Last change
on this file since 97 was 33, checked in by Rick van der Zwet, 15 years ago |
Restored acc. version
|
File size:
1.3 KB
|
Rev | Line | |
---|
[27] | 1 | %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
---|
| 2 | % This function calculates the Second Harmonic Generation
|
---|
| 3 | % of a Gaussian of frequencies with a given phase function.
|
---|
| 4 | %
|
---|
| 5 | % phi - an input COLUMN vector, containing the phase function.
|
---|
| 6 | % SHG - the output of the calculation; scalar.
|
---|
| 7 | %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
---|
| 8 |
|
---|
| 9 | function [SHG] = SHG(phi);
|
---|
| 10 |
|
---|
| 11 | %constant for consistency with the Fortran Calculation...
|
---|
| 12 | c_fortran = 153.7687;
|
---|
| 13 |
|
---|
| 14 | % Generate the Gaussian and the phase function consistently.
|
---|
| 15 | Np = length(phi(:,1));
|
---|
| 16 | Nv = 4000;
|
---|
| 17 | v = linspace(-300,300,Nv); %Linearly Spaced Vector
|
---|
| 18 | G = 40;
|
---|
| 19 | Ain = exp(-(v/G).^2); %The Gaussian of Frequencies
|
---|
| 20 |
|
---|
| 21 | %Distribute the phase function according to the desired resolution
|
---|
| 22 | step = round((2600-1400)/Np);
|
---|
| 23 | step = step + (step==1);
|
---|
| 24 | phase = zeros(1,Nv);
|
---|
| 25 | k = 1;
|
---|
| 26 | for j = 1400:step:2600-step+1,
|
---|
| 27 | phase([j:j+step-1]) = phi(k);
|
---|
| 28 | if (k < Np)
|
---|
| 29 | k = k+1;
|
---|
| 30 | else
|
---|
| 31 | k = Np;
|
---|
| 32 | end
|
---|
| 33 | end
|
---|
| 34 | % *** The Core: SHG *** %
|
---|
| 35 |
|
---|
| 36 | %Fourier Transform with phase shift (phi) on the Gaussian *Ain*
|
---|
| 37 | E_t = fftshift(ifft(fftshift(exp(i*phase).*Ain)));
|
---|
| 38 |
|
---|
| 39 | %plot(abs(E_t));
|
---|
| 40 | %Integrate the result to yield the SHG
|
---|
| 41 | SHG = sum(abs(E_t).^4)/c_fortran;
|
---|
| 42 |
|
---|
| 43 |
|
---|
| 44 | %%%%%%%%%%%%%%%%%%%%%%%%%%% E O F %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
|
---|
Note:
See
TracBrowser
for help on using the repository browser.