# Vertices from a collection of halfspaces in 3D

Can anyone suggest any good algorithms, or their own approach, to calculating the vertices of a collection of halfspaces in 3D? The halfspaces are guaranteed to be convex and bounded.

So far web searching has been rather fruitless, `qhull` can perform this operation but I was hoping to get a more mathematical slant on the problem, rather than read masses of source code - but it is a last resort.

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Assuming all halfspaces are defined by a plane with everything 'behind' the plane (ie, relative to a directed normal vector) being outside of the halfspace and everything on or in front of the plane being inside, the most obvious solution is:

• for every pair of planes get and store the line intersection;

That'll give you a collection of lines. Then for each line and plane pair:

• if the line rests exactly on the plane, do nothing;
• if the line intersects the plane and is not yet a line segment, turn it into a line segment that runs up to the point of intersection;
• if it was already a line segment and intersects the plan, clip off the part behind the plane;
• if the line was already a line segment and rests entirely on one side of the plane then do nothing.

Then collect the set of all line segment endpoints.

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I was afraid this might be very expensive, but after looking at the maths it isn't really. The few other more 'exotic' solutions I found were much more mathematically complex without being much faster. –  cmannett85 Mar 3 '12 at 8:16