Numerical integration with two parameters

9 visualizaciones (últimos 30 días)
Dimitar
Dimitar el 22 de Ag. de 2022
Comentada: Dimitar el 22 de Ag. de 2022
So I want to integrate the following integral fun = @(t, x, y) (y-t*x+t^2)/(sqrt((x-2*t)^2+(y-t^2)^2)^3). I tried using the quad function (@t from -inf to inf) because the parameters are 'vectors' ie. x=-inf:inf and y=-inf:inf but I don't get an answer. Am I using the correct function or should I do something else, I really can't figure it out. Any answer would be helpful, thanks in advance.
  2 comentarios
Torsten
Torsten el 22 de Ag. de 2022
Editada: Torsten el 22 de Ag. de 2022
I tried using the quad function (@t from -inf to inf) because the parameters are 'vectors' ie. x=-inf:inf and y=-inf:inf
So you are trying to calculate the 3d integral for x=-Inf:Inf and for y=-Inf:Inf and for t=-Inf:Inf of the above function ?
Or is it a one-dimensional integral with fixed values for x and y ?
Dimitar
Dimitar el 22 de Ag. de 2022
Not really, I want to get one more 'vector' of answer with different values of x and y, for example x=0, y=0 the next one being x=0,y=1 etc. And after I get all the answers I want to plot them on a graph Sorry, I don't know how to explain better, I hope you can understand now.

Iniciar sesión para comentar.

Iniciar sesión para responder a esta pregunta.

Respuestas (1)

Torsten
Torsten el 22 de Ag. de 2022
Editada: Torsten el 22 de Ag. de 2022
Ran in:
You should check whether the integral exists when y = x^2/4. In this case, the denominator of fun is 0, and I think you'll have a pole of order 1 at t = x/2. This would mean the integral does not exist.
fun = @(t,x,y)(y-t*x+t.^2)./(sqrt((x-2*t).^2+(y-t.^2).^2).^3);
% Case where y ~= x^2/4
x = 2;
y = 4;
value = integral(@(t)fun(t,x,y),-Inf,Inf)
value = 0.7966
% Case where y = x^2/4
x = 2;
y = 1;
value = integral(@(t)fun(t,x,y),-Inf,Inf)
Warning: Reached the limit on the maximum number of intervals in use. Approximate bound on error is 1.3e-02. The integral may not exist, or it may be difficult to approximate numerically to the requested accuracy.
value = 1.8403
  1 comentario
Dimitar
Dimitar el 22 de Ag. de 2022
I actually succeeded getting results and plotting them, by taking the values of x and y as such: [x, y] = ndgrid(-10:10,-10:10) and adding 'ArrayValued' to the integral function. I just have to figure out how to exclude ie set to 0, the values of the integral where it doesn't exist. Thank you so much!!

Iniciar sesión para comentar.

Categorías

Más información sobre Programming en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by