Dynamical Systems in Neuroscience:

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444 ReferencesDickson C.T., Magistretti J., Shalinsky M.H., Fransen E., Hasselmo M.E., Alonso A. (2000)Properties and Role of I h in the Pacing of Subthreshold Oscillations in Entorhinal CortexLayer II Neurons. Journal of Neurophysiology, 83:2562–2579.Doiron B., Laing C., Longtin A/, and Maler L. (2002) Ghostbursting: a novel neuronal burstmechanism, J. Comput. Neurosci. 12:5–25.Dong C.-J. and Werblin F.S. (1995) Inwardly Rectifying Potassium Conductance Can Acceleratethe Hyperpolarization Response in Retinal Horizontal Cells. Journal of Neurophysiology,74:2258–2265Eckhaus W. (1983) Relaxation Oscillations Including a Standard Chase of French Ducks. LectureNotes in Math., 985:432–449.Ermentrout G. B. (1981) n : m Phase-Locking of Weakly Coupled Oscillators.Mathematical Biology, 12:327–342.Journal ofErmentrout G. B. (1985) Losing Amplitude and Saving Phase. In Othmer H. G. (ed) NonlinearOscillations in Biology and Chemistry. Springer-Verlag.Ermentrout G. B. (1992) Stable Periodic Solutions to Discrete and Continuum Arrays of WeaklyCoupled Nonlinear Oscillators. SIAM Journal on Applied Mathematics, 52:1665–1687.Ermentrout G. B. (1994) An Introduction to Neural Oscillators. In Neural Modeling and NeuralNetworks, F Ventriglia, (ed.), Pergamon Press, Oxford, pp.79–110.Ermentrout G. B. (1996) Type I Membranes, Phase Resetting Curves, and Synchrony. NeuralComputation 8:979–1001.Ermentrout G. B. (1998) Linearization of F-I Curves by Adaptation.10:1721–1729.Neural ComputationErmentrout, G. B. (2003) Dynamical Consequences of Fast-Rising, Slow-Decaying Synapses inNeuronal Networks Neural Computation 15:2483-2522Ermentrout G. B. (2002) Simulating, Analyzing, and Animating Dynamical Systems: A Guideto XPPAUT for Researchers and Students (Software, Environments, Tools). SIAMErmentrout G. B. and Kopell N. (1984) Frequency Plateaus in a Chain of Weakly CoupledOscillators, I. SIAM Journal on Applied Mathematics 15:215–237.Ermentrout G. B. and Kopell N. (1986a) Parabolic Bursting in an Excitable System CoupledWith a Slow Oscillation. SIAM Journal on Applied Mathematics 46:233–253.Ermentrout G. B. and Kopell N. (1986b) Subcellular Oscillations and Bursting. MathematicalBiosciences 78:265–291.Ermentrout G. B. and Kopell N. (1990) Oscillator death in systems of coupled neural oscillators.SIAM Journal on Applied Mathematics 50:125–146.Ermentrout G. B. and Kopell N. (1991) Multiple pulse interactions and averaging in systems ofcoupled neural oscillators. Journal of Mathematical Biology 29:195–217.Ermentrout G. B. and Kopell N. (1994) Learning of phase lags in coupled neural oscillators.Neural Computation 6:225–241.FitzHugh R. (1955) Mathematical Models of Threshold Phenomena in the Nerve Membrane,Bulletin of Mathematical Biophysics, 7:252-278.
