Introduction to the Modeling and Analysis of Complex Systems

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BIBLIOGRAPHY 467[26] J. D. Sterman, Business Dynamics: Systems Thinking and Modeling for a ComplexWorld. Irwin/McGraw-Hill, 2000.[27] A. Hagberg, P. Swart, and D. Schult, “Exploring network structure, dynamics, andfunction using NetworkX,” in Proceedings of the 7th Python in Science Conference,2008, pp. 11–15.[28] G. Strang, Linear Algebra and Its Applications, 4th ed. Cengage Learning, 2005.[29] S. H. Strogatz, “Love affairs and differential equations,” Mathematics Magazine,vol. 61, no. 1, p. 35, 1988.[30] R. FitzHugh, “Impulses and physiological states in theoretical models of nerve membrane,”Biophysical Journal, vol. 1, no. 6, pp. 445–466, 1961.[31] J. Nagumo, S. Arimoto, and S. Yoshizawa, “An active pulse transmission line simulatingnerve axon,” Proceedings of the IRE, vol. 50, no. 10, pp. 2061–2070, 1962.[32] R. M. May, “Simple mathematical models with very complicated dynamics,” Nature,vol. 261, no. 5560, pp. 459–467, 1976.[33] M. Baranger, “Chaos, complexity, and entropy: A physics talk for nonphysicists,”New England Complex Systems Institute, 2000. [Online]. Available:http://www.necsi.edu/projects/baranger/cce.html[34] S. Wolfram, “Statistical mechanics of cellular automata,” Reviews of Modern Physics,vol. 55, no. 3, p. 601, 1983.[35] M. Gardner, “Mathematical games: The fantastic combinations of John Horton Conway’snew solitaire game of ‘life’,” Scientific American, vol. 223, no. 4, pp. 120–123,1970.[36] ——, “On cellular automata, self-reproduction, the Garden of Eden and the game’life’,” Scientific American, vol. 224, no. 2, p. 112, 1971.[37] C. G. Langton, “Studying artificial life with cellular automata,” Physica D: NonlinearPhenomena, vol. 22, no. 1, pp. 120–149, 1986.[38] M. Sipper, “Fifty years of research on self-replication: An overview,” Artificial Life,vol. 4, no. 3, pp. 237–257, 1998.
468 BIBLIOGRAPHY[39] H. Sayama, “A new structurally dissolvable self-reproducing loop evolving in a simplecellular automata space,” Artificial Life, vol. 5, no. 4, pp. 343–365, 1999.[40] C. Salzberg and H. Sayama, “Complex genetic evolution of artificial self-replicatorsin cellular automata,” Complexity, vol. 10, no. 2, pp. 33–39, 2004.[41] H. Sayama, L. Kaufman, and Y. Bar-Yam, “Symmetry breaking and coarsening inspatially distributed evolutionary processes including sexual reproduction and disruptiveselection,” Physical Review E, vol. 62, pp. 7065–7069, 2000.[42] ——, “Spontaneous pattern formation and genetic diversity in habitats with irregulargeographical features,” Conservation Biology, vol. 17, no. 3, pp. 893–900, 2003.[43] C. L. Nehaniv, “Asynchronous automata networks can emulate any synchronous automatanetwork,” International Journal of Algebra and Computation, vol. 14, no. 5 &6, pp. 719–739, 2004.[44] A. M. Turing, “The chemical basis of morphogenesis,” Philosophical Transactions ofthe Royal Society of London. Series B, Biological Sciences, vol. 237, no. 641, pp.37–72, 1952.[45] D. A. Young, “A local activator-inhibitor model of vertebrate skin patterns,” MathematicalBiosciences, vol. 72, no. 1, pp. 51–58, 1984.[46] S. Wolfram, “Universality and complexity in cellular automata,” Physica D: NonlinearPhenomena, vol. 10, no. 1, pp. 1–35, 1984.[47] A. Wuensche, Exploring Discrete Dynamics: The DDLab Manual. Luniver Press,2011.[48] E. F. Keller and L. A. Segel, “Initiation of slime mold aggregation viewed as an instability,”Journal of Theoretical Biology, vol. 26, no. 3, pp. 399–415, 1970.[49] L. Edelstein-Keshet, Mathematical Models in Biology. SIAM, 1987.[50] R. J. Field and R. M. Noyes, “Oscillations in chemical systems. IV. Limit cycle behaviorin a model of a real chemical reaction,” Journal of Chemical Physics, vol. 60,no. 5, pp. 1877–1884, 1974.[51] J. J. Tyson and P. C. Fife, “Target patterns in a realistic model of the Belousov–Zhabotinskii reaction,” Journal of Chemical Physics, vol. 73, no. 5, pp. 2224–2237,1980.
