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MULTIPLE TIME SCALE DYNAMICS WITH T
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MULTIPLE TIME SCALE DYNAMICS WITH T
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To my family. iv
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ing mechanical systems.”, [E.T. P
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TABLE OF CONTENTS Biographical Sket
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LIST OF TABLES 5.1 Euclidean distan
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3.1 Bifurcation diagram of (3.6). H
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4.6 Boundary conditions are blue an
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6.3 For all computations of the ful
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where (x, y)∈R m × R n are varia
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the general definition of normal hy
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fast-slow system and yields: ˙x=(D
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whereΛ,Γare matrix-valued functio
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forǫ> 0. Therefore they have no im
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The Hopf bifurcation is supercritic
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where the algorithm can be used to
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slow flow. In particular the manifo
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f ast whereφ t is the flow of the
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whereµ∈R p are parameters. Usual
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We shall not prove this result but
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d as given in equation (2.5). Let p
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variables x1= u, x2= v and y=w we g
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The geometry of the system for one
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(0, 0, 0). 2.3 The Exchange Lemma I
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withδ>0 sufficiently small. The sa
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Theorem 2.3.2. Let ¯q ∈ M∩{|a|
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exit point of a trajectory starting
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Hence we have k=1=l and n=2 in view
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The variational equations describin
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(iii) Denote byη1i the i-th row of
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Then let H(Z, X, t) := X ′ − BX
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Proof. First, we work near q, then|
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This result can be written more com
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Proof. (of Theorem 2.4.2) The argum
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ˆZ is still exponentially small. P
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in the FitzHugh-Nagumo equation ǫ
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center-unstable manifold W cu (0, 0
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where the second “fast jump” oc
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CHAPTER 3 PAPER I: “HOMOCLINIC OR
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[39, 40, 41, 42]). It states that f
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papers. Geometric singular perturba
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- Page 85 and 86: One can view this as a projection o
- Page 87 and 88: for x1. We find that there are thre
- Page 89 and 90: We compute the functionsγl andγr
- Page 91 and 92: 3.3.3 Two Slow Variables, One Fast
- Page 93 and 94: Also recall that the y-nullcline pa
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- Page 97 and 98: 3.4 The Full System 3.4.1 Hopf Bifu
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- Page 103 and 104: we should view this curve as an app
- Page 105 and 106: s 1.6 1.4 1.2 1 0.8 0.6 0.4 0.2 sin
- Page 107 and 108: waves” (see e.g. [63, 15, 69]). 3
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- Page 111 and 112: Then (3.24) transforms to a three t
- Page 113 and 114: with x∈R m the vector of fast var
- Page 115 and 116: ons that was used by David Terman i
- Page 117 and 118: 0.15 0.1 0.05 0 −0.05 0.15 0.1 0.
- Page 119 and 120: from the input data. (If b−a is a
- Page 121 and 122: This explicit solution provides a b
- Page 123 and 124: 4.4.2 Traveling Waves of the FitzHu
- Page 125 and 126: computing the homoclinic orbit, eve
- Page 127 and 128: y 0.15 0.1 0.05 0 −0.05 ε=0.001,
- Page 129 and 130: eturns directly to q. Figure 4.5(b)
- Page 131 and 132: are complicated [107]: we expect th
- Page 133: t∈[0, 1]: z ′ = T F(z) H0(z(0))
- Page 137 and 138: s 1.6 1.4 1.2 1 0.8 0.6 0.4 0.2 0 H
- Page 139 and 140: For a point p∈C0 we say that C0 i
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- Page 143 and 144: Proof. (Sketch) The Lyapunov coeffi
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- Page 147 and 148: gency of W s (q) with E u (Cl,ǫ).
- Page 149 and 150: y x2 W s (q) C0 Cl,ǫ x1 W s (Cl,ǫ
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- Page 153 and 154: yΣ1=ψ(Σ1) andΣ2=ψ(Σ2); see Fi
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- Page 157 and 158: s 1.39 1.385 1.38 1.375 1.37 1.365
- Page 159 and 160: Figure 5.9(a)-(b). It was obtained
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- Page 163 and 164: 6.2 Introduction Our framework in t
- Page 165 and 166: are called fold points. We can use
- Page 167 and 168: curve C= Cl∪{(0, 0)}∪ Cr where
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- Page 171 and 172: A slight modification of the formul
- Page 173 and 174: 6.5 Relating l1 and K Krupa and Szm
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- Page 177 and 178: atλ=λH= 0 forǫ= 0.05 is l MC 1
- Page 179 and 180: imum and maximum of the cubic. The
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BIBLIOGRAPHY [1] V.I. Arnold. Encyc
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[26] M. Desroches, B. Krauskopf, an
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icated to Floris Takens. Eds.: Henk
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[74] T.J. Kaper and C.K.R.T. Jones.
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[98] H.G. Rotstein, M. Wechselberge
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