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.
4. Attractor selection in a modulated laser and in the Lorenz circuit. Meucci R; Salvadori F; Naimee KA; Brugioni S; Goswami BK; Boccaletti S; Arecchi FT Philos Trans A Math Phys Eng Sci; 2008 Feb; 366(1864):475-86. PubMed ID: 17673407 [TBL] [Abstract][Full Text] [Related]
5. 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]
6. Bifurcations in a system described by a nonlinear differential equation with delay. Ueda Y; Ohta H; Stewart HB Chaos; 1994 Mar; 4(1):75-83. PubMed ID: 12780088 [TBL] [Abstract][Full Text] [Related]
7. Experimental distinction between chaotic and strange nonchaotic attractors on the basis of consistency. Uenohara S; Mitsui T; Hirata Y; Morie T; Horio Y; Aihara K Chaos; 2013 Jun; 23(2):023110. PubMed ID: 23822475 [TBL] [Abstract][Full Text] [Related]
8. 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]
9. 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]
10. Extreme events and crises observed in an all-solid-state laser with modulation of losses. Granese NM; Lacapmesure A; Agüero MB; Kovalsky MG; Hnilo AA; Tredicce JR Opt Lett; 2016 Jul; 41(13):3010-2. PubMed ID: 27367088 [TBL] [Abstract][Full Text] [Related]
11. Global bifurcations in fractional-order chaotic systems with an extended generalized cell mapping method. Liu X; Hong L; Jiang J Chaos; 2016 Aug; 26(8):084304. PubMed ID: 27586621 [TBL] [Abstract][Full Text] [Related]
12. Symmetry chaotic attractors and bursting dynamics of semiconductor lasers subjected to optical injection. Mengue AD; Essimbi BZ Chaos; 2012 Mar; 22(1):013113. PubMed ID: 22462989 [TBL] [Abstract][Full Text] [Related]
13. Intermittency induced by attractor-merging crisis in the Kuramoto-Sivashinsky equation. Rempel EL; Chian AC Phys Rev E Stat Nonlin Soft Matter Phys; 2005 Jan; 71(1 Pt 2):016203. PubMed ID: 15697694 [TBL] [Abstract][Full Text] [Related]
14. 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]
16. Detecting and controlling unstable periodic orbits that are not part of a chaotic attractor. Perc M; Marhl M Phys Rev E Stat Nonlin Soft Matter Phys; 2004; 70(1 Pt 2):016204. PubMed ID: 15324149 [TBL] [Abstract][Full Text] [Related]
17. Control of extreme events in the bubbling onset of wave turbulence. Galuzio PP; Viana RL; Lopes SR Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Apr; 89(4):040901. PubMed ID: 24827176 [TBL] [Abstract][Full Text] [Related]
18. Route to extreme events in excitable systems. Karnatak R; Ansmann G; Feudel U; Lehnertz K Phys Rev E Stat Nonlin Soft Matter Phys; 2014 Aug; 90(2):022917. PubMed ID: 25215809 [TBL] [Abstract][Full Text] [Related]
19. Potential flux landscapes determine the global stability of a Lorenz chaotic attractor under intrinsic fluctuations. Li C; Wang E; Wang J J Chem Phys; 2012 May; 136(19):194108. PubMed ID: 22612081 [TBL] [Abstract][Full Text] [Related]
20. Periodic orbit analysis at the onset of the unstable dimension variability and at the blowout bifurcation. Pereira RF; de S Pinto SE; Viana RL; Lopes SR; Grebogi C Chaos; 2007 Jun; 17(2):023131. PubMed ID: 17614685 [TBL] [Abstract][Full Text] [Related] [Next] [New Search]