Structural Stability, Catastrophe Theory, and Applied Mathematics - PowerPoint PPT Presentation

1 / 17
About This Presentation
Title:

Structural Stability, Catastrophe Theory, and Applied Mathematics

Description:

Structural Stability, Catastrophe Theory, and Applied Mathematics ... Control Theory then tries to define functions u(t) in such a way as to have the ... – PowerPoint PPT presentation

Number of Views:88
Avg rating:3.0/5.0
Slides: 18
Provided by: EJLL
Category:

less

Transcript and Presenter's Notes

Title: Structural Stability, Catastrophe Theory, and Applied Mathematics


1
Structural Stability, Catastrophe Theory, and
Applied Mathematics
  • The John von Neumann Lecture, 1976 by René Thom
  • Presented by Edgar Lobaton

2
René Thom (Sep 2, 1923 Oct 25, 2002)
  • Born in Montbéliard, France
  • His early work was on differential geometry
  • He then worked on singularity theory
  • Developed Catastrophe Theory between 1968-1972
  • Received the Fields Medal in 1958

3
Catastrophe Theory (CT)
  • CT emphasizes the qualitative aspect of empirical
    situations
  • The truth is that CT is not a mathematical
    theory, but a body of ideas, I daresay a state
    of mind.

4
Dynamical Systems
  • Dynamics
  • Equilibrium Points
  • For discrete systems these are also called fixed
    points. For example, Newton Iteration for finding
    roots of polynomials. We can extend this
    definition to Attractor sets.

5
Finding Basins of Attractions
  • For example we can analyze the Julia set for
    which we have a discrete system with a rational
    function on the right hand side.
  • We Iterate and color the initial condition based
    on the attractor set to which it converges
  • The RHS has parameters to set, we consider fixed
    values for these computations.

6
(No Transcript)
7
(No Transcript)
8
(No Transcript)
9
Bifurcations
  • There are parameters to fix in our dynamics. What
    happens when we change their values?
  • An example is the one-hump function

10
Looking for Equilibrium
  • We are interested on solving the following
    equation as a function of the parameters
  • In control we do this by use of the Implicit
    Function Theorem, with the following assumption
    on the Jacobian

11
Catastrophe Theory
  • Control Theory then tries to define functions
    u(t) in such a way as to have the corresponding
    functions x(t) satisfy some optimality condition.
  • Elementary Catastrophe Theory deals with the
    cases when the Jacobian of F is singular.

12
Structural Stability
  • The singularity shown before is unavoidable,
    i.e., structurally stable under any small Ck
    deformation of the equation F(x,u) 0.
  • However, for something like F(x,u) u-exp(-1/x2)
    where we have a flat contact line, the
    singularity is avoidable (structurally unstable)
    by a small deformation of F.

13
Structural Stability (cont)
  • Another example is Linear Systems
  • If the linear system has no purely imaginary
    eigenvalues then the system is structurally
    stable
  • On the other hand, linear systems with purely
    imaginary eigenvalues are structurally unstable.

14
Structural Stability (cont)
  • It is a known result that for a system with
    finite dimensional states and parameters, there
    exists only a finite number of unavoidable
    singularities.
  • The general idea in Catastrophe Theory is to
    study these unavoidable catastrophe situations.

15
The Potential
  • Our assumption is that for any attractor of any
    dynamical system there is a local Lyapunov
    function.
  • Hence, the equilibrium point is a solution of an
    optimality principle.

16
Final Remarks
  • We still know very little about the global
    problem of catastrophe theory, which is the
    problem of dynamic synthesis, i.e. how to relate
    into a single system a field of local dynamics
  • From my viewpoint, C.T. is fundamentally
    qualitative, and has as its fundamental aim the
    explanation of an empirical morphology.

17
REFERENCES
  • R. Thom, Structural Stability, Catastrophe
    Theory, and Applied Mathematics. 1976
  • http//en.wikipedia.org/wiki/Catastrophe_theory
  • http//en.wikipedia.org/wiki/Julia_set
  • http//perso.orange.fr/l.d.v.dujardin/ct/eng_index
    .html
  • M. Demazure, Bifurcations and Catastrophes, 2000.
    (pp 1-11)
  • S. Sastry, Nonlinear Systems Analysis, Stability
    and Control, 1999. (pp 4-10)
Write a Comment
User Comments (0)
About PowerShow.com