Grasshopper

algorithmic modeling for Rhino

Marching Cubes: Curve Wrapping & More Metaballs

UPDATE: 30-Jan-2014

140130_marching_cubes.gh

I have added breps as an input for wrapping geometry (it also can take lines now), as in the above definition. It has been updated for some efficiencies...now you can taper a curve at both ends if you choose, you only need to feed one radius, although you can feed as many as you like (it acts like the longest list component). The definition uses kangaroo, weaverbird and nudibranch, although I ahve also included some internalized geometry...but I highly recommend playing with those! Kangaroo and weaverbird are better-known essentials, but nudibranch is really fantastic too. Enjoy!

Some of the work posted lately by Nick Tyrer has gotten me thinking about marching cubes again...I had done some stuff with marching tetrahedra and cubes a ways back, and with some new inspiration (and a little time I could carve out today) I figured I'd take a stab at trying to make it more flexible and robust. There was a lot of room for improvement...certainly there still is. This is really a work in progress, so all caveats apply to the script...it can probably break, hasn't been thoroughly tested, etc. But I probably won't be able to do too much more with it for a bit, so I figured I'd put it out there if anyone wants to play with it.

The short of it is that the inputs can take any combination of points and curves, along with variable radii of influence for each geometry object. Also, if you're using curves, and want to "taper" the effect of it over its length (from start to finish) you can do so. For example, an untapered curve versus a tapered curve:

The marching cube stuff is derived from the amazing Paul Bourke's work. I'm calculating fields around points and curves using a standard metaball fall-off function. The trick to its (relative) quickness is in using rTrees to determine which sample points should have their fields updated by various geometry objects, and also in ensuring that points aren't sampled more often than they need to be. The use of the rTree has some up-front computational expense, but with larger geometry sets it saves a ton of time.

The definition has some examples in it, as well as a description of the inputs...but here there are again anyway:

G = A list of base Geometry, which can be any combination of curves or points

R = Radius...this is a list of the radius of influence for each geometry object. The number of elements in this HAS TO BE EQUAL to the number of elements in the geometry list

res = resolution...the edge length of each sampling cube, so smaller numbers reflect higher resolutions. Watch out...the lower this number is, it exponentially increases the calculation time!

iso = iso value for cutting the surface...the lower the number, the bigger the mesh will be

smooth = an integer equal to the number of smoothing passes you want to do on the mesh(es) after they've been created

taper = a boolean...if you're using curves, and want the mesh that wraps around the end of the curve to be tapered smaller, then set this equal to true

ratio = the taper ratio, a double between 0 and 1...this is how much of your base radius you want your tapered edge to be...so if your taper = 1, then your tapered edge should have the same radius as the beginning, 0.5 then it'll be half, etc.

run = a boolean to execute the code...it still can be pretty slow with a lot of geometry, so you can toggle this off to adjust your settings

Anyway, I hope you enjoy!

140120_marching_cubes.gh

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Comment by djordje on January 20, 2014 at 6:43pm

Yep, definitively cool.

Comment by Arend on January 20, 2014 at 4:54pm

Amazing work, thanks for sharing!

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