Point Categorisation via a suggested Mathematica If Statement
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I've been trying to figure out how to convert this for too long but without success - I'm hoping this is more obvious to a fresh set of eyes. I have a function defined in mathematica:
f=If[-y <= x <= y || y <= -x <= -y, Sign[y], 0]
Which is then applied as:
k_x = A * f;
k_y = A * -f
k_z = 0;
Plotted as a quiver this results in the following on my set of evaluation points (where A is some scalar, =1 for simplicity here):
I know the conditionals need to be seperated out to apply this in MATLAB. My current best attempt is:
N = 3; % Number of equations
nr = length(location.x); % Number of columns
k = zeros(N,nr); % Allocate f
k_x = zeros(1,nr); k_y = zeros(1,nr);
for ind = 1:length(location.x)
if (-location.y(ind) <= location.x(ind) && location.x(ind) <= location.y(ind)) || ...
(location.y(ind) <= -location.x(ind) && -location.x(ind) <= -location.y(ind))
k_x(ind) = sign(location.y(ind));
k_y(ind) = 0;
elseif (location.x(ind) <= -location.y(ind) && -location.y(ind) <= -location.x(ind)) || ...
(-location.x(ind) <= location.y(ind) && location.y(ind) <= location.x(ind))
k_y(ind) = sign(location.x(ind));
k_x(ind) = 0;
else
k_x(ind) = 0;
k_y(ind) = 0;
end
end
k(1,:) = k_x; %kx
k(2,:) = -k_y; %ky
k(3,:) = 0; %kz
figure; quiver3(location.x,location.y,location.z,k(1,:),k(2,:),k(3,:)); hold on;
scatter3(location.x,location.y,location.z,'kx');
This almost works, but the corners don't have the same diagonal as the result I'm expecting from the function (as seen below). The 'diagonal' vectors which I don't achieve in my own function are really important. I also feel like the if loop is probably not the best way to evaluate this function.
An example location structure array is also attached here if testing/applying the code is useful.
Thanks in advance.
3 Comments
ADSW121365
on 9 Apr 2020
Geoff Hayes
on 9 Apr 2020
Edited: Geoff Hayes
on 9 Apr 2020
ADSW121365 - the conditions for the if statement look fine. I just don't understand how the elseif conditions relate to the Mathematica equation that you have shown (which only references Sign[y] and not Sign[x]). And is the data in the mat-file the same data used for the Mathematica plot?
ADSW121365
on 9 Apr 2020
Edited: ADSW121365
on 9 Apr 2020
Accepted Answer
ADSW121365
on 10 Apr 2020
Edited: ADSW121365
on 14 Apr 2020
4 Comments
Walter Roberson
on 10 Apr 2020
I tested:
y = randn(1,100);
x = randn(1,100);
%loop version with explicit assignment of 0 just in case vectorized version is faulty:
f0 = nan(size(y));
for K = 1 : length(y)
if (-y(K) <= x(K) & x(K) <= y(K)) | (y(K) <= -x(K) & -x(K) <= -y(K))
f0(K) = sign(y(K));
else
f0(K) = 0;
end
end
%duplicate the Mathematica If statement, explicitly provide 0 for unselected locations
mask = ((-y <= x & x <= y) | (y <= -x & -x <= -y));
f1 = zeros(size(y));
f1(mask) = sign(y(mask));
%vectorized full test, implicit assignment of 0 based upon false == 0 in MATLAB
f2 = ((-y <= x & x <= y) | (y <= -x & -x <= -y)) .* sign(y);
%simplified test
f3 = (abs(x) <= abs(y)) .* sign(y);
all(f0 == f1)
all(f0 == f2)
all(f0 == f3)
ans =
logical
1
ans =
logical
1
ans =
logical
1
All versions return the exact same results.
Therefore, if the Mathematica If is correct then the code I posted is correct in the form I posted it, and your use of sign(x) in your f_2 would not be correct if the logic you posted as trying to duplicate is correct.
Caution:
f(1,:) = A.*f_1; %Kx
f(2,:) = -A*f_2; %Ky
The first of thos involves element-by-element multiplication, but the second of those involves matrix multiplication. If A is not a scalar, then in order for the sizes to match on the right hand sides of both, A and f* would have to be square matrices that were the same size, and the result would be another square matrix that was the same size. But if that were true, then you would not be able to assign to the vector-only left-hand side designation. If both those lines are working for you then A would have to be scalar. I suspect that it is quite likely that A is intended to be a vector or matrix and that you are working with "corresponding" positions.
ADSW121365
on 14 Apr 2020
Walter Roberson
on 14 Apr 2020
The point is that you wrote,
f_2 = (abs(location.y) <= abs(location.x)).*sign(location.x); %Selects Y Axis Points
which uses sign(x) instead of sign(y) and using sign(x) is not correct according to the Mathematica statement. Using the sign(y) like I did reproduces the Mathematica statement. If the Mathematica is correct, then the code I posted is correct and the code you posted using sign(x) is not correct.
Conversely, if you find that you need sign(x) to get the plot you were interested in, then the implication is that the Mathematica posted is not correct.
ADSW121365
on 14 Apr 2020
Edited: ADSW121365
on 14 Apr 2020
More Answers (1)
Walter Roberson
on 9 Apr 2020
f = (abs(x) <= abs(y)).*sign(y);
Which can be done in vectorized form.
k_x = A*f;
k_y = -k_x;
k_z = zeros(size(k_x));
No loop needed provided that x and y are the same size (such as might be produced by ndgrid or meshgrid)
1 Comment
ADSW121365
on 10 Apr 2020
Edited: ADSW121365
on 10 Apr 2020
Appreciate the response - the vectorised form is particularily helpful. Unfortunetly, this bit of code still doesn't achieve the same thing as mathematica with results on the attached data like:
I'm unsure as to why the mathematica version works for all points whilst a direct MATLAB implementation doesn't - this is why I added the elseif command to my own attempted code - it seems like the conditional works differently inside mathematica such all points are selected and diagonals assigned only to points on the diagonal planes (see red quiver plot in the inital post). But I have no access to or experience in mathematica to try and figure out how the function works/ to adapt it.
Hope you're able to help further, I'm going to try and find a solution using your suggested syntax and will post it if I'm successful.
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