Nonlinear phenomena and instabilities arise in all fields of physics,
chemistry, biology, and engineering. The book consists of six chapters.
Chapter 1 contains preliminary topics from analysis: elements of set
theory, measure theory, integration theory, asymptotic expansions,
continued fractions and Pad'e approximations. Chapters 2 and 3 are
devoted to basic and advanced methods of ODE's and their visualization:
attractors, fractals, bifurcations, chaos, and elements of stability
theory. Chapter 4 studies analytical and geometrical aspects of
perturbation theory and contains many examples. Chapter 5 represents the
basic knowledge in turbulence theory and introduces to
Richardson-Kolmogorov concept, deals with bifurcations in
Kuramoto-Sivashinsky equation, and develops multifractal and
hierarchical (shell) models of turbulence. The main hydrodynamic
instabilities (Rayleigh-Taylor, Kelvin-Helmholtz, and Richtmyer-Meshkov)
are studied in Chapter 6. The book contains theoretical and practical
materials, examples and exercises and can be recommended to students and
specialists of mathematics and physics, chemistry, biology and
engineering.