Loop these vectors into an array?
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I have a function that needs to be integrated.
int = @(x)(1+0.25*sin((P/5)*x*sin(AngRad)+(P/4))).*exp(-1i*2.*x.*cos(AngRad).*K(1));
q01 = integral(int,-L/2,L/2,'ArrayValued',true);
int = @(x)(1+0.25*sin((P/5)*x*sin(AngRad)+(P/4))).*exp(-1i*2.*x.*cos(AngRad).*K(2));
q02 = integral(int,-L/2,L/2,'ArrayValued',true);
%this goes on 35 more times
The value "P" is pi just with more digits, "AngRad" is a 721x1 vector of angles 0-360 degrees in radians, and "K" is originally a 37x1 vector of wave numbers. My goal is to find a way to loop (or some other way) the function and the integral so that I don't have to have 37 different "q01" to form my ultimate matrix which is a 721x37 matrix, a combination of the AngRad and K vectors. How and what is the best way to go about this and save computation time?
Respuesta aceptada
Star Strider
el 17 de Feb. de 2016
I would just index it into a loop:
intfcn = @(x,Kv)(1+0.25*sin((P/5)*x*sin(AngRad)+(P/4))).*exp(-1i*2.*x.*cos(AngRad).*Kv);
for k1 = 1:37
q(:,k1) = integral(@(x)intfcn(x,K(k1)), -L/2,L/2, 'ArrayValued',true);
end
This is UNTESTED CODE (since I can’t test it), but should produce the matrix ‘q’ that you want. It changes your ‘intfcn’ function slightly (I changed its name because int is the Symbolic Math Toolbox integral function, and ‘overshadowing’ built-in MATLAB functions is to be avoided), but you also don’t have to re-define it in the loop each time, so it should be a bit more efficient as well.
2 comentarios
Sean Raffetto
el 17 de Feb. de 2016
Star Strider
el 17 de Feb. de 2016
My pleasure!
I’m not quite certain what function you’re integrating (so I’m not certain how much this will help), but when in doubt, vectorise everything as a first step, unless you want matrix — rather than array — operations:
intfcn = @(x,Kv) (1+0.25.*sin((P/5)*x.*sin(AngRad)+(P/4))).*exp(-1i*2*x.*cos(AngRad).*Kv);
Más respuestas (1)
Walter Roberson
el 17 de Feb. de 2016
tic;
P = 3.14159265358979323846264338328;
AngRad = linspace(0,2*pi,721);
K = round(linspace(380,650,37));
L = sqrt(1/5); %for lack of better value
[RadR, KR] = ndgrid(AngRad, K);
int = @(x) (1+0.25.*sin((P/5).*x.*sin(RadR)).*(exp(-1i.*2.*x.*cos(RadR).*KR)));
q = integral(int, -L/2,L/2, 'ArrayValued', true);
toc
size(q)
Elapsed time is 1.986690 seconds.
ans =
721 37
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