144 related articles for article (PubMed ID: 30267735)
1. Dynamics of the Selkov oscillator.
Brechmann P; Rendall AD
Math Biosci; 2018 Dec; 306():152-159. PubMed ID: 30267735
[TBL] [Abstract][Full Text] [Related]
2. Unbounded solutions of models for glycolysis.
Brechmann P; Rendall AD
J Math Biol; 2021 Jan; 82(1-2):1. PubMed ID: 33475794
[TBL] [Abstract][Full Text] [Related]
3. The minimal model of Hahn for the Calvin cycle.
Obeid H; Rendall AD
Math Biosci Eng; 2019 Mar; 16(4):2353-2370. PubMed ID: 31137217
[TBL] [Abstract][Full Text] [Related]
4. Control of Pyragas Applied to a Coupled System with Unstable Periodic Orbits.
Amster P; Alliera C
Bull Math Biol; 2018 Nov; 80(11):2897-2916. PubMed ID: 30203141
[TBL] [Abstract][Full Text] [Related]
5. Local and global bifurcations at infinity in models of glycolytic oscillations.
Sturis J; Brøns M
J Math Biol; 1997 Dec; 36(2):119-32. PubMed ID: 9463107
[TBL] [Abstract][Full Text] [Related]
6. Equality of average and steady-state levels in some nonlinear models of biological oscillations.
Knoke B; Marhl M; Perc M; Schuster S
Theory Biosci; 2008 Mar; 127(1):1-14. PubMed ID: 18197448
[TBL] [Abstract][Full Text] [Related]
7. Synchronization of oscillations of proliferation of keratinocytes in psoriatic skin by external periodic force: a mathematical model.
Laptev MV; Nikulin NK
J Theor Biol; 2005 Aug; 235(4):485-94. PubMed ID: 15935167
[TBL] [Abstract][Full Text] [Related]
8. A simulation study of oscillating glycolysis: a comparison between a model and experiments.
Richter O; Vohmann HJ; Betz A
Chronobiologia; 1978; 5(1):56-65. PubMed ID: 688850
[TBL] [Abstract][Full Text] [Related]
9. Analysis of a mathematical model with nonlinear susceptibles-guided interventions.
Li Q; Xiao YN
Math Biosci Eng; 2019 Jun; 16(5):5551-5583. PubMed ID: 31499725
[TBL] [Abstract][Full Text] [Related]
10. Using sign patterns to detect the possibility of periodicity in biological systems.
Culos GJ; Olesky DD; van den Driessche P
J Math Biol; 2016 Apr; 72(5):1281-300. PubMed ID: 26092517
[TBL] [Abstract][Full Text] [Related]
11. Common asymptotic behavior of solutions and almost periodicity for discontinuous, delayed, and impulsive neural networks.
Allegretto W; Papini D; Forti M
IEEE Trans Neural Netw; 2010 Jul; 21(7):1110-25. PubMed ID: 20562046
[TBL] [Abstract][Full Text] [Related]
12. Control of oscillating glycolysis of yeast by stochastic, periodic, and steady source of substrate: a model and experimental study.
Boiteux A; Goldbeter A; Hess B
Proc Natl Acad Sci U S A; 1975 Oct; 72(10):3829-33. PubMed ID: 172886
[TBL] [Abstract][Full Text] [Related]
13. Periodic solution of a chemostat model with Monod growth rate and impulsive state feedback control.
Guo H; Chen L
J Theor Biol; 2009 Oct; 260(4):502-9. PubMed ID: 19615380
[TBL] [Abstract][Full Text] [Related]
14. Dynamic behavior in glycolytic oscillations with phase shifts.
Martinez de la Fuente I; Martinez L; Veguillas J
Biosystems; 1995; 35(1):1-13. PubMed ID: 7772719
[TBL] [Abstract][Full Text] [Related]
15. The diffusive Lotka-Volterra predator-prey system with delay.
Al Noufaey KS; Marchant TR; Edwards MP
Math Biosci; 2015 Dec; 270(Pt A):30-40. PubMed ID: 26471317
[TBL] [Abstract][Full Text] [Related]
16. Phase resetting and bifurcation in the ventricular myocardium.
Chay TR; Lee YS
Biophys J; 1985 May; 47(5):641-51. PubMed ID: 4016184
[TBL] [Abstract][Full Text] [Related]
17. A dynamical model of tumour immunotherapy.
Frascoli F; Kim PS; Hughes BD; Landman KA
Math Biosci; 2014 Jul; 253():50-62. PubMed ID: 24759513
[TBL] [Abstract][Full Text] [Related]
18. Stability analysis of the Michaelis-Menten approximation of a mixed mechanism of a phosphorylation system.
Rao S
Math Biosci; 2018 Jul; 301():159-166. PubMed ID: 29738759
[TBL] [Abstract][Full Text] [Related]
19. Periodic solutions: a robust numerical method for an S-I-R model of epidemics.
Milner FA; Pugliese A
J Math Biol; 1999 Dec; 39(6):471-92. PubMed ID: 10672508
[TBL] [Abstract][Full Text] [Related]
20. Understanding bistability in yeast glycolysis using general properties of metabolic pathways.
Planqué R; Bruggeman FJ; Teusink B; Hulshof J
Math Biosci; 2014 Sep; 255():33-42. PubMed ID: 24956444
[TBL] [Abstract][Full Text] [Related]
[Next] [New Search]