symbolic calculation error in code
Mostrar comentarios más antiguos
syms x n
syms t
% syms m
% m=0.7;
U=zeros(1,2,'sym');
A=zeros(1,2,'sym');
B=zeros(1,2,'sym');
U(1)=exp((sqrt(2)*x)/4)/(exp((sqrt(2)*x)/4)+exp(-(sqrt(2)*x)/4));
for k=1:10
A(1)=0;
B(1)=0;
for i=1:k
A(1)=A(1)+U(i)*U(k-i+1) ;
end
for j=1:k
for r=1:j
B(1)=U(r)*U(j-r+1)*U(k-r+1);
end
end
U(k+1)=((diff(U(k),x,2)-B(1)+2*A(1)-U(k)))/k;
end
disp (U)
for k=1:10
series(x,t)=series(x,t)+U(k)*(power(t,k-1));
end
series
C=zeros(5,5);
for x=1:5
e=(x-1)/1;
for t=1:5
f=(t-1)/10;
C(x,t)=series(e,f)
end
end
vpa(C,15)
This code is not showing the answer.BUSY is also shown in the workspace.
Respuesta aceptada
tic
syms x n
syms t
% syms m
% m = 0.7;
U = zeros(1,2,'sym');
A = zeros(1,2,'sym');
B = zeros(1,2,'sym');
U(1) = simplify(exp((sqrt(2)*x)/4)/(exp((sqrt(2)*x)/4)+exp(-(sqrt(2)*x)/4)));
for k = 1:10
A(1) = 0;
B(1) = 0;
for i = 1:k
A(1) = simplify(A(1)+U(i)*U(k-i+1)) ;
end
for j = 1:k
for r = 1:j
B(1) = simplify(U(r)*U(j-r+1)*U(k-r+1));
end
end
U(k+1) = simplify(((diff(U(k),x,2)-B(1)+2*A(1)-U(k)))/k);
%disp(U(k+1))
end
disp (U)
for k = 1:10
series(x,t) = simplify(series(x,t)+U(k)*(power(t,k-1)));
end
series
C = zeros(5,5);
for x = 1:5
e = (x-1)/1;
for t = 1:5
f = (t-1)/10;
C(x,t) = series(e,f);
end
end
vpa(C,15)
toc
7 comentarios
YOGESHWARI PATEL
el 23 de Mzo. de 2021
Walter Roberson
el 23 de Mzo. de 2021
The 
and so on were displayed automatically by Live Script in order to make the expression easier to read. If you are using the regular editor instead of Live Script then you can use pretty() to get something similar.
and so on were displayed automatically by Live Script in order to make the expression easier to read. If you are using the regular editor instead of Live Script then you can use pretty() to get something similar.
YOGESHWARI PATEL
el 24 de Mzo. de 2021
YOGESHWARI PATEL
el 24 de Mzo. de 2021
Walter Roberson
el 24 de Mzo. de 2021
Your expression gets more and more complicated as k increases, and it takes longer and longer to simplify.
However, simplification is still called for because it reduces the rate at which A and B and U get more complicated.
15 took about 201 seconds on my system. The time required appears to increase with approximately the square of k.
tic
maxk = 15;
syms x n
syms t
% syms m
% m = 0.7;
U = zeros(maxk+1,1,'sym');
A = zeros(1,1,'sym');
B = zeros(1,1,'sym');
wb = waitbar(0, 'generating U');
cleanMe = onCleanup(@() delete(wb));
U(1) = simplify(exp((sqrt(2)*x)/4)/(exp((sqrt(2)*x)/4)+exp(-(sqrt(2)*x)/4)));
Utimes = zeros(1,maxk);
for k = 1:maxk
Utic = tic;
waitbar(k/maxk, wb);
A(1) = 0;
B(1) = 0;
for i = 1:k
A(1) = simplify(A(1)+U(i)*U(k-i+1)) ;
end
for j = 1:k
for r = 1:j
B(1) = simplify(U(r)*U(j-r+1)*U(k-r+1));
end
end
U(k+1) = simplify(((diff(U(k),x,2)-B(1)+2*A(1)-U(k)))/k);
Utoc = toc(Utic);
Utimes(k) = Utoc;
end
disp (U)
k = 1:maxk;
plot(k, Utimes, 'displayname', 'U generation times');
xlabel('k'); ylabel('time (s)')
p = polyfit(log(k), log(Utimes), 1);
a = exp(p(2)); b = p(1);
fprintf('Utime is approximately %.5g * k^%.5g\n', a, b);
waitbar(0, wb, 'generating series');
for k = 1:maxk
waitbar(k/maxk, wb);
series(x,t) = simplify(series(x,t)+U(k)*(power(t,k-1)));
end
series
C = zeros(5,5);
waitbar(0, wb, 'evaluating numeric')
for x = 1:5
waitbar(x/5, wb);
e = (x-1)/1;
for t = 1:5
f = (t-1)/10;
C(x,t) = series(e,f);
end
end
vpa(C,15)
delete(cleanMe);
toc
Walter Roberson
el 24 de Mzo. de 2021
k = 20 took about 600 seconds for me; it looks like the time increase might be cubic in k (which does not surprise me.)
So if you were planning to take this to k = 1000 like in your earlier question, you should expect on the order of 295 days to execute, if your system has enough memory.
You could attempt to rewrite the whole calculation as numeric work, in hope that would speed it up -- which would be entirely possible. However, beyond k = 245 or so, the denominator of the expression would overflow to infinity, so that is the approximate upper limit on numeric work before the calculation becomes completely useles. The calculation is likely to become mostly useless for numeric work long before that.
YOGESHWARI PATEL
el 24 de Mzo. de 2021
Más respuestas (0)
Categorías
Más información sobre Symbolic Math Toolbox en Centro de ayuda y File Exchange.
el 22 de Mzo. de 2021
el 24 de Mzo. de 2021
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
