Numerical Integration instability - integral()
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I have a problem with the stability of the following integral.
As you can see in the plot, matlab has problems to approximate the integral. In reality the limits of the integral are 0 and Inf.
I tried to vary the integration limits to see what happens.
How can i solve this problem?
Thanks!
f = 100e3; % frequency
w = 2*pi*f;
u0 = 4 * pi * 1e-7; % magnetic permeability of vacuum
N = 66; % no. of coil turns
r1 = 0.01; % coil inner radius
r2 = 0.02; % coil outher radius
z1 = 0.002; % coil base heigth
z2 = 0.01; % coil top heigth
Bessel_integrand = @(x) x .* besselj(1,x);
Integrand_0 = @(a) 1./(a.^6) .* (a .* (z2 - z1) + exp(-a .* (z2 - z1)) - 1) .* integral(Bessel_integrand,a .* r1, a .* r2).^2;
vec = logspace(1,7,100);
for k = 1:1:length(vec)
Z_0 = 1i .* pi .* w .* u0 .* N^2 / ((r2 - r1).^2 .* (z2 - z1).^2) .* integral(Integrand_0, 0, vec(k),"ArrayValued",true);
L_0(k) = imag(Z_0)./w*10^6; % air impedance in micro henry
end
plot(vec,L_0);
6 comentarios
Torsten
el 27 de Mzo. de 2023
I think the integration is ok, but you have too few values to capture the function correctly in the plot.
Martin
el 27 de Mzo. de 2023
What does "better" mean ? And what upper limit ?
Remember that (10^7)^6 = 10^42 in the denominator of your function to be integrated for the range of "vec" you selected.
f = 100e3; % frequency
w = 2*pi*f;
u0 = 4 * pi * 1e-7; % magnetic permeability of vacuum
N = 66; % no. of coil turns
r1 = 0.01; % coil inner radius
r2 = 0.02; % coil outher radius
z1 = 0.002; % coil base heigth
z2 = 0.01; % coil top heigth
Bessel_integrand = @(x) x .* besselj(1,x);
Integrand_0 = @(a) 1./(a.^6) .* (a .* (z2 - z1) + exp(-a .* (z2 - z1)) - 1) .* integral(Bessel_integrand,a .* r1, a .* r2).^2;
vec = linspace(0,10000,1000);
for k = 1:1:length(vec)
Z_0 = 1i .* pi .* w .* u0 .* N^2 / ((r2 - r1).^2 .* (z2 - z1).^2) .* integral(Integrand_0, 0, vec(k),"ArrayValued",true);
L_0(k) = imag(Z_0)./w*10^6; % air impedance in micro henry
end
plot(vec,L_0);
Martin
el 28 de Mzo. de 2023
Walter Roberson
el 28 de Mzo. de 2023
By the way:
I switched to symbolic calculations and tried to calculate for vec = 100. The numeric integration for that one value alone went on for several hours until I killed it. This indicates that the curve is very bumpy -- probably too bumpy to be able to get an accurate answer using double precision.
Bjorn Gustavsson
el 29 de Mzo. de 2023
The likely root of the problem is the x*besselj(x) integrand - that will be an oscilating function with an amplitude that grows approximately as 
. Perhaps one way around this is to replace the call to besselj with its power-series expansion and work out the integrals from that and see if the result becomes something identifiable.
. Perhaps one way around this is to replace the call to besselj with its power-series expansion and work out the integrals from that and see if the result becomes something identifiable.Respuestas (0)
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