04325nam 22007695 450 991101562180332120250716130243.03-031-84828-410.1007/978-3-031-84828-5(CKB)39664117100041(MiAaPQ)EBC32227371(Au-PeEL)EBL32227371(DE-He213)978-3-031-84828-5(OCoLC)1530384539(EXLCZ)993966411710004120250716d2025 u| 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierChaotic Maps, Fractals, and Rapid Fluctuations With Applications to Chaotic Vibration of the Wave Equation /by Liangliang Li, Yu Huang, Goong Chen2nd ed. 2025.Cham :Springer Nature Switzerland :Imprint: Springer,2025.1 online resource (406 pages)Synthesis Lectures on Mathematics & Statistics,1938-17513-031-84827-6 Simple Interval Maps and Their Iterations -- Total Variations of Iterates of Maps -- Ordering among Periods: The Sharkovski Theorem -- Bifurcation Theorems for Maps -- Homoclinicity. Lyapunoff Exponents -- Symbolic Dynamics, Conjugacy and Shift Invariant Sets -- The Smale Horseshoe -- Fractals -- Rapid Fluctuations of Chaotic Maps on RN -- Infinite-dimensional Systems Induced by Continuous-Time Difference Equations.This book was developed from lecture notes for an introductory graduate course and provides an essential introduction to chaotic maps in finite-dimensional spaces. Furthermore, the authors show how to apply this theory to infinite-dimensional systems corresponding to partial differential equations to study chaotic vibration of the wave equation subject to various types of nonlinear boundary conditions. The book provides background on chaos as a highly interesting nonlinear phenomenon and explains why it is one of the most important scientific findings of the past three decades. In addition, the book covers key topics including one-dimensional dynamical systems, bifurcations, general topological, symbolic dynamical systems, and fractals. The authors also show a class of infinite-dimensional nonlinear dynamical systems, which are reducible to interval maps, plus rapid fluctuations of chaotic maps. This second edition includes updated and expanded chapters as well as additional problems. In addition, this book: • Provides an overview of chaos in a comprehensive way and contains applications to partial differential equations • Includes numerous problems allowing readers to practice and apply the presented concepts • Focuses on presenting the material in a concise, easily readable way that is suitable for a beginning textbook About the Authors Liangliang Li, Ph.D., is an Associate Professor at Sun Yat-Sen University. Yu Huang, Ph.D., is an Associate Professor at Sun Yat-Sen University. Goong Chen, Ph.D., is a Professor of Mathematics at Texas A&M University in Qatar at Doha, Qatar.Synthesis Lectures on Mathematics & Statistics,1938-1751DynamicsEngineering mathematicsMathematical analysisTopologyDynamicsNonlinear theoriesMathematicsDynamical SystemsEngineering MathematicsAnalysisTopologyApplied Dynamical SystemsMathematicsDynamics.Engineering mathematics.Mathematical analysis.Topology.Dynamics.Nonlinear theories.Mathematics.Dynamical Systems.Engineering Mathematics.Analysis.Topology.Applied Dynamical Systems.Mathematics.515.39Li Liangliang1835004Huang Yu1060523Chen Goong66188MiAaPQMiAaPQMiAaPQBOOK9911015621803321Chaotic Maps, Fractals, and Rapid Fluctuations4410699UNINA