phys; 2003 Jun; 67(6 Pt 2):066222. PubMed ID: 16241341
    [TBL] [Abstract][Full Text] [Related]  

  • 43. Noise-controlled oscillations and their bifurcations in coupled phase oscillators.
    Zaks MA; Neiman AB; Feistel S; Schimansky-Geier L
    Phys Rev E Stat Nonlin Soft Matter Phys; 2003 Dec; 68(6 Pt 2):066206. PubMed ID: 14754296
    [TBL] [Abstract][Full Text] [Related]  

  • 44. Stability of convective patterns in reaction fronts: a comparison of three models.
    Vasquez DA; Coroian DI
    Chaos; 2010 Sep; 20(3):033109. PubMed ID: 20887049
    [TBL] [Abstract][Full Text] [Related]  

  • 45. Noise-induced excitability in oscillatory media.
    Ullner E; Zaikin A; García-Ojalvo J; Kurths J
    Phys Rev Lett; 2003 Oct; 91(18):180601. PubMed ID: 14611273
    [TBL] [Abstract][Full Text] [Related]  

  • 46. Analyzing critical propagation in a reaction-diffusion-advection model using unstable slow waves.
    Kneer F; Obermayer K; Dahlem MA
    Eur Phys J E Soft Matter; 2015 Feb; 38(2):95. PubMed ID: 25704900
    [TBL] [Abstract][Full Text] [Related]  

  • 47. Bifurcation analysis of solitary and synchronized pulses and formation of reentrant waves in laterally coupled excitable fibers.
    Yanagita T; Suetani H; Aihara K
    Phys Rev E Stat Nonlin Soft Matter Phys; 2008 Nov; 78(5 Pt 2):056208. PubMed ID: 19113201
    [TBL] [Abstract][Full Text] [Related]  

  • 48. Experimental study of firing death in a network of chaotic FitzHugh-Nagumo neurons.
    Ciszak M; Euzzor S; Arecchi FT; Meucci R
    Phys Rev E Stat Nonlin Soft Matter Phys; 2013 Feb; 87(2):022919. PubMed ID: 23496603
    [TBL] [Abstract][Full Text] [Related]  

  • 49. Front and pulse solutions for a system of reaction-diffusion equations with degenerate source terms.
    Bradshaw-Hajek BH; Wylie JJ
    Phys Rev E; 2019 Feb; 99(2-1):022214. PubMed ID: 30934314
    [TBL] [Abstract][Full Text] [Related]  

  • 50. Diffusion-induced oscillations of extended defects.
    Korzhenevskii AL; Bausch R; Schmitz R
    Phys Rev Lett; 2012 Jan; 108(4):046101. PubMed ID: 22400867
    [TBL] [Abstract][Full Text] [Related]  

  • 51. Kinematic reduction of reaction-diffusion fronts with multiplicative noise: derivation of stochastic sharp-interface equations.
    Rocco A; Ramírez-Piscina L; Casademunt J
    Phys Rev E Stat Nonlin Soft Matter Phys; 2002 May; 65(5 Pt 2):056116. PubMed ID: 12059656
    [TBL] [Abstract][Full Text] [Related]  

  • 52. [Traveling waves in a piecewise-linear reaction-diffusion model of excitable medium].
    Zemskov EP; Loskutov AIu
    Biofizika; 2009; 54(5):908-15. PubMed ID: 19894633
    [TBL] [Abstract][Full Text] [Related]  

  • 53. Design of external forces for eliminating traveling wave in a piecewise linear FitzHugh-Nagumo model.
    Konishi K; Takeuchi M; Shimizu T
    Chaos; 2011 Jun; 21(2):023101. PubMed ID: 21721743
    [TBL] [Abstract][Full Text] [Related]  

  • 54. Spontaneous traveling waves in oscillatory systems with cross diffusion.
    Biktashev VN; Tsyganov MA
    Phys Rev E Stat Nonlin Soft Matter Phys; 2009 Nov; 80(5 Pt 2):056111. PubMed ID: 20365047
    [TBL] [Abstract][Full Text] [Related]  

  • 55. Front propagation in hyperbolic fractional reaction-diffusion equations.
    Méndez V; Ortega-Cejas V
    Phys Rev E Stat Nonlin Soft Matter Phys; 2005 May; 71(5 Pt 2):057105. PubMed ID: 16089698
    [TBL] [Abstract][Full Text] [Related]  

  • 56. Formation of localized structures in bistable systems through nonlocal spatial coupling. I. General framework.
    Colet P; Matías MA; Gelens L; Gomila D
    Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Jan; 89(1):012914. PubMed ID: 24580304
    [TBL] [Abstract][Full Text] [Related]  

  • 57. Rotating wave solutions of the FitzHugh-Nagumo equations.
    Alford JG; Auchmuty G
    J Math Biol; 2006 Nov; 53(5):797-819. PubMed ID: 16906432
    [TBL] [Abstract][Full Text] [Related]  

  • 58. Longitudinal nonlinear wave propagation through soft tissue.
    Valdez M; Balachandran B
    J Mech Behav Biomed Mater; 2013 Apr; 20():192-208. PubMed ID: 23510921
    [TBL] [Abstract][Full Text] [Related]  

  • 59. Noise-enhanced excitability in bistable activator-inhibitor media.
    García-Ojalvo J; Sagués F; Sancho JM; Schimansky-Geier L
    Phys Rev E Stat Nonlin Soft Matter Phys; 2002 Jan; 65(1 Pt 1):011105. PubMed ID: 11800675
    [TBL] [Abstract][Full Text] [Related]  

  • 60. Spin echoes: full numerical solution and breakdown of approximative solutions.
    Ziener CH; Kampf T; Schlemmer HP; Buschle LR
    J Phys Condens Matter; 2019 Apr; 31(15):155101. PubMed ID: 30641507
    [TBL] [Abstract][Full Text] [Related]  

    [Previous]   [Next]    [New Search]
    of 8.