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Introduction to the Modeling and An
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iiiAbout the TextbookIntroduction t
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New York. He is also a Fellow of th
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PrefaceThis is an introductory text
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a comprehensive view of the related
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Chen, Hal Lewis, Vlad Miskovic, Chu
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xviCONTENTS5 Discrete-Time Models I
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xviiiCONTENTS15.3 Constructing Netw
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Chapter 1Introduction1.1 Complex Sy
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1.1. COMPLEX SYSTEMS IN A NUTSHELL
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1.2. TOPICAL CLUSTERS 7The possibil
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1.2. TOPICAL CLUSTERS 9these topica
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12 CHAPTER 2. FUNDAMENTALS OF MODEL
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Part IISystems with a Small Number
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30 CHAPTER 3. BASICS OF DYNAMICAL S
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36 CHAPTER 4. DISCRETE-TIME MODELS
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Chapter 6Continuous-Time Models I:
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6.2. CLASSIFICATIONS OF MODEL EQUAT
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6.3. CONNECTING CONTINUOUS-TIME MOD
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6.4. SIMULATING CONTINUOUS-TIME MOD
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6.4. SIMULATING CONTINUOUS-TIME MOD
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6.5. BUILDING YOUR OWN MODEL EQUATI
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112 CHAPTER 7. CONTINUOUS-TIME MODE
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Chapter 8Bifurcations8.1 What Are B
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8.2. BIFURCATIONS IN 1-D CONTINUOUS
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8.3. HOPF BIFURCATIONS IN 2-D CONTI
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8.3. HOPF BIFURCATIONS IN 2-D CONTI
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8.4. BIFURCATIONS IN DISCRETE-TIME
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Chapter 9Chaos9.1 Chaos in Discrete
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9.1. CHAOS IN DISCRETE-TIME MODELS
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Next phase space9.3. LYAPUNOV EXPON
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9.3. LYAPUNOV EXPONENT 159easily co
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9.3. LYAPUNOV EXPONENT 16110Lyapuno
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9.4. CHAOS IN CONTINUOUS-TIME MODEL
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Chapter 10Interactive Simulation of
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10.2. INTERACTIVE SIMULATION WITH P
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10.4. SIMULATION WITHOUT PYCX 181Co
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10.4. SIMULATION WITHOUT PYCX 183re
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Chapter 11Cellular Automata I: Mode
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11.1. DEFINITION OF CELLULAR AUTOMA
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11.1. DEFINITION OF CELLULAR AUTOMA
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11.2. EXAMPLES OF SIMPLE BINARY CEL
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11.3. SIMULATING CELLULAR AUTOMATA
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11.5. EXAMPLES OF BIOLOGICAL CELLUL
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Chapter 12Cellular Automata II: Ana
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12.2. PHASE SPACE VISUALIZATION 211
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12.2. PHASE SPACE VISUALIZATION 213
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12.3. MEAN-FIELD APPROXIMATION 215E
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12.3. MEAN-FIELD APPROXIMATION 217T
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12.4. RENORMALIZATION GROUP ANALYSI
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228 CHAPTER 13. CONTINUOUS FIELD MO
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OutIn232 CHAPTER 13. CONTINUOUS FIE
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296 CHAPTER 15. BASICS OF NETWORKSg
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298 CHAPTER 15. BASICS OF NETWORKSi
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300 CHAPTER 15. BASICS OF NETWORKS5
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302 CHAPTER 15. BASICS OF NETWORKSE
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304 CHAPTER 15. BASICS OF NETWORKSC
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306 CHAPTER 15. BASICS OF NETWORKSC
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308 CHAPTER 15. BASICS OF NETWORKSt
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312 CHAPTER 15. BASICS OF NETWORKSs
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314 CHAPTER 15. BASICS OF NETWORKSn
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316 CHAPTER 15. BASICS OF NETWORKSL
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318 CHAPTER 15. BASICS OF NETWORKSJ
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320 CHAPTER 15. BASICS OF NETWORKSF
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322 CHAPTER 15. BASICS OF NETWORKSr
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326 CHAPTER 16. DYNAMICAL NETWORKS
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Chapter 17Dynamical Networks II: An
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17.1. NETWORK SIZE, DENSITY, AND PE
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17.1. NETWORK SIZE, DENSITY, AND PE
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17.2. SHORTEST PATH LENGTH 37717.2
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17.2. SHORTEST PATH LENGTH 379Eccen
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17.3. CENTRALITIES AND CORENESS 381
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17.4. CLUSTERING 387while the numer
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17.5. DEGREE DISTRIBUTION 3891.00.8
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17.5. DEGREE DISTRIBUTION 391er = n
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17.5. DEGREE DISTRIBUTION 393Pk = [
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17.5. DEGREE DISTRIBUTION 395logkda
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17.6. ASSORTATIVITY 397Assortativit
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17.6. ASSORTATIVITY 399>>> nx.degre
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17.7. COMMUNITY STRUCTURE AND MODUL
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17.7. COMMUNITY STRUCTURE AND MODUL
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406CHAPTER 18. DYNAMICAL NETWORKS I
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Page 435 and 436: 416CHAPTER 18. DYNAMICAL NETWORKS I
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Page 485: 466 BIBLIOGRAPHY[12] “The Human C
Page 489 and 490: 470 BIBLIOGRAPHY[65] P. Holme and J
Page 492 and 493: Indexaction potential, 202actor, 29
Page 494 and 495: INDEX 475equilibrium point, 61, 111
Page 496 and 497: INDEX 477partial differential equat
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