References 445FitzHugh R. (1960) Threshold and Plateaus in the Hodgkin-Huxley Nerve Equations.Journal of General Physiology, 43:867–896.FitzHugh, R.A. (1961) Impulses and physiological states in theoretical models of nerve membrane.Biophys. J., 1:445–466.FitzHugh R. (1969) Mathematical Models of Excitation and Propagation in Nerve. In Schwan(ed.) Biological Engineering, McGraw-Hill Book Co., Inc., N.Y.FitzHugh R. (1976) Anodal excitation in the Hodgkin-Huxley nerve model. Biophys J. 16:209–226.Fourcaud-Trocme N., Hansel D., van Vreeswijk C., and Brunel N. (2003) How Spike GenerationMechanisms Determine the Neuronal Response to Fluctuating Inputs. The Journal ofNeuroscience, 23(37):11628–11640.Frankel P. and Kiemel T. (1993) Relative Phase Behavior of Two Slowly Coupled Oscillators.SIAM J. Appl. Math., 53, pp. 1436–1446.Geiger J.R.P. and Jonas P. (2000) Dynamic Control of Presynaptic Ca Inflow by Fast-InactivatingK Channels in Hippocampal Mossy Fiber Boutons. Neuron, 28:927–939.Gerstner W. and Kistler W.M. (2002) Spiking Neuron Models: Single Neurons, Populations,Plasticity. Cambridge University Press.George R. M. (1914) On Circulating Excitations on Heart Muscles and Their Possible Relationto Tachycardia and Fibrillation. Trans. R. Soc. Can. 4:43–53.Gibson J.R., Belerlein M. and Connors B.W. (1999) Two networks of electrically coupled inhibitoryneurons in neocortex, Nature, 402:75–79Glass L. and MacKey M.C. (1988) From Clocks to Chaos. Princeton University Press.Goel P. and Ermentrout B. (2002) Synchrony, stability, and firing patterns in pulse-coupledoscillators. Physica D, 163:191–216.Golubitsky M., Josic K. and Kaper T.J. (2001) An unfolding theory approach to bursting infast-slow systems. In: Global Analysis of Dynamical Systems: Festschrift dedicated to FlorisTakens on the occasion of his 60th birthday. (H.W. Broer, B. Krauskopf and G. Vegter, eds.)Institute of Physics Publ., 277–308Golubitsky M. and Stewart I. (2002) Patterns of oscillation in coupled cell systems. In: Geometry,Dynamics, and Mechanics: 60th Birthday Volume for J.E. Marsden. (P. Holmes, P.Newton and A. Weinstein, eds.) Springer-Verlag, 243–286.Gray C.M. and McCormick D.A. (1996) Chattering cells: superficial pyramidal neurons contributingto the generation of synchronous oscillations in the visual cortex. Science. 274(5284): 109–113Grundfest H. (1971) Biophysics and Physiology of Excitable Membranes. Ed. WJ Adelman,Van Nostrand Reinhold Co, New York,Guckenheimer J, Harris-Warrick R, Peck J, Willms A. (1997) Bifurcation, Bursting, and SpikeFrequency Adaptation. J Comput Neurosci. 4:257–277.Guckenheimer J. and Holmes D. (1983) Nonlinear Oscillations, Dynamical Systems, and Bifurcationsof Vector Fields. Springer-Verlag, New York.The
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Eugene M. IzhikevichThe Neuroscienc
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6.3.6 Saddle-node homoclinic orbit
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9.4.2 Integrators vs. Resonators .
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xPrefaceversely, cells having quite
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2 Introductionapical dendritessomar
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4 Introduction(a)spikes(b)spikes cu
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6 Introduction1.1.3 Why are neurons
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8 Introductionconcepts of dynamical
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10 Introductionspikingmoderesting m
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12 Introduction(a)spikinglimitcycle
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14 Introductionco-existence of rest
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16 Introduction1.2.4 Neuro-computat
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18 IntroductionspikeFigure 1.16: Ph
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20 Introductionwith coupled neurons
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22 IntroductionFigure 1.17: John Ri
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24 Introduction
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26 Electrophysiology of NeuronsInsi
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28 Electrophysiology of Neuronsouts
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30 Electrophysiology of NeuronsRest
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32 Electrophysiology of NeuronsFigu
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34 Electrophysiology of Neuronsm (V
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36 Electrophysiology of Neurons10.8
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38 Electrophysiology of Neurons2.3
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42 Electrophysiology of NeuronsDepo
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44 Electrophysiology of NeuronsV(x,
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46 Electrophysiology of Neurons1m (
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48 Electrophysiology of NeuronsPara
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52 Electrophysiology of Neuronsvolt
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54 Electrophysiology of Neurons
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56 One-Dimensional SystemsActivatio
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58 One-Dimensional Systemsinwardcur
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60 One-Dimensional Systems40bistabi
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62 One-Dimensional Systemsat every
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64 One-Dimensional Systems?F(V)>0+
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66 One-Dimensional SystemsUnstableE
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¡ ¡ ¡¡ ¡ ¡¡ ¡ ¡¡ ¡ ¡¡
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70 One-Dimensional Systems+ - - + +
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72 One-Dimensional Systemsλ(V-Veq)
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74 One-Dimensional Systemsbifurcati
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76 One-Dimensional Systems100806040
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78 One-Dimensional Systemsbifurcati
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80 One-Dimensional Systems20 mV100
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82 One-Dimensional Systemsmembrane
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84 One-Dimensional Systemssteady-st
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86 One-Dimensional Systemsspike rig
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88 One-Dimensional SystemsVF (V)1VV
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90 One-Dimensional Systems10.80.60.
