# Partial surface reconstruction

I need an algorithm to repair 3D triangular meshes. The desired condition is that 2n triangles (most of the time 2 triangles) share an edge. In contrast the input meshes contain cases with 2n+1 triangles (1,3,..) at an edge . I have implemented some heuristics:

• Close vertices (due to rounding errors) are merged into one.

• Border edges are split if afterwards the new vertex can be merged with a resonable other one.

• Holes are triangulated up to some area threshold.

This works quite well for many inputs (I care about selfintersections in a later stage), but there are meshes where these heuristics fail. The main problem is that repairing an edge is not a decision with just local consequences: Each created triangle reduces the set of edges available for the subsequent repair steps. Thus, just one bad decision may lead to a chain of consecutive faults.

This problem seems close to the surface reconstruction problem, but I have already most of the surface, so a partial reconstruction algorithm is needed which respects the existing triangles. Any ideas?

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What do you want to happen if you get a mesh shaped like an arrow tail, with three sheets joined at a single chain of vertices? –  comingstorm Oct 1 '12 at 23:31
The input meshes are orientable 2-manifolds, so if three triangles share an edge then one triangle is missing. –  Geom Oct 2 '12 at 13:38