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1. Numerical methods for ODEs Ordinary differential equations (ODEs)
Dynamical system
Widely applications in science & engineering
Mixture problem
Population models
Point-mass motion
Mechanical vibration
Electrical networks
Pendulum motion, .
2. ODEs Different types
First order ODE
First order ODEs system
High order ODE
High order ODEs system
Solutions
Existence & uniqueness
Analytical solution
Numerical solution
3. Different numerical methods For first order ODE
Single-step method
Euler, Trapezoidal method
Runge-Kutta methods: RK4 most popular
Stability and convergence
Time-splitting (split-step) method
Integration factor method
Multi-step methods
4. Different numerical methods For first order ODEs system
Direct extension of all methods for first order ODE
For high order ODE
First order ODEs system
Direct discretization
For high order ODE system
First order ODEs system
direct discretization
5. For first order ODE Consider initial-value problem (IVP):
Choose a time step and partition [a,b] into N pieces
Denote
6. Basic numerical methods Ideas: Derivative is the limit of difference
Forward Euler method -- explicit method
Backward Euler method implicit method
7. Basic numerical methods Trapezoidal method sum of forward & backward Euler methods
Taylor expansion
Forward Euler method
Backward Euler method
8. Numerical example The problem
Time step
Forward Euler method
Backward Euler method
Trapezoidal method
9. Numerical results Example:
10. Order of accuracy Local truncation error:
Def: The error at the given step if it is assumed that the previous results are all exact!!
Ways to find:
Replace in the difference equation
Define the local truncation error
Do Taylor expansion & use the ODE
find the leading order term
Order of accuracy: p
11. Order of accuracy Forward Euler method
Local truncation error
Do Taylor expansion (see details in class)
Order of accuracy: first order & explicit
Backward Euler method (exercise)
Order of accuracy: first order & implicit
Trapezoidal method (exercise)
Order or accuracy: second order & implicit
12. Runge-Kutta methods Ideas
Integrate the ODE over the interval
Choose r points in the interval
Evaluate slopes at these points via (forward) Euler method
13. Runge-Kutta methods
Construct the averaged slope
Determine the parameters via Taylor expansion such that the difference method has a given accuracy!!
14. Runge-Kutta methods Forward Euler method -- RK1
Backward Euler method
Trapezoidal method
15. Runge-Kutta methods Second order Runge-Kutta method -- RK2
Choose
Construct slopes
Averaged slope
RK2 method
Determine the three parameters via Taylor expansion (see details in class or exercise)
16. Runge-Kutta methods RK2 (modified Euler method): Order of accuracy: 2 & explicit
RK2 (modified midpoint method): Order of accuracy: 2 & explicit
17. Runge-Kutta methods Fourth order Runge-Kutta method -- RK4
Choose
Construct slopes
Averaged slope
RK4 method
Determine the seven parameters via Taylor expansion (see details in class or exercise)
18. Runge-Kutta methods 4th Order Runge-Kutta method -- most popular!! --- exercise!!
Local Truncation error:
Order of accuracy: 4
Explicit method
19. Numerical example The problem
Exact Solution
Different numerical methods
Forward Euler method (FEM)
Modified Euler method (MEM)
4th order Runge-Kutta method (RK4)
22. Numerical results Example:
23. Numerical results Population of fruitflies:
24. Numerical results Population of fruitflies:
25. ODE demo Some very interesting ODE demo sites:
Interactive Differential Equations
http://www.aw-bc.com/ide/
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