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92 One-Dimensional Systems
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94 Two-Dimensional SystemsI Na,pneu
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96 Two-Dimensional Systemsdefines a
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98 Two-Dimensional Systems(f(x(t),y
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100 Two-Dimensional Systems0.70acti
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102 Two-Dimensional Systems0.70.6K
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104 Two-Dimensional Systemsy1.510.5
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106 Two-Dimensional SystemsFor exam
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108 Two-Dimensional SystemsIn gener
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110 Two-Dimensional Systemsv 2 v 2v
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112 Two-Dimensional SystemsV-nullcl
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114 Two-Dimensional SystemsV-nullcl
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116 Two-Dimensional Systemsheterocl
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118 Two-Dimensional Systems0.60.5n-
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120 Two-Dimensional Systemseigenval
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122 Two-Dimensional SystemsK + acti
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124 Two-Dimensional Systemsexcitati
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126 Two-Dimensional SystemsReview o
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128 Two-Dimensional SystemsabcdFigu
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130 Two-Dimensional SystemsFigure 4
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132 Two-Dimensional Systems
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134 Conductance-Based Models• If
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136 Conductance-Based Modelsinward(
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138 Conductance-Based Models1I=01I=
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140 Conductance-Based Modelsleak cu
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142 Conductance-Based Modelshyperpo
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144 Conductance-Based Models0I=0ina
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146 Conductance-Based Models0I=9.75
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148 Conductance-Based Models1I=651I
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150 Conductance-Based Modelshave co
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152 Conductance-Based Models1 sec10
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154 Conductance-Based Modelsvoltage
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156 Conductance-Based Models1h=0.89
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158 Conductance-Based Models5.2.2 E
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160 Conductance-Based Models1recove
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162 Conductance-Based Modelscurrent
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164 Conductance-Based Modelsmodels
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166 Conductance-Based Models
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168 Bifurcationssaddle-node bifurca
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170 Bifurcationssaddle-node bifurca
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172 Bifurcations0.5v 2V-nullclineK
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174 BifurcationsBoth types of the b
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176 BifurcationsV-nullcline0.5K + g
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178 Bifurcationsrstable limit cycle
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180 BifurcationsnVstable limit cycl
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¡ ¡¡ ¡¡ ¡ ¡¡ ¡ ¡182 Bifur
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¡ ¡ ¡¡ ¡ ¡¡ ¡ ¡¡ ¡ ¡184
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186 Bifurcationsmembrane potential,
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188 BifurcationsBifurcation of a li
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190 Bifurcationsstableunstablelimit
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192 Bifurcationsamplitude (max-min)
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194 Bifurcationshomoclinic orbithom
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196 Bifurcations0.80.60.4stable lim
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198 Bifurcationsfrequency (Hz)40030
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200 BifurcationsSaddle-Focus Homocl
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202 Bifurcationsc 1c 2xFigure 6.34:
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204 BifurcationseigenvaluesHopffold
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206 Bifurcationsfast nullclineslow
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208 Bifurcationswith fast and slow
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210 BifurcationsSupercritical Andro
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212 BifurcationsK + conductance tim
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214 BifurcationsIn contrast, if the
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216 Bifurcationsinvariant circlesad
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218 Bifurcationsbifurcationssaddle-
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220 BifurcationsExercises1. (Transc
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222 Bifurcationsv 2v 11a-11-1Figure
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224 Bifurcations19. [M.S.] A leaky
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226 Excitabilityspike?spikerestrest
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228 ExcitabilityAlternatively, the
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230 Excitability50 ms 20 mV 1 ms100
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232 ExcitabilityClass 3 excitable n
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234 Excitability0.20.150.10.05I 1I
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236 Excitabilitysaddle-node bifurca
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238 Excitability(a) resting spiking
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240 Excitabilityproperties integrat
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242 ExcitabilityThe existence of fa
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244 Excitability1coincidencedetecti
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246 Excitabilityspikeexcitatory pul
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248 Excitability(g)9 ms(f)(e)(d)(c)
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250 Excitabilitysquid axonmodel0 mV
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252 Excitability(a) integrator(b) r
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254 Excitability(a) integrator(b) r
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256 Excitabilitymembrane potential,
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258 Excitability0.1saddle-node bifu
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260 Excitability100 ms10 mVoscillat
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262 ExcitabilityBogdanov-Takens bif
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264 Excitabilitya pulse of current.
