JOURNAL ARTICLE
On degrees in random triangulations of point sets
Abstract
We study the expected number of interior vertices of degree i in a triangulation of a point set S, drawn uniformly at random from the set of all triangulations of S, and derive various bounds and inequalities for these expected values. One of our main results is: For any set S of N points in general position, and for any fixed i, the expected number of vertices of degree i in a random triangulation is at least γiN, for some fixed positive constant γi (assuming that N > i and that at least some fixed fraction of the points are interior).
Keywords:
Triangulation Combinatorics Mathematics Degree (music) Point set triangulation Set (abstract data type) Constant (computer programming) Fixed point Position (finance) Expected value Point (geometry) Fraction (chemistry) General position Discrete mathematics Delaunay triangulation Geometry Mathematical analysis Statistics Computer science Physics
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5
Cited By
2.17
FWCI (Field Weighted Citation Impact)
17
Refs
0.89
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Is in top 1%
Is in top 10%
Citation History
Topics
Computational Geometry and Mesh Generation
Physical Sciences → Computer Science → Computer Graphics and Computer-Aided Design
Data Management and Algorithms
Physical Sciences → Computer Science → Signal Processing
Advanced Combinatorial Mathematics
Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics
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