Finding intersecting points in the Lissajous scan pattern

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창현 지
창현 지 le 16 Fév 2024
Commenté : 창현 지 le 21 Fév 2024
Hi.
I'm trying to find the intersecting points in the Lissajous scan pattern.
For
x = A * sin(2*pi*f1*t)
y = B * sin(2*pi*f2*t+pi/2)
drawing the Lissajous scan pattern itself was not that difficult,
but I had a lot of trouble finding out the intersecting points.
Does anyone have any experience with this problem?
  2 commentaires
Dyuman Joshi
Dyuman Joshi le 19 Fév 2024
Any updates, @창현 지? Did you try the FEX submisisons I linked?
창현 지
창현 지 le 21 Fév 2024
Thank you for the comments and ideas.
We did get some good results using your last suggestion, but we are still in the process of resolving the following issues.
  1. Intersections are marked in unwanted regions for relatively low frequencies
  2. Code takes up too much time for frequencies in the kHz range
Thanks.

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Réponses (1)

Dyuman Joshi
Dyuman Joshi le 16 Fév 2024
There are several options available in FEX -
https://in.mathworks.com/matlabcentral/fileexchange/11837-fast-and-robust-curve-intersections
https://in.mathworks.com/matlabcentral/fileexchange/22441-curve-intersections?s_tid=srchtitle
You could also go through this forum and find different approaches for finding intersections of 2 curves (mostly utilizing interp1), as this type of question has been asked many times.
  2 commentaires
DGM
DGM le 16 Fév 2024
In this question, we're trying to find the points where a single parametric curve intersects itself. That doesn't seem as simple as the typical request.
Dyuman Joshi
Dyuman Joshi le 16 Fév 2024
(If I understood your point clearly, @DGM) The 2nd FEX submission can be used for finding self-intersections points as well.
Another option is - https://in.mathworks.com/matlabcentral/fileexchange/13351-fast-and-robust-self-intersections?s_tid=srchtitle

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