Problem with definite Integral
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I am trying to solve the following definite double integration numerically. The expressions contain summaitions also but that is being executed within few seconds. When the double integration section comes, it is taking extremy huge time even after 7 hours it is still going on without any output. Any advice will be highly appreciated.
clc;
syms n r theta m p l t
w=1.0;
d=1.0;
g=0.2;
lmd=0.5;
assume(r,'real');
assume(theta,'real');
assume(t, 'real');
om=sqrt(((w).^2)-(4.*(g.^2)));
mu=sqrt((w+om)./(2.*om));
nu=((w-om)./(2.*g)).*mu;
eta=(((lmd)./((2.*g)+w)).*(1+((w-om)./(2.*g)))).*mu;
En=((n+(1./2)).*om)-(w./2)-(((lmd).^2)/((2.*g)+w));
um=((m+(1./2)).*om)-(w./2)-(((lmd).^2)/((2.*g)+w));
Enn=((n-(1./2)).*om)-(w./2)-(((lmd).^2)/((2.*g)+w));
umm=((m-(1./2)).*om)-(w./2)-(((lmd).^2)/((2.*g)+w));
Dn=(d./2).*(exp(-2.*((eta).^(2)))).*(laguerreL(n,(4.*((eta).^2))));
Dm=(d./2).*(exp(-2.*((eta).^(2)))).*(laguerreL(m,(4.*((eta).^2))));
Dnn=(d./2).*(exp(-2.*((eta).^(2)))).*(laguerreL((n-1),(4.*(eta.^2))));
Dmm=(d./2).*(exp(-2.*((eta).^(2)))).*(laguerreL((m-1),(4.*(eta.^2))));
Em=En - Dn;
Um=um-Dm;
Ep=Enn + Dnn;
Up=umm +Dmm;
epsn=(Ep-Em)./2;
epsm=(Up-Um)./2;
Deln=(eta.*d./sqrt(n)).*exp(-2.*(eta.^2)).*laguerreL((n-1),1,(4.*(eta.^2)));
Delm=(eta.*d./sqrt(m)).*exp(-2.*(eta.^2)).*laguerreL((m-1),1,(4.*(eta.^2)));
xn=sqrt(((epsn).^2)+((Deln).^(2)));
xm=sqrt(((epsm).^2)+((Delm).^(2)));
zetapn=sqrt(((xn)+(epsn))./(2.*xn));
zetamn=sqrt(((xn)-(epsn))./(2.*xn));
zetapm=sqrt(((xm)+(epsm))./(2.*xm));
zetamm=sqrt(((xm)-(epsm))./(2.*xm));
z= 1i.*(mu-nu).*eta./(sqrt(2.*mu.*nu));
a1n=(zetapn./sqrt(factorial(n-1))).*((-nu./(2.*mu)).^(-1./2)).*hermiteH(n-1, z);
b1n=(Deln./abs(Deln)).*(zetamn./sqrt(factorial(n))).*hermiteH(n, z);
a2n=(zetamn./sqrt(factorial(n-1))).*((-nu./(2.*mu)).^(-1./2))*hermiteH(n-1, z);
b2n= (Deln./abs(Deln)).*(zetapn./sqrt(factorial(n))).*hermiteH(n, z);
a1m=(zetapm./sqrt(factorial(m-1))).*((-nu./(2.*mu)).^(-1./2)).*hermiteH(m-1, z);
b1m=(Delm./abs(Delm)).*(zetamm./sqrt(factorial(m))).*hermiteH(m, z);
a2m=(zetamm./sqrt(factorial(m-1))).*((-nu./(2.*mu)).^(-1./2))*hermiteH(m-1, z);
b2m= (Delm./abs(Delm)).*(zetapm./sqrt(factorial(m))).*hermiteH(m, z);
c0= -(1./sqrt(2.*mu)).*exp(-((eta.^2)./2)+ ((nu.*(eta).^2)./(2.*mu)));
cpn= -c0.*((-nu./(2.*mu)).^(n./2)).*(a1n - b1n);
cmn= -c0.*((-nu./(2.*mu)).^(n./2)).*(a2n + b2n);
cpm= -c0.*((-nu./(2.*mu)).^(m./2)).*(a1m - b1m);
cmm= -c0.*((-nu./(2.*mu)).^(m./2)).*(a2m + b2m);
E0=(om./2)-(w./2)-(((lmd).^2)./((2.*g)+w));
eg= E0-((d./2).*(exp(-2.*((eta).^(2)))));
ep=(1./2).*(Ep+ Em + (sqrt(((Ep-Em).^2)+(4.*((Deln).^2)))));
em=(1./2).*(Ep+ Em - (sqrt(((Ep-Em).^2)+(4.*((Deln).^2)))));
upp= (1./2).*(Up+ Um + (sqrt(((Up-Um).^2)+(4.*((Delm).^2)))));
umm= (1./2).*(Up+ Um - (sqrt(((Up-Um).^2)+(4.*((Delm).^2)))));
c0t= c0.*exp(-1i.*eg.*t);
cpnt= cpn.*exp(-1i.*ep.*t);
cmnt= cmn.*exp(-1i.*em.*t);
cpmt= cpm.*exp(-1i.*upp.*t);
cmmt= cmm.*exp(-1i.*umm.*t);
Ant=zetapn.*cpnt + zetamn.*cmnt;
Bnt= (Deln./abs(Deln)).*(zetamn.*cptn - zetapn.*cmnt);
Amt= zetapm.*cpmt + zetamm.*cmmt;
Bmt= (Delm./abs(Delm)).*(zetamm.*cpmt - zetapm.*cmmt);
beta= r.*exp(1i.*theta);
guard_digits = 10;
sp11= ((1i.^p)./factorial(p)).*((nu./(2.*mu)).^(p./2)).*hermiteH(p, 1i.*beta./sqrt(2.*mu.*nu)).*(eta.^(p+m)).*hypergeom([-p -m],[], -1./(eta.^2));
Hp11= ((exp(-((eta.^2)./2)-(((abs(beta)).^2)./2)-((beta.^2).*(nu)./(2.*mu))))./sqrt(mu.*factorial(m))).*sum(vpa(subs(sp11,p,1:20), guard_digits));
sp22= (((-1i).^l)./factorial(l)).*((nu./(2.*mu)).^(l./2)).*hermiteH(l, -1i.*conj(beta)./sqrt(2.*mu.*nu)).*(eta.^(l+n)).*hypergeom([-l -n],[], -1./(eta.^2));
