roipoly

12 Jan 2012
1 Answer
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Hi,
I would like to know if it is possible to create a ROI on a current figure.
x=[1 2 3 4 5 6];
y=[7 8 9 10 11 12];
plot(x,y)
Now i would like to define a ROI, is it possible to use roipoly
I='Figure 1'
r=[-20 20]
c=[-20 20]
BW=roipoly(I,r,c)
cheers
nicolas

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Answers (1)

Image Analyst
Image Analyst on 12 Jan 2012

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No. I has to be an image, not a string. And r and c must have at least three points - that would be a triangle. As you have it, r and c define a line, not a polygon.

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Nicolas
Nicolas on 12 Jan 2012
sorry, i wrote something quick.
actually my polygon is 13 points.
I'm looking for creating a ROI, because I want to analyze that particular ROI using voronoi rather than the whole figure or image. And I haven't found so much information on the subject.
Image Analyst
Image Analyst on 12 Jan 2012
I don't know what that means. How can you analyze a region using a Voronoi diagram?
Nicolas
Nicolas on 12 Jan 2012
I don't know neither. My idea was to calculate the area of the polygon generated using voronoi within a defined area. It seems I missed something in the understanding of how voronoi works.
Walter Roberson
Walter Roberson on 12 Jan 2012
Voronoi diagrams... aren't they the ones that go to infinity at the edges?
Image Analyst
Image Analyst on 13 Jan 2012
Why don't you just post your image to tinypic.com and tell us what you want to measure it it, rather than think up some random algorithm and see how it might be applied to your image?
Nicolas
Nicolas on 13 Jan 2012
in exemple 2 of the help for "voronoi", the figure shows that not all the lines are infinite... i'm confused.
Image Analyst
Image Analyst on 13 Jan 2012
No, not all are infinite. But those that intersect the edges would go to infinity if they didn't get clipped by the edges of the diagram. Anyway, what do you think you want to do with the voronoi? Or better yet, what do want to do in your ROI?
Nicolas
Nicolas on 13 Jan 2012
in my ROI, I have a population of points that increase with time, for each new point i want to recalculate the Voronoi and study the evolution of the polygon areas for each point.
Walter Roberson
Walter Roberson on 13 Jan 2012
It sounds to me like you should be working in the dual space from voronoi, namely the delaunay triangulation.

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Nicolas
Nicolas
on 12 Jan 2012

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