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I´m searching for a method to calculate the volume of a three-dimensional irregular object in either python or R. I have a time series of files (around 50 per sequence), equally spaced in time. They consist of a triangular mesh representation of the object with a fixed number of triangles. The vertices have known x,y,z-coordinates. There is no need for regenerating the mesh. And no need for visualization. The triangles have indices, the points as well. The object is not necessarily completely convex. But there are no unnecessary points. All known points are part of the hull. Now, I would like to calculate the volume of the object at each time point.

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  • The cluster pacakge in R has a volume function
    – James
    Sep 14, 2012 at 10:55
  • Hmmm, not really what I´m looking for. The function is restricted to ellipsoids (as far as I can see). And it´s more a point cloud problem, than a statistical one.
    – Doc
    Sep 14, 2012 at 11:05
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    Can't you immerse your computer into your bathtub and shout "Eureka!"? Sep 14, 2012 at 11:21
  • Kidding aside, this sounds like an interesting problem. What I would do is "slice" the object in one dimension, interpolate points and do a Monte Carlo integration to find the area under the "slice". Sum by all slices and you should get the (normalized?) volume. Sep 14, 2012 at 11:24
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    This sounds similar: stackoverflow.com/questions/1406029/…
    – Bitwise
    Sep 14, 2012 at 11:31

1 Answer 1

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After some googling I found that this algorithm should do the trick for the closed mesh you are describing: iterate over all your triangles and sum up dot(v0, cross(v1, v2)) / 6 where v0, v1, and v2 are the coordinates of the triangle's vertices.

Source

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    I don´t quite get it... what is "cross()" and are v0,v1,v2 the vectors to three vertices of a triangle (like: v0(x0,y0,z0), v1(x1,y1,z1), ...) and what does dot()?
    – Doc
    Sep 14, 2012 at 15:18
  • If your hull is a closed surface, then this should work as long as your triangles (v0,v1,v2) are oriented consistently (e.g., counterclockwise as seen from the outside of the surface). cross() is a vector cross product. The formula computes the signed volume of the tetrahedron (origin,v0,v1,v2). Because it is signed, triangles facing toward the origin are subtracted from those facing away from it -- this is why consistent triangle orientation is essential. Sep 14, 2012 at 18:28
  • so.. if the origin is inside the structure, the algorithm wouldn´t work, right? And about the boundary conditions: what if the origin is in the plane of the triangle (therefore the normal of the triangle neither facing to or from the origin)? Would the calculation work?
    – Doc
    Sep 15, 2012 at 17:16
  • Hmmm, no more interest in this little question? I´m still confused about the dot(v,crossproduct) function. And I´m not sure, that the structure is strictly "oriented". Let´s think about something like a torus. Oriented or not?
    – Doc
    Sep 17, 2012 at 16:03
  • @Doc Like comingstorm said, cross() is the vector cross-product. Likewise, dot() is the vector dot-product. You can find the definitions of both of these operations on Wikipedia. As far as I can tell, the location of the origin in regards to your mesh shouldn't matter, as it is the relationship between the vertices that matters. I'm not sure though why triangles have to be consistently oriented, since the normals are not used in the calculation, and the signs are determined automatically. If I were you I'd test it on a few simple shapes (that you can easily know the volume of) first.
    – Artyom
    Sep 18, 2012 at 9:53

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