NONLINEAR DYNAMICS

NON-LINEAR DYNAMICS and APPLICATIONS for PHYSICS
(work in progress, stay tuned)

Much of this blog article is my interpretation of things learned from Cornell University Mathematics professor Dr. Stephen Strogatz's 1994 book:  Nonlinear Dynamics and Chaos, with Applications to Physics, Biology, Chemistry and Engineering

Outline

I. Dynamics - HISTORY
II. Dynamics - Mathematics - forthcoming, see Calculus IV in the meantime 
III. Linear Dynamics - Applications in Physics
IV. Nonlinear Dynamics - Applications in Physics
V. Nonlinear Dynamics - Applications in Other Fields
VI. Personal History

I. Dynamics - HISTORY

A. Issac Newton - Differential Equations and the Two-Body Problem
B. Henri Poincaré - Qualitative Geometric Approach; Chaos
C. Early-Mid 20th Century Mathematicians (Birkhoff, Kolmogorov, Arnold, Moser)- Nonlinear oscillators; Complex behavior in Hamiltonian mechanics
D. Edward Lorenz - 1963 Discovery of Chaotic Motion on a Strange Attractor
E. 1970's Mathematicians (Ruelle & Takens, May, Mandelbrot) - Turbulence in Fluids; Population Biology; Fractals
F. 1970's Physics - Mitchell Feigenbaum: Universality and renormalization; Chaos and Phase transitions linked
G. 1970's Biology - Arthur Winfree: Nonlinear oscillators in biology
H. 1980's to present - Widespread interest in chaos, fractals, oscillators and their applications

II. Dynamics - Mathematics - forthcoming

III. Linear Dynamics - Applications in Physics
      
     A. N= 1 variable (Growth, Decay, or Equilibrium)
          
          1. Exponential Growth
          2. RC Circuit
          3. Radioactive decay 

      B. N=2 variables (Oscillations)

          1. Linear oscillator
          2. Mass and spring
          3. RLC Circuit
          4. 2-body problem (Kepler, Newton)

     C. N>=3 variables

          1. Civil engineering, structures
          2. Electrical Engineering
     
     D. N >>> 1 variables (Collective phenomena)

          1. Coupled harmonic oscillators
          2. Solid-state physics
          3. Molecular dynamics
          4. Equilibrium statistical dynamics

     E. Continuum (Waves and patterns)

          1. Elasticity
          2. Wave equations
          3. Electromagnetism (Maxwell)
          4. Quantum mechanics (Schrodinger, Heisenberg, Dirac)
          5. Heat and diffusion
          6. Acoustics
          7. Viscous fluids
 

IV. Nonlinear Dynamics - Applications in Physics

       A. N=1 variable

          1. Fixed points
          2. Bifurcations
          3. Overdamped systems, relaxation mechanics
          4. Logistic equation for single species

       B. N=2 variables
          
          1. Pendulum
          2. Anharmonic oscillators
          3. Limit cycles
          4. Biological oscillators (neurons, heart cells)
     
      C. N>=3 variables  (Chaos)

          1. Strange attractors  (Lorenz)
          2. 3-body problem (Poincare)
          3. Chemical kinetics
          4. Iterated maps (Feigenbaum)
          5. Fractals (Mandelbrot)
          6. Forced nonlinear oscillators (Levinson, Smale)
          7. Practical uses of chaos
          8. Quantum chaos ?

       D. N >>> 1 variables

          1.  Coupled nonlinear oscillators
          2. Lasers, nonlinear optics
          3. Nonequilibrium statistical mechanics
          4. Nonlinear solid-state physics (semiconductors)
          5. Josephson arrays
          6. Heart cell synchronization
          7. Neural networks
          8. Immune systems
          9. Ecosystems
          10. Economics

       E. Continuum  (Spatio-temporal complexity)

          1. Nonlinear waves (shocks, solitons)
          2. Plasmas
          3. Earthquakes
          4. General Relativity (Einstein)
          5. Quantum field theory
          6. Reaction-diffusion, biological and chemical waves
          7. Fibrillation
          8. Epilepsy
          9. Turbulent fluids (Navier-Stokes)
          42. Life
 

V. Nonlinear Dynamics - Applications in Other Fields - forthcoming


Click here  to see a highly interactive version of Brian Castellani's Complexity Map, as shown below:

VI. Personal History

      I'm as happy as a Philosophy Grad Student at the beginning of  his first lecture of his first teaching job teaching "Introduction to Plato". *

Why?

Because, I've finally found my specialty, thanks to United Parcel Service delivering the following book from Amazon to my doorstep yesterday:

By the way, I really hate, loathe and despise the term "Chaos Theory." The proper description would be "Structure-in-Chaos" Theory. It's young, it's happening, it's taking off in many different fields, and the high-speed computers of Computer Scientists and their wonderful Algorithms are its very best friend. We have miles to go before we sleep. Time to get cracking! :-)

From Wikipedia, at which an input of "Nonlinear Dynamics" directs to "Nonlinear differential equations" under "Nonlinear systems." Under that section it states:

A system of differential equations is said to be nonlinear if it is not a linear system. Problems involving nonlinear differential equations are extremely diverse, and methods of solution or analysis are problem dependent. Examples of nonlinear differential equations are the Navier–Stokes equations in fluid dynamics, the Lotka–Volterra equations in biology, and the Black–Scholes PDE in finance.
One of the greatest difficulties of nonlinear problems is that it is not generally possible to combine known solutions into new solutions. In linear problems, for example, a family of linearly independent solutions can be used to construct general solutions through the superposition principle. A good example of this is one-dimensional heat transport with Dirichlet boundary conditions, the solution of which can be written as a time-dependent linear combination of sinusoids of differing frequencies; this makes solutions very flexible. It is often possible to find several very specific solutions to nonlinear equations, however the lack of a superposition principle prevents the construction of new solutions.

Going to the top of the page:
 
In mathematics, a nonlinear system is a system which is not linear, that is, a system which does not satisfy the superposition principle, or whose output is not proportional to its input. Less technically, a nonlinear system is any problem where the variable(s) to be solved for cannot be written as a linear combination of independent components. A nonhomogeneous system, which is linear apart from the presence of a function of the independent variables, is nonlinear according to a strict definition, but such systems are usually studied alongside linear systems, because they can be transformed to a linear system of multiple variables.
Nonlinear problems are of interest to physicists and mathematicians because most physical systems are inherently nonlinear in nature. Nonlinear equations are difficult to solve and give rise to interesting phenomena such as chaos. The weather is famously nonlinear, where simple changes in one part of the system produce complex effects throughout.

And that's it for today. For all my regular readers (all 4 of you ... it would be 5 but Mom passed away in 2008) I'm afraid I will spend less time on-line and at this blog, as I have much to read. I won't go away completely, but for the most part I'll be incognito. Cheers and farewell, and here's hoping I do Mom proud, wherever she is, when I publish my first paper in 6 months to 3 years, or so.

* - most of whom start off with: "I am SO ENVIOUS of you people! You are about to hear about Plato for the FIRST time!" They have their point.

Sincerely,
S'Colyer

P.S. For your viewing and listening pleasure (subjective), a VERY non-linear song:



Here is the Number One most popular song in America today, Empire State of Mind by Jay-Z and Alicia Keys. Keys' bits are beautifully linear, Jay-Z's nonlinear. Somehow, they blend well: