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 *

103 related articles for article (PubMed ID: 28679220)

  • 1. Erratum: "Prediction uncertainty and optimal experimental design for learning dynamical systems" [Chaos 26, 063110 (2016)].
    Letham B; Letham PA; Rudin C; Browne EP
    Chaos; 2017 Jun; 27(6):069901. PubMed ID: 28679220
    [No Abstract]   [Full Text] [Related]  

  • 2. Prediction uncertainty and optimal experimental design for learning dynamical systems.
    Letham B; Letham PA; Rudin C; Browne EP
    Chaos; 2016 Jun; 26(6):063110. PubMed ID: 27368775
    [TBL] [Abstract][Full Text] [Related]  

  • 3. Erratum: "On explaining the surprising success of reservoir computing forecaster of chaos? The universal machine learning dynamical system with contrasts to VAR and DMD" [Chaos 31(1), 013108 (2021)].
    Bollt E
    Chaos; 2021 Apr; 31(4):049904. PubMed ID: 34251245
    [No Abstract]   [Full Text] [Related]  

  • 4. Prediction of robust chaos in micro and nanoresonators under two-frequency excitation.
    Gusso A; Dantas WG; Ujevic S
    Chaos; 2019 Mar; 29(3):033112. PubMed ID: 30927846
    [TBL] [Abstract][Full Text] [Related]  

  • 5. Mechanisms of extensive spatiotemporal chaos in Rayleigh-Benard convection.
    Egolf DA; Melnikov IV; Pesch W; Ecke RE
    Nature; 2000 Apr; 404(6779):733-6. PubMed ID: 10783880
    [TBL] [Abstract][Full Text] [Related]  

  • 6. An Efficient Interval Type-2 Fuzzy CMAC for Chaos Time-Series Prediction and Synchronization.
    Lee CH; Chang FY; Lin CM
    IEEE Trans Cybern; 2014 Mar; 44(3):329-41. PubMed ID: 23757553
    [TBL] [Abstract][Full Text] [Related]  

  • 7. Optimal chaos control through reinforcement learning.
    Gadaleta S; Dangelmayr G
    Chaos; 1999 Sep; 9(3):775-788. PubMed ID: 12779873
    [TBL] [Abstract][Full Text] [Related]  

  • 8. Learning stochastic process-based models of dynamical systems from knowledge and data.
    Tanevski J; Todorovski L; Džeroski S
    BMC Syst Biol; 2016 Mar; 10():30. PubMed ID: 27005698
    [TBL] [Abstract][Full Text] [Related]  

  • 9. Bistable chaos without symmetry in generalized synchronization.
    Guan S; Lai CH; Wei GW
    Phys Rev E Stat Nonlin Soft Matter Phys; 2005 Mar; 71(3 Pt 2A):036209. PubMed ID: 15903548
    [TBL] [Abstract][Full Text] [Related]  

  • 10. Laser dynamical reservoir computing with consistency: an approach of a chaos mask signal.
    Nakayama J; Kanno K; Uchida A
    Opt Express; 2016 Apr; 24(8):8679-92. PubMed ID: 27137303
    [TBL] [Abstract][Full Text] [Related]  

  • 11. Inaccessibility in online learning of recurrent neural networks.
    Saito A; Taiji M; Ikegami T
    Phys Rev Lett; 2004 Oct; 93(16):168101. PubMed ID: 15525035
    [TBL] [Abstract][Full Text] [Related]  

  • 12. Controlling fast chaos in delay dynamical systems.
    Blakely JN; Illing L; Gauthier DJ
    Phys Rev Lett; 2004 May; 92(19):193901. PubMed ID: 15169402
    [TBL] [Abstract][Full Text] [Related]  

  • 13. [Dynamic paradigm in psychopathology: "chaos theory", from physics to psychiatry].
    Pezard L; Nandrino JL
    Encephale; 2001; 27(3):260-8. PubMed ID: 11488256
    [TBL] [Abstract][Full Text] [Related]  

  • 14. Chaos, patterns, coherent structures, and turbulence: Reflections on nonlinear science.
    Ecke RE
    Chaos; 2015 Sep; 25(9):097605. PubMed ID: 26428558
    [TBL] [Abstract][Full Text] [Related]  

  • 15. Chaos and quantum mechanics.
    Habib S; Bhattacharya T; Greenbaum B; Jacobs K; Shizume K; Sundaram B
    Ann N Y Acad Sci; 2005 Jun; 1045():308-32. PubMed ID: 15980320
    [TBL] [Abstract][Full Text] [Related]  

  • 16. Chaotic transition of random dynamical systems and chaos synchronization by common noises.
    Rim S; Hwang DU; Kim I; Kim CM
    Phys Rev Lett; 2000 Sep; 85(11):2304-7. PubMed ID: 10977997
    [TBL] [Abstract][Full Text] [Related]  

  • 17. Joint reconstruction and prediction\break of random dynamical systems under\break borrowing of strength.
    Hatjispyros SJ; Merkatas C
    Chaos; 2019 Feb; 29(2):023121. PubMed ID: 30823740
    [TBL] [Abstract][Full Text] [Related]  

  • 18. Reliability of the 0-1 test for chaos.
    Hu J; Tung WW; Gao J; Cao Y
    Phys Rev E Stat Nonlin Soft Matter Phys; 2005 Nov; 72(5 Pt 2):056207. PubMed ID: 16383727
    [TBL] [Abstract][Full Text] [Related]  

  • 19. Analytic solutions throughout a period doubling route to chaos.
    Milosavljevic MS; Blakely JN; Beal AN; Corron NJ
    Phys Rev E; 2017 Jun; 95(6-1):062223. PubMed ID: 28709358
    [TBL] [Abstract][Full Text] [Related]  

  • 20. Psychoanalysis and dynamical systems theory: prediction and self similarity.
    Galatzer-Levy RM
    J Am Psychoanal Assoc; 1995; 43(4):1085-113. PubMed ID: 8926326
    [TBL] [Abstract][Full Text] [Related]  

    [Next]    [New Search]
    of 6.