Flip Distance of Convex Triangulations and Tree Rotation Is NP-Complete
4 days ago
- #Computational Geometry
- #NP-completeness
- #Binary Trees
- Flips in triangulations of convex polygons are isomorphic to rotations in binary trees and define edges in the 1-skeleton of the Associahedron.
- The complexity of determining the minimum number of flips between triangulations of convex polygons was an open question for decades.
- The paper proves that computing shortest flip sequences between triangulations of convex polygons is NP-hard.
- The proof uses techniques developed for studying flip sequences of non-crossing spanning trees.
- The result also implies that computing the rotation distance of binary trees is NP-hard.