Topological and phenomenological classification of bursting oscillations
- 1 May 1995
- journal article
- Published by Springer Nature in Bulletin of Mathematical Biology
- Vol. 57 (3) , 413-439
- https://doi.org/10.1007/bf02460633
Abstract
We describe a classification scheme for bursting oscillations which encompasses many of those found in the literature on bursting in excitable media. This is an extension of the scheme of Rinzel (inMathematical Topics in Population Biology, Springer, Berlin, 1987), put in the context of a sequence of horizontal cuts through a two-parameter bifurcation diagram. We use this to describe the phenomenological character of different types of bursting, addressing the issue of how well the bursting can be characterized given the limited amount of information often available in experimental settings.Keywords
This publication has 37 references indexed in Scilit:
- Thalamic bursting mechanism: an inward slow current revealed by membrane hyperpolarizationPublished by Elsevier ,2003
- Phase Independent Resetting in Relaxation and Bursting OscillatorsJournal of Theoretical Biology, 1994
- Mapping the dynamics of a bursting neuronPhilosophical Transactions Of The Royal Society B-Biological Sciences, 1993
- IntroductionPublished by Springer Nature ,1991
- The Saddle-Node Separatrix-Loop BifurcationSIAM Journal on Mathematical Analysis, 1987
- Bursting oscillations in an excitable membrane modelPublished by Springer Nature ,1985
- A model of neuronal bursting using three coupled first order differential equationsProceedings of the Royal Society of London. B. Biological Sciences, 1984
- Bursting phenomena in a simplified Oregonator flow system modelThe Journal of Chemical Physics, 1982
- Spontaneous Activity in Isolated Somata of Aplysia Pacemaker NeuronsThe Journal of general physiology, 1968
- The numerical integration of ordinary differential equationsMathematics of Computation, 1967