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Calculation precision changed in 2020b?

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Hiroyuki Kato
Hiroyuki Kato el 13 de Oct. de 2020
Comentada: Jan el 23 de Oct. de 2020
I am encountering a precision error with Matlab2020b, which I did not have in version 2016b.
I have 78-dimension vector x (attached). if I do the following, even though the result should be 0, I get a complex number as a result from acos calculation:
> y = x;
> acos(dot(x,y)/sqrt(sum(x.^2)*sum(y.^2)))
ans = 0.0000e+00 + 2.1073e-08i
In Matlab2016b, I know that using "norm" function caused a precision error and acos(dot(x,y)/(norm(x)*norm(y)) gave a complex number.
Back then, the use of sqrt(sum(x.^2)*sum(y.^2)) was a recommended method to avoid this issue. (as summarized in this page: https://stackoverflow.com/questions/36093673/why-do-i-get-a-complex-number-using-acos)
This method has been working fine in 2016b, but now with exactly the same code I have the complex number issue coming back in 2020b.
Was there a change in the precision of calculation in the newer version of matlab? If so, is there any good work around to avoid this issue?
Thanks,
Hiroyuki
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Bruno Luong
Bruno Luong el 15 de Oct. de 2020
Editada: Bruno Luong el 15 de Oct. de 2020
"In Matlab2016b, I know that using "norm" function caused a precision error and acos(dot(x,y)/(norm(x)*norm(y)) gave a complex number.
Back then, the use of sqrt(sum(x.^2)*sum(y.^2)) was a recommended method to avoid this issue. (as summarized in this page: https://stackoverflow.com/questions/36093673/why-do-i-get-a-complex-number-using-acos)
This method has been working fine in 2016b, but now with exactly the same code I have the complex number issue coming back in 2020b."
Pure luck. None of the observation has rigorous justification.

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Bruno Luong
Bruno Luong el 15 de Oct. de 2020
Editada: Bruno Luong el 15 de Oct. de 2020
This is a robust code.
theta = acos(max(min(dot(x,y)/sqrt(sum(x.^2)*sum(y.^2)),1),-1))
Note it returns 0 for x or y is 0. One might prefer NaN because correlation is undefined.

Más respuestas (2)

Jan
Jan el 20 de Oct. de 2020
The ACOS function is numerically instable at 0 and pi.
SUM is instable at all. A trivial example: sum([1, 1e17, -1]) .There are different approaches to increase the accuracy of the summation, see https://www.mathworks.com/matlabcentral/fileexchange/26800-xsum
There is a similar approach for a stabilized DOT product, but the problem of ACOS will still exist. To determine the angle between two vectors, use a stable ATAN2 method, see https://www.mathworks.com/matlabcentral/answers/471918-angle-between-2-3d-straight-lines#answer_383392
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Paul
Paul el 22 de Oct. de 2020
I think you have an error in angle2. Should it not be:
angle2 = 2*atan(norm(norm(x)*y - norm(y)*x)/norm(norm(x)*y + norm(y)*x))
Jan
Jan el 23 de Oct. de 2020
@Paul: Yes, there was a typo.

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Uday Pradhan
Uday Pradhan el 15 de Oct. de 2020
Editada: Uday Pradhan el 16 de Oct. de 2020
Hi Hiroyuki,
If you check (in R2020b):
>> X = dot(x,y) - sqrt(sum(x.^2)*sum(y.^2))
ans =
1.776356839400250e-15
where as in R2016b, we get:
>> dot(x,y) - sqrt(sum(x.^2)*sum(y.^2))
ans =
0
Hence, in R2020b, we get:
>> acos(X)
ans =
0.000000000000000e+00 + 2.107342425544702e-08i
This is because the numerator dot(x,y) is "greater" than the denominator sqrt(sum(x.^2)*sum(y.^2)) albeit by a very small margin and hence the fraction X becomes greater than 1 and thus acos(X) gives complex value.
To avoid this my suggestion would be to establish a threshold precision to measure equality of two variables, for example you could have a check function so that if abs(x-y) < 1e-12 then x = y
function [a,b] = check(x,y)
if abs(x-y) < 1e-12
a = x;
b = a;
end
end
Now, you can do [a,b] = check(x,y) and then call acos(a/b). This will also help in any other function where numerical precision can cause problems.
Another workaround can be found in this link : Determine the angle between two vectors.
Hope this helps!
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Paul
Paul el 18 de Oct. de 2020
Editada: Paul el 18 de Oct. de 2020
I will assume that the decision to change the implementation and yield a different answer was not undertaken lightly. I checked the release notes and did not see this change to dot, though the sum function did change in 2020B.
Paul
Paul el 19 de Oct. de 2020
If you look further down in dot.m (2019a) to the section used when dim is specified, you will see that there is a path to
c = sum(conj(a).*b,dim)
even if a and b are both vectors and are isreal. For example
dot(1:3,1:3,1)

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