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Jump to navigationJump to search- 02:32, 9 October 2010 diff hist +6 Eigenfunction Matching for a Semi-Infinite Change in Depth →An infinite dimensional system of equations
- 02:30, 9 October 2010 diff hist -6 Eigenfunction Matching for a Semi-Infinite Change in Depth →An infinite dimensional system of equations
- 02:26, 9 October 2010 diff hist 0 Eigenfunction Matching for a Semi-Infinite Change in Depth →Expansion of the potential
- 02:25, 9 October 2010 diff hist +72 N Eigenfunction Matching for a Semi-Infinite Changes in Depth moved Eigenfunction Matching for a Semi-Infinite Changes in Depth to Eigenfunction Matching for a Semi-Infinite Change in Depth current
- 02:25, 9 October 2010 diff hist 0 m Eigenfunction Matching for a Semi-Infinite Change in Depth moved Eigenfunction Matching for a Semi-Infinite Changes in Depth to Eigenfunction Matching for a Semi-Infinite Change in Depth
- 02:25, 9 October 2010 diff hist 0 Eigenfunction Matching for a Semi-Infinite Change in Depth →Governing Equations
- 02:25, 9 October 2010 diff hist -1,207 Eigenfunction Matching for a Semi-Infinite Change in Depth →Solution Method
- 02:21, 9 October 2010 diff hist 0 Eigenfunction Matching for a Semi-Infinite Change in Depth →Governing Equations
- 02:18, 9 October 2010 diff hist -269 Eigenfunction Matching for a Semi-Infinite Change in Depth →Introduction
- 02:18, 9 October 2010 diff hist +8,465 N Eigenfunction Matching for a Semi-Infinite Change in Depth Created page with '{{incomplete pages}} == Introduction == The problem consists of a region to the left with a free water surface and a region to the right with a rigid semi infinite rectangular …'
- 02:17, 9 October 2010 diff hist +92 Category:Eigenfunction Matching Method →Submerged Rectangle
- 03:16, 8 October 2010 diff hist +23 Category:Nonlinear PDE's Course
- 03:16, 8 October 2010 diff hist -2 Burgers Equation
- 03:15, 8 October 2010 diff hist +176 Burgers Equation →Travelling Wave Solution
- 03:13, 8 October 2010 diff hist +7,320 N Burgers Equation Created page with '{{nonlinear waves course | chapter title = Burgers Equation | next chapter = [] | previous chapter = Reaction-Diffusion Systems }} ==Introduction== We have already me…'
- 03:12, 8 October 2010 diff hist +20 Reaction-Diffusion Systems
- 01:33, 4 October 2010 diff hist +2 Conservation Laws for the KdV →Proof of an Infinite Number of Conservation Laws
- 01:33, 4 October 2010 diff hist +27 Conservation Laws for the KdV →Proof of an Infinite Number of Conservation Laws
- 04:29, 2 October 2010 diff hist -91 File:Reaction diffusion.gif current
- 04:28, 2 October 2010 diff hist +16 File:Reaction diffusion.gif
- 23:22, 1 October 2010 diff hist 0 Properties of the Linear Schrodinger Equation →Example 2: Hat Function Potential
- 23:21, 1 October 2010 diff hist +2 Introduction to the Inverse Scattering Transform
- 23:21, 1 October 2010 diff hist +1 Introduction to the Inverse Scattering Transform
- 23:07, 1 October 2010 diff hist +1 Reaction-Diffusion Systems →Solution of the dispersion equation using FFT
- 08:58, 29 September 2010 diff hist -2 Reaction-Diffusion Systems →The discrete Fourier transform
- 08:47, 29 September 2010 diff hist -8 Reaction-Diffusion Systems
- 03:04, 29 September 2010 diff hist 0 Reaction-Diffusion Systems →Solution of the dispersion equation using FFT
- 03:00, 27 September 2010 diff hist +129 Reaction-Diffusion Systems →Solution of the dispersion equation using FFT
- 03:00, 27 September 2010 diff hist -17 Numerical Solution of the KdV
- 03:00, 27 September 2010 diff hist -2 Numerical Solution of the KdV →Numerical Solution to the KdV
- 00:32, 27 September 2010 diff hist +4 Properties of the Linear Schrodinger Equation →Example 1: \delta function potential
- 04:23, 24 September 2010 diff hist +140 Example Calculations for the KdV and IST
- 03:21, 24 September 2010 diff hist +26 Properties of the Linear Schrodinger Equation →Case when \lambda>0
- 03:17, 24 September 2010 diff hist +114 Example Calculations for the KdV and IST
- 03:17, 24 September 2010 diff hist +4 Properties of the Linear Schrodinger Equation →Example: Scattering by a Well
- 03:16, 24 September 2010 diff hist +3 Properties of the Linear Schrodinger Equation →Example \delta function potential
- 03:15, 24 September 2010 diff hist +1 Example Calculations for the KdV and IST →Example 2 Hat Function Potential
- 03:14, 24 September 2010 diff hist +8 Example Calculations for the KdV and IST →Example 2 A Hat Function
- 03:11, 24 September 2010 diff hist +5 Properties of the Linear Schrodinger Equation →Example \delta function potential
- 03:00, 24 September 2010 diff hist +6 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:59, 24 September 2010 diff hist -2 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:58, 24 September 2010 diff hist +8 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:44, 24 September 2010 diff hist -94 Connection betwen KdV and the Schrodinger Equation →Reflectionless Potential
- 02:38, 24 September 2010 diff hist +5 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:34, 24 September 2010 diff hist -27 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:33, 24 September 2010 diff hist -3 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:22, 24 September 2010 diff hist -45 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:16, 24 September 2010 diff hist +30 Connection betwen KdV and the Schrodinger Equation →Reflectionless Potential
- 02:12, 24 September 2010 diff hist +2 Connection betwen KdV and the Schrodinger Equation →Single Soliton Example
- 02:11, 24 September 2010 diff hist -18 Connection betwen KdV and the Schrodinger Equation →Reflectionless Potential
