LIPIcs.ISAAC.2021.8.pdf
- Filesize: 0.77 MB
- 13 pages
Document
Self-Improving Voronoi Construction for a Hidden Mixture of Product Distributions
Authors
-
Part of:
Volume:
32nd International Symposium on Algorithms and Computation (ISAAC 2021)
Series: Leibniz International Proceedings in Informatics (LIPIcs)
Conference: International Symposium on Algorithms and Computation (ISAAC) - License:
Creative Commons Attribution 4.0 International license
- Publication Date: 2021-11-30
Cite AsGet BibTex
Siu-Wing Cheng and Man Ting Wong. Self-Improving Voronoi Construction for a Hidden Mixture of Product Distributions. In 32nd International Symposium on Algorithms and Computation (ISAAC 2021). Leibniz International Proceedings in Informatics (LIPIcs), Volume 212, pp. 8:1-8:13, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2021)
https://doi.org/10.4230/LIPIcs.ISAAC.2021.8
https://doi.org/10.4230/LIPIcs.ISAAC.2021.8
Abstract
We propose a self-improving algorithm for computing Voronoi diagrams under a given convex distance function with constant description complexity. The n input points are drawn from a hidden mixture of product distributions; we are only given an upper bound m = o(√n) