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1. Coupled Map Lattices: at the Age of Maturity

   Coupled Map Lattices (CML) were simultaneously and independently introduced by K. Kaneko, R. Kapral and S. Kuznetsov in 1983–84 [1, 2, 3, 4, 5, 6]....

   L.A. Bunimovich in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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2. Deterministic Control Theory

   In this chapter we focus our attention on the open loop control of deterministic problems. We will see that the language of deterministic control...

   Michael Schulz in Control Theory in Physics and other Fields of Science

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3. Optimization Problems

   Several problems, for example Pontryagin’s maximum principle or the minimax problems of game theoretical approaches, require the determination of an...

   Michael Schulz in Control Theory in Physics and other Fields of Science

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4. Desynchronization and Chaos in the Kuramoto Model

   Abstract. The Kuramoto model of N globally coupled phase oscillators is an essentially non-linear dynamical system with a rich dynamical behavior and...

   Y.L. Maistrenko, O.V. Popovych, P.A. Tass in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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5. Spatially Extended Monotone Map**s

   This chapter deals with the study of travelling waves in discrete time spatially extended systems with monotone dynamics. Such systems appear for...

   R Coutinho, B Fernandez in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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6. Optimal Control of Stochastic Processes

   Many control problems appearing for complex systems are subject to imperfectly known disturbances. As we have learned in the previous chapter, these...

   Michael Schulz in Control Theory in Physics and other Fields of Science

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7. The CML2004 Project

   Coupled map lattices (CML) are basic models for the time evolution of nonlinear systems which, above all, are extended in space or involve many...

   J.-R. Chazottes, B. Fernandez in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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8. The Frenkel–Kontorova Model

   In the preface to his monograph on the structure of Evolutionary Theory [1], the late professor Stephen Jay Gould attributes to the philosopher...

   L.M. Floría, C Baesens, J. Gómez-Gardeñes in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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9. On Phase Transitions in Coupled Map Lattices

   Coupled map lattices are a paradigm for studying fundamental questions in spatially extended dynamical systems. Within this tutorial we focus on...

   W Just, F Schmüser in Dynamics of Coupled Map Lattices and of Related Spatially Extended Systems

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10. 6 Fundamental “Uncertainty” in Science

    The conference on “Uncertainty and Surprise” was concerned with our fundamental inability to predict future events. How can we restructure...

    Linda E. Reichl in Uncertainty and Surprise in Complex Systems

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11. 17 Uncertainty as Certaint

    I am trying to make money in the biotech industry from complexity science. And I am doing it with inspiration that I picked up on the edge of...

    Tom Petzinger in Uncertainty and Surprise in Complex Systems

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12. 2 Surprises in a Half Century

    Ilya Prigogine participated early in the organization of our meeting and was invited to give a keynote address. Due to poor health he...

    Ilya Prigogine† in Uncertainty and Surprise in Complex Systems

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13. 9 A View from the Inside: The Task of Managing Uncertainty and Surprise

    Let me shift the flow of the day a little bit, because I am not here to present a theory, or prove a theory. Actually, I come here with questions....

    Erich K. Baier in Uncertainty and Surprise in Complex Systems

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14. 4 The Evolutionary Complexity of Social Economic Systems: The Inevitability of Uncertainty and Surprise

    In order to improve our quality of life and the successful functioning of our organisations and social institutions, or to mitigate some anticipated...

    Peter M. Allen, Mark Strathern, James S. Baldwin in Uncertainty and Surprise in Complex Systems

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15. 7 The Complementary Nature of Coordination Dynamics: Toward a Science of the In-Between

    My take-off point in this brief essay is the following comment from the introductory material that all the participants received for the conference...

    J.A. Scott Kelso in Uncertainty and Surprise in Complex Systems

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16. 1 Uncertainty and Surprise: An Introduction

    Much of the traditional scientific and applied scientific work in the social and natural sciences has been built on the supposition that the...

    Reuben R. McDaniel, Dean J. Driebe in Uncertainty and Surprise in Complex Systems

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17. Nonlinear superposition formulae of integrable partial differential equations by the singular manifold method

    We study by the singular manifold method a few 1+1-dimensional partial differential equations which possess N-soliton solutions for arbitrary N, i.e....

    Micheline Musette in Direct and Inverse Methods in Nonlinear Evolution Equations

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18. Results for Sr2RuO4

    In this chapter, we focus on our results for the elementary excitations and Cooper pairing in strontium ruthenate (...

    Dirk Manske in Theory of Unconventional Superconductors

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19. Bilinear Formalism in Soliton Theory

    A brief survey of the bilinear formalism discovered by Hirota is given. First, the procedure to obtain soliton solutions of nonlinear evolution...

    J. Satsuma in Integrability of Nonlinear Systems

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20. Critical Phenomena in a Small World

    We consider the behavior of various systems on a small-world network near a critical point. Our starting point is a different, nonrandom system with...

    Matthew B. Hastings, Balázs Kozma in Complex Networks

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