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266 Excitabilitymembrane potential
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268 Excitability(a)150100I K(M)(b)3
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270 Excitability50 mV300 msFigure 7
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272 Excitability20 mVADP100 msAHP-6
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274 ExcitabilityK + activation gate
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276 ExcitabilityBibliographical Not
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278 Excitability7. Show that the re
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280 Simple Modelsspikemembrane pote
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282 Simple Models1thresholdyz reset
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284 Simple Models1v reset =|b| 1/2b
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286 Simple Modelsbe an integrator o
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288 Simple Modelsintegrate-and-fire
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290 Simple Models(A) tonic spiking(
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292 Simple Modelsgeneral algorithm
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294 Simple Modelscha, cha — real
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296 Simple Modelslayer 5 neuronsimp
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298 Simple Modelsb=-240200saddle-no
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300 Simple Models(a)simple modellay
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302 Simple Models(a)burstingspiking
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304 Simple Models(a)dendriticspike2
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306 Simple Models(a)74 5 6 3210(b)C
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308 Simple Modelschattering neuron
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310 Simple ModelsLTS neuron (in vit
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312 Simple ModelsFS neuron (in vitr
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314 Simple Models(1) fast oscillati
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316 Simple Modelsthrough an appropr
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318 Simple Modelsthey are able to g
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320 Simple Modelsv r = −80 mV, an
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322 Simple Modelsshow in Fig. 7.36.
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324 Simple ModelsBibliographical No
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326 Simple ModelsExercises1. (Integ
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328 Simple Models17. [M.S.] Analyze
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330 Simple Modelsa35 mV350 msc-NAC
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332 Simple Modelsrat RTN neuronsimp
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334 Simple ModelsFigure 8.34: Class
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336 Simple Modelsspiny neuronlatenc
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338 Simple Models(a)stellate cellof
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340 Simple Modelsrat's mitral cell
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342 Bursting(a) cortical chattering
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344 Burstingmembranepotential (mV)-
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346 Burstingvoltage-gatedCa2+-gated
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348 Burstingslow dynamicsneuronvolt
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350 Burstingslow inactivation of in
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352 Bursting9.2.1 Fast-slow burster
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354 Burstingn-nullclinen slow =-0.0
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356 Bursting0maxmembrane potential,
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358 Bursting0membrane potential, V
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360 BurstingI=0I=4.5425 ms 25 mVI=5
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362 Burstingmembrane potential, V (
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364 Bursting9.3 ClassificationIn Fi
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366 Burstingbifurcation of spiking
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368 BurstingFigure 9.26: Putative
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370 Bursting108spikingslow variable
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372 Bursting(a)membrane potential,
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374 Burstingdepending on the type o
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376 BurstingsubcriticalAndronov-Hop
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378 Bursting(a)membrane potential,
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spiking380 Burstingfoldbifurcations
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382 BurstingspikingsupercriticalAnd
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384 Burstingaction potentials cut2
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386 Bursting9.4.3 BistabilitySuppos
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388 BurstingFigure 9.49: The instan
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esting390 Burstingspikesynchronizat
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392 BurstingReview of Important Con
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Page 452 and 453: 442 Referencesterneurons mediated b
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494 Synchronization (see www.izhike
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512 Solutions to Exercises, Chap. 1
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