curvature metaball

Replies to This Discussion

Permalink Reply by Jacek Jaskólski on August 25, 2010 at 2:06am

Seems like an interesting problem. I think the place to start would be to somehow find the normal vector at that given point (P). My guess is it can be derived from vectors AP, BP, CP ... where A,B,C ... are base input points which influence the metaball's surface at P.

The next step would be to find intersections of the mtb surf with a number of planes going through the normal vector and check the curvatures of the resulting curves. The min and max values would give you an approximation of the principal curvatures of the mtb surface.

Permalink Reply by Wiet Mazairac on August 25, 2010 at 4:32am

What exactly is the mean curvature?

h=1/2*(k1+k2)

or

h=1/n*sum(from i=1 to i=n)(ki)

so, is it the mean of the minimal and the maximal curvature at that point

or

is it the mean of all the curvatures at that point

Permalink Reply by Wiet Mazairac on August 25, 2010 at 8:41am

Could this be correct?
Bigger ball is bigger mean curvature.

I used h=1/2*(k1+k2). It's an aprox, not exact.

Permalink Reply by Jacek Jaskólski on August 25, 2010 at 10:15am

I'm afraid it's not since the pattern isn't symmetrical... From the images it looks as if you measured the curvatures of the section curves and used them as k1 and k2.

So the result is highly dependant on the orientation of the metaball - rotate it a bit and you'll see the pattern change.

Permalink Reply by Wiet Mazairac on August 25, 2010 at 11:38am

Thanks, I'll have another go.

Permalink Reply by Jacek Jaskólski on August 25, 2010 at 12:57pm

Ok, I've got something:

1. normal vectors

2. curve sections at given point

3. curvatures of the curves

Step 4 is just identyfing the min and max of these and computing the mean curvature.

The definition has some errors and is so messy I won't post it here just yet... it would only generate confusion.

Permalink Reply by Wiet Mazairac on August 26, 2010 at 1:32am

I think this should be it.

Permalink Reply by Wiet Mazairac on August 26, 2010 at 3:10am

It needed a little more tweaking, but I think it's finished now.

Permalink Reply by Wiet Mazairac on August 26, 2010 at 3:53am

It wasn't finished. :)
Now it is..... I think.

Permalink Reply by Jacek Jaskólski on August 26, 2010 at 12:04pm

Hi,

Can you post the definition? I'd like to take a look at it.

My method turns out to be quite inefficient, since you'd have to calculate millions of curvatures to get the min and max values even remotely accurate.

So it seems I've hit the wall at calculating the normal vector.
I've uploaded the definition if anyone is interested.

Attachments:

• metaball surface normal.ghx, 408 KB

Permalink Reply by megan sadler on July 16, 2012 at 10:12am

Hey I am trying to create lines or normal vectors with their lengths varying due to the curvature of the surface.. is this something you might be able to help with?

Thanks megan

Permalink Reply by Jacek Jaskólski on July 16, 2012 at 10:40am

hi Megan

first of all a couple of questions:

1. I assume you're talking about a metaball surface since you post this question here, but just in case - are you?
2. If yes, do you absolutely need to use metaballs? (a standard NURBS surface is much easier to handle)
3. What type of curvature do you want to sample? (Min, Max, Mean, Gaussian? - If you're not familiar with those names maybe you can check out Rhino's help file, you'll find brief explainations there, note that surface curvature is a subject a bit more complicated than curve curvature)

also, do you have an example file that you're working on? what problems have you encountered? the more specific a question the more helpful the answer.

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