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Differential geometry. Global analysis --- Vector fields. --- Singularities (Mathematics) --- Champs vectoriels. --- Singularités (mathématiques) --- Vector fields --- Direction fields (Mathematics) --- Fields, Direction (Mathematics) --- Fields, Slope (Mathematics) --- Fields, Vector --- Slope fields (Mathematics) --- Vector analysis --- Geometry, Algebraic

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Differential geometry. Global analysis --- Differentiable dynamical systems --- Vector fields --- Symmetry --- Direction fields (Mathematics) --- Fields, Direction (Mathematics) --- Fields, Slope (Mathematics) --- Fields, Vector --- Slope fields (Mathematics) --- Vector analysis --- Aesthetics --- Proportion --- Differential dynamical systems --- Dynamical systems, Differentiable --- Dynamics, Differentiable --- Differential equations --- Global analysis (Mathematics) --- Topological dynamics --- Differentiable dynamical systems. --- Symmetry. --- Vector fields. --- Géometrie différentielle --- Mécanique analytique --- Systèmes dynamiques

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Differential geometry. Global analysis --- 51 --- Differential equations --- Limit cycles --- Vector fields --- Direction fields (Mathematics) --- Fields, Direction (Mathematics) --- Fields, Slope (Mathematics) --- Fields, Vector --- Slope fields (Mathematics) --- Vector analysis --- Cycles, Limit --- Limit cycles of differential equations --- Differentiable dynamical systems --- Equations, Differential --- Bessel functions --- Calculus --- Mathematics --- 517.91 Differential equations --- 51 Mathematics --- 517.91. --- Numerical solutions --- 517.91

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From the reviews: "This book is concerned with the application of methods from dynamical systems and bifurcation theories to the study of nonlinear oscillations. Chapter 1 provides a review of basic results in the theory of dynamical systems, covering both ordinary differential equations and discrete mappings. Chapter 2 presents 4 examples from nonlinear oscillations. Chapter 3 contains a discussion of the methods of local bifurcation theory for flows and maps, including center manifolds and normal forms. Chapter 4 develops analytical methods of averaging and perturbation theory. Close analysis of geometrically defined two-dimensional maps with complicated invariant sets is discussed in chapter 5. Chapter 6 covers global homoclinic and heteroclinic bifurcations. The final chapter shows how the global bifurcations reappear in degenerate local bifurcations and ends with several more models of physical problems which display these behaviors." #Book Review - Engineering Societies Library, New York#1 "An attempt to make research tools concerning 'strange attractors' developed in the last 20 years available to applied scientists and to make clear to research mathematicians the needs in applied works. Emphasis on geometric and topological solutions of differential equations. Applications mainly drawn from nonlinear oscillations." #American Mathematical Monthly#2

Nonlinear oscillations --- Vector fields --- Oscillations non linéaires --- Champs vectoriels --- Direction fields (Mathematics) --- Fields, Direction (Mathematics) --- Fields, Slope (Mathematics) --- Fields, Vector --- Slope fields (Mathematics) --- Vector analysis --- Stability --- Nonlinear oscillations. --- Vector fields. --- Oscillations non linéaires --- Théorie de la bifurcation --- Bifurcation theory --- Differentiable dynamical systems --- #TELE:SISTA --- 517.9 --- 517.9 Differential equations. Integral equations. Other functional equations. Finite differences. Calculus of variations. Functional analysis --- Differential equations. Integral equations. Other functional equations. Finite differences. Calculus of variations. Functional analysis --- Nonlinear theories --- Oscillations --- Differential dynamical systems --- Dynamical systems, Differentiable --- Dynamics, Differentiable --- Differential equations --- Global analysis (Mathematics) --- Topological dynamics --- Differential equations, Nonlinear --- Numerical solutions --- Differential geometry. Global analysis --- Dynamique différentiable --- Bifurcation, Théorie de la --- Bifurcation theory. --- Differentiable dynamical systems. --- Dynamique différentiable --- Oscillations non linéaires. --- Dynamique différentiable. --- Bifurcation, Théorie de la. --- Champs vectoriels.