2010
DOI: 10.1007/978-3-642-14052-5_16
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Formal Study of Plane Delaunay Triangulation

Abstract: This article presents the formal proof of correctness for a plane Delaunay triangulation algorithm. It consists in repeating a sequence of edge flippings from an initial triangulation until the Delaunay property is achieved. To describe triangulations, we rely on a combinatorial hypermap specification framework we have been developing for years. We embed hypermaps in the plane by attaching coordinates to elements in a consistent way. We then describe what are legal and illegal Delaunay edges and a flipping ope… Show more

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Cited by 17 publications
(11 citation statements)
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“…The naive algorithm is unsatisfactory as it does not provide a good way to find the triangle inside of which a new point may occur. This can be improved by using Delaunay triangulations, as already studied formally in [6] and a well-known algorithm of "visibility" walk in the triangulation [4], which can be proved to have guarantees to terminate only when the triangulation satisfies the Delaunay criterion. This is the planned future work.…”
Section: Resultsmentioning
confidence: 99%
See 1 more Smart Citation
“…The naive algorithm is unsatisfactory as it does not provide a good way to find the triangle inside of which a new point may occur. This can be improved by using Delaunay triangulations, as already studied formally in [6] and a well-known algorithm of "visibility" walk in the triangulation [4], which can be proved to have guarantees to terminate only when the triangulation satisfies the Delaunay criterion. This is the planned future work.…”
Section: Resultsmentioning
confidence: 99%
“…A first attempt with convex hulls was provided by Pichardie and Bertot [17] where the only data structure used was that of lists but the question of non general positions (where points may be aligned) was also studied. Notable work is provided by Dufourd and his colleagues [3,5,6,1]. In particular, Dufourd advocated the use of hypermaps to represent many of the data-structures of computational geometry.…”
Section: Related Workmentioning
confidence: 99%
“…The most extensive among these is due to the formalization of four colour theorem [8,9] which considers only planar graphs. The work by Dufourd and Bertot on formalizing plane Delaunay triangulation [5] utilises a similar notion of graphs based on hypermaps. In a recent work [4] aimed towards formalizing the graph minor theorem for treewidth two Doczkal et al developed a general library for graphs using the Coq Proof Assistant.…”
Section: Related Workmentioning
confidence: 99%
“…The triangulation with linear interpolation algorithm uses the values of multiple neighboring pixels. The Delaunay triangulation [7][8] of the point set is first computed with the z-values of the vertices determining the tilt of the triangles.…”
Section: Noise Fixingmentioning
confidence: 99%