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PDE Dynamics: An Introduction [Pehme köide]

  • Formaat: Paperback / softback, 267 pages, kaal: 563 g
  • Sari: Mathematical Modeling and Computation
  • Ilmumisaeg: 30-Jun-2019
  • Kirjastus: Society for Industrial & Applied Mathematics,U.S.
  • ISBN-10: 1611975654
  • ISBN-13: 9781611975659
Teised raamatud teemal:
PDE Dynamics: An IntroductionSuurem pilt
  • Formaat: Paperback / softback, 267 pages, kaal: 563 g
  • Sari: Mathematical Modeling and Computation
  • Ilmumisaeg: 30-Jun-2019
  • Kirjastus: Society for Industrial & Applied Mathematics,U.S.
  • ISBN-10: 1611975654
  • ISBN-13: 9781611975659
Teised raamatud teemal:
Püsilink: https://www.kriso.ee/db/9781611975659.html
Märksõnad:
This book provides an overview of the myriad methods for applying dynamical systems techniques to PDEs and highlights the impact of PDE methods on dynamical systems. Also included are many nonlinear evolution equations, which have been benchmark models across the sciences, and examples and techniques to strengthen preparation for research.

PDE Dynamics: An Introduction is intended for senior undergraduate students, beginning graduate students, and researchers in applied mathematics, theoretical physics, and adjacent disciplines. Structured as a textbook or seminar reference, it can be used in courses titled Dynamics of PDEs, PDEs 2, Dynamical Systems 2, Evolution Equations, or Infinite-Dimensional Dynamics.
Preface;
Course Design;
1 A Whirlwind Introduction;
2 Some ODE Theory and Geometric Dynamics;
3 Some PDE Theory and Functional Analysis;
4 Implicit Functions and Lyapunov-Schmidt;
5 Crandall-Rabinowitz and Local Bifurcations;
6 Stability and Spectral Theory;
7 Existence of Travelling Waves;
8 Pushed and Pulled Fronts;
9 Sturm-Liouville and Stability of Travelling Waves;
10 Exponential Dichotomies and Evans Function;
11 Characteristics and Shocks;
12 Onset of Patterns and Multiple Scales;
13 Validity of Amplitude Equations;
14 Semigroups and Sectorial Operators;
15 Dissipation and Absorbing Sets;
16 Nonlinear Saddles and Invariant Manifolds;
17 Spectral Gap and Inertial Manifolds;
18 Attractors and the Variational Equation;
19 Lyapunov Exponents and Fractal Dimension;
20 Metastability and Manifolds;
21 Exponentially Small Terms;
22 Coarsening Bounds and Scaling;
23 Gradient Flows and Lyapunov Functions;
24 Entropies and Global Decay;
25 Convexity and Minimizers;
26 Mountain Passes and Periodic Waves;
27 Hamiltonian Dynamics and Normal Forms;
28 Empirical Measures and the Mean Field;
29 Two Effects: Hypocoercivity and Turing;
30 Blow-up in Cross-Diffusion Systems;
31 Self-Similarity and Free Boundaries;
32 Spirals and Symmetry;
33 Averaging and Ergodicity;
34 Two-Scale Convergence;
35 Asymptotics and Layers;
36 Fast-Slow Systems: Periodicity and Chaos;
A Finite Differences and Simulation;
B Finite Elements and Continuation;
Bibliography;
Index.
Christian Kuehn is Lichtenberg Professor for Multiscale and Stochastic Dynamics at Technical University of Munich and has worked at the Max Planck Institute for Physics of Complex Systems and Vienna University of Technology as a postdoctoral fellow. He has been an MFO Leibniz Fellow and an APART Fellow of the Austrian Academy of Sciences, and he is a recipient of the Richard von Mises Prize for his contributions to nonlinear dynamics. His research interests lie at the interface of differential equations, dynamical systems, and mathematical modelling, and his key goal is analyzing multiscale problems and the effect of noise/uncertainty in various classes of ordinary, partial, and stochastic differential equations as well as in adaptive networks.