Info

This question is closed. Reopen it to edit or answer.

Vectorization and a strange result

2 views (last 30 days)
Maria
Maria on 14 Oct 2020
Closed: MATLAB Answer Bot on 20 Aug 2021
Hi,
I am struggling since few hours with a vectorized operation.
I have some vector quantities, and I wanted to vectorize. I put in the attachment a .mat file.
For testing, I compute the fx1 and fx_1 in this way
fx1 = const_1 .* exp(-1j.*beta(1:2)'.*const_2)./const_2 .* t;
fx_1 = const_1 .* exp(-1j.*beta(1)*const_2)./const_2 .* t;
where beta is a vector. I would expect that the first row of fx1 and fx_1 coincide, but they don't. I am very confused what I am missing here. Ideally, I would like to do this
fx1 = const_1 .* exp(-1j.*beta'.*const_2)./const_2 .* t;
instead of multiplying in a for loop for each beta(i).

This question is closed.

Answers (1)

Star Strider
Star Strider on 14 Oct 2020
Your ‘mytest.mat’ file contains:
fx_1: [1×150 double]
beta: [1×25 double]
t: [1×150 double]
const_1: [1×150 double]
const_2: [1×150 double]
fx1: [2×150 double]
It would help to know what you want to do with those vectors and the ‘fx1’ matrix. That is not obvious from the code you posted.
  4 Comments
Show 2 older comments
Maria
Maria on 14 Oct 2020
Edited: Maria on 14 Oct 2020
I see that you are plotting fx1. But, if I am doing it right, the fx1 is still different than the fx computed in the for loop. In your result, do you see them equal? I double check with isequal
D = load('mytest.mat');
beta = D.beta;
t = D.t;
const_1 = D.const_1;
const_2 = D.const_2;
fx1 = const_1 .* exp(-1j.*beta'.*const_2)./const_2 .* t;
fx = zeros(length(beta),150);
for i = 1 : length(beta)
fx(i,:) = const_1 .* exp(-1j.*beta(i).*const_2)./const_2 .* t;
end
isequal(fx,fx1)
Star Strider
Star Strider on 15 Oct 2020
You are computing ‘fx’ differently in the looop than in the vectorised calculation.
If you plot them:
for i = 1 : length(beta)
fx(i,:) = const_1 .* exp(-1j.*beta(i).*const_2)./const_2 .* t;
end
figure
mesh(abs(fx))
set(gca, 'ZScale','log')
xlabel('t')
ylabel('\beta (index)') % ‘beta’ Is Complex, So Plotting The Index Values
zlabel('|fx1|')
you will see that they are essentially just mirror-images of each other with respect to the z-axis. The magnitudes are of courrse different, the vectorised approach goes from to , and the loop goes from to . Chioose whatever version makes sense in the context of what you want to do. I have no idea what that is.
I would use the fully-vectorised approach (in my code), since to me that makes more sense.

This question is closed.

Tags

Products


Release

R2020a

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!