Discontinuities when computing integration of error functions using integral function
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I am trying to integrate a function over a region in different time intervals. The integration looks something like this.
fun_uz = @(u)1./sqrt(u).*exp(-Z.^2./(2.*u));
fun_Y = @(u)(erf((Y+B)./sqrt(2.*u))-erf((Y-B)./sqrt(2.*u)));
fun_Z = @(u)(erf((X+L+u)./sqrt(2.*u))-erf((X-L+u)./sqrt(2.*u)));
fun = @(u)inc.*fun_uz(u).*fun_Y(u).*fun_Z(u);
fint = integral(fun,0,upperl);
The variable 'upperl' is the upper limit of the integral function. I have to perform this integration over different X,Y, and Z regions and different 'upperl' values. I am getting profiles which are discontinuous for different 'upperl' values. I have shown here profiles at few different 'upperl' values.
I am not able to understand why the discontinuity are occuring, any help is greatly appreciated. Thanks.
6 comentarios
darova
el 19 de Mzo. de 2020
Attach the whole code
Yaswanth Sai
el 19 de Mzo. de 2020
Editada: Yaswanth Sai
el 20 de Mzo. de 2020
darova
el 19 de Mzo. de 2020
I changed line
xs = (-10:1:10)./1000;
Looks ok
Yaswanth Sai
el 19 de Mzo. de 2020
Editada: Yaswanth Sai
el 19 de Mzo. de 2020
Sorry, I forgot to mention, the plots look continuous for the range I have given in the code. They seem to be discontinuous for very large values of 'xs' as shown in the plots I have posted above. For example, for the values mentioned below, the plot is very discontinuous.
xs = (-500:10:10)./1000;
time = 5*10^(-1);
darova
el 19 de Mzo. de 2020
time = 1e-2; % The variable which is changed to generate different contour plots
xs = (-500:10:10)./1000;
Yaswanth Sai
el 19 de Mzo. de 2020
Respuesta aceptada
darova
el 19 de Mzo. de 2020
The function you are trying to integrate looks like following
Put these lines inside for loops
ezplot(fun,[0 upperl])
pause(0.01)
When time > 0.1 upperl is big. When you call integral you don't know how many points it takes. Maybe it misses something
5 comentarios
Yaswanth Sai
el 20 de Mzo. de 2020
Walter Roberson
el 20 de Mzo. de 2020
Use the waypoints option of integral() if you can.
Yaswanth Sai
el 20 de Mzo. de 2020
Walter Roberson
el 20 de Mzo. de 2020
I do not see the whole code posted ?
Yaswanth Sai
el 20 de Mzo. de 2020
Más respuestas (1)
Walter Roberson
el 20 de Mzo. de 2020
Change the integral to
fint = integral(fun,0,upperl, 'waypoints', L-X);
You have two erf that only have an input near 0 (and so a measurable output) near-ish -(X+L) to -(X-L) . Some of your integral() calls just happened to evaluate near there, and some of them did not happen to evaluate near there and predicted that there was nothing interesting in that area. The above forces evaluation near that area.
1 comentario
Yaswanth Sai
el 20 de Mzo. de 2020
Editada: Yaswanth Sai
el 20 de Mzo. de 2020
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