Hp22= ((exp(-((eta.^2)./2)-(((abs(beta)).^2)./2)-(((conj(beta)).^2).*(nu)./(2.*mu))))./sqrt(mu.*factorial(n))).*sum(vpa(subs(sp22,l,1:20), guard_digits));
sm11= ((1i.^p)./factorial(p)).*((nu./(2.*mu)).^(p./2)).*hermiteH(p, 1i.*beta./sqrt(2.*mu.*nu)).*(-eta.^(p+m)).*hypergeom([-p -m],[], -1./(eta.^2));
Hm11= ((exp(-((eta.^2)./2)-(((abs(beta)).^2)./2)-((beta.^2).*(nu)./(2.*mu))))./sqrt(mu.*factorial(m))).*sum(vpa(subs(sm11,p,1:20), guard_digits));
sm22= (((-1i).^l)./factorial(l)).*((nu./(2.*mu)).^(l./2)).*hermiteH(l, -1i.*conj(beta)./sqrt(2.*mu.*nu)).*(-eta.^(l+n)).*hypergeom([-l -n],[], -1./(eta.^2));
Hm22= ((exp(-((eta.^2)./2)-(((abs(beta)).^2)./2)-(((conj(beta)).^2).*(nu)./(2.*mu))))./sqrt(mu.*factorial(n))).*sum(vpa(subs(sm22,l,1:20), guard_digits));
Hp1=Hp22.*Hp11;
Hm1=Hm22.*Hm11;
Hp(n,m)= (1./(2.*pi)).*(Hp1 + Hm1);
Hm(n,m)= (1./(2.*pi)).*(Hp1 - Hm1);
f11=((abs(c0t)).^2).*Hp(0,0);
f22= c0t.*conj(Ant).*Hm(0,n-1) + conj(c0t).*Ant.*Hm(n-1,0)+ c0t.*conj(Bnt).*Hp(0,n) + conj(c0t).*Bnt.*Hp(n,0);
f33= Ant.*conj(Amt).*Hp(n-1,m-1) + Bnt.*conj(Bmt).*Hp(n,m) + Bnt.*conj(Amt).*Hm(n,m-1) +Ant.*conj(Bmt).*Hm(n-1,m);
sf33= sum(vpa(subs(f33,m,1:20), guard_digits));
f=f11 + sum(vpa(subs(f22,n,1:20), guard_digits)) + sum(vpa(subs(sf33,n,1:20), guard_digits));
vpaintegral(vpaintegral(f, r, [0 10]), theta, [0 2.*pi]) %% 'r' and 'theta' are integration variable
%int(int(f,r,0,10),theta,0,2*pi)
Réponse acceptée
Ameer Hamza
le 2 Juin 2020
If you check at the expression of 'f', you can see it also has 't'. So even if you try to numerically integrate it w.r.t. 'r' and 'theta', the answer will still be symbolic.
Also, I suggest you to use matlabFunction() to convert the symbolic expression into a floating-point function, which is much faster than the symbolic calculations. For example, instead of vpaintegral(), try this
F = matlabFunction(f, 'Vars', [r theta t]);
int_val = integral2(@(r, theta) F(r, theta, 0), 0, 10, 0, 2*pi)
This assumes that t=0 to get a function in terms of r and theta.
15 commentaires
AVM
le 2 Juin 2020
AVM
le 2 Juin 2020
Ameer Hamza
le 2 Juin 2020
Yes, it put t=0 throughout the calculation. Whether 't' should be present in the final expression depends on the system of the equation you are trying to implement.
AVM
le 2 Juin 2020
Ameer Hamza
le 2 Juin 2020
Do you want 't' to be present in the final expression? Is it the correct way according to your system of equations?
AVM
le 2 Juin 2020
AVM
le 2 Juin 2020
Ameer Hamza
le 2 Juin 2020
Modifié(e) : Ameer Hamza
le 2 Juin 2020
My guess is that there is some mistake in writing the system of equation. I also think 't' should not be present in the expression of 'f'. You may need to check if all equations are written correctly and find out why 't' is not vanishing in the final expression of 'f'.
The way I am doing it (putting t=0) does not seems to be a correct solution to me. I just gave it as an example to show how integral2 works. From your question, it appears that the expression of 'f' should only contain r and theta.
Note that t=0 is just an arbitrary choice. You can choose t=1 (or any other constant value), and the integral will still work.
AVM
le 2 Juin 2020
Ameer Hamza
le 3 Juin 2020
I am not sure why it is taking such a long time now. Maybe keep 't' as variable as you did in previous code and then put t=0 after conversion to function handle as I did in my answer.
AVM
le 3 Juin 2020
Ameer Hamza
le 3 Juin 2020
This is caused by the complexity of your system of equations. I don't think there is a way to improve the calculation further in MATLAB. It will need to decrease the complexity of your equations somehow to get any speed improvement.
AVM
le 7 Juin 2020
AVM
le 7 Juin 2020
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