why does my code take so long to run?

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Omar B.
Omar B. on 7 Oct 2020
Commented: Rena Berman on 12 Oct 2020
I am trying to compute v' * f(A) * v, where f is a given function, A matrix, and v is a unite vector.
My code takes along time doing run and did not get the result. Could please help me to fix this problem?
% want to compute v'*f(A)*v
syms f(x)
N=1000;
Ns=1:N;
R=1./(Ns);
A=sym(toeplitz(R));% the input matrix
v=ones(N,1);
v=v/norm(v);
f(x) = atan(sqrt(x)); % the function f(x)=arctan(sqrt(x))/x
B = funm(A,f); % the resulting matrix
y=A\v;
exact=v'*B*y
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Rik
Rik on 10 Oct 2020
Edited: Rena Berman on 12 Oct 2020
@Omar, Please explain why you want your question removed.
I also made a capture of the Google cache from before you removed your question here.
Rena Berman
Rena Berman on 12 Oct 2020
(Answers Dev) Restored edit

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Answers (1)

Hiro Yoshino
Hiro Yoshino on 8 Oct 2020
It looks that your problem is not that complicated. Why don't you write your code without using symbolic expressions? I bet it is faster.
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Walter Roberson
Walter Roberson on 8 Oct 2020
There is a challenge that the numeric funm is different than the symbolic funm .
For the symbolic funm, you pass in a symbolic function or symbolic expression, and funm automatically takes derivatives in order to build a taylor series (or however it is represented). No control is offered over the number of terms used, and all the derivatives are likely to be exact derivatives.
If we look at even just the sqrt() part, as a matrix function, sqrtm(), that mathematically involves a closed form svd, sqrt of the diagonal, and reconstruct -- all as closed form expressions. For a 1000 x 1000 matrix, that is going to take a very long time.
For the numeric funm, you pass in a function handle to a function that must accept a vector and must also accept a derivative number to calculate and evaluate the input at. But you do not have diff() available to help because it is a numeric function handle you are working on, not a symbolic function. So you need to have a formula to calculate the N'th derivative.... Or you need to slip into the symbolic world, probably memoizing as you go.
Walter Roberson
Walter Roberson on 8 Oct 2020
Even for N=10 the symbolic version takes much much much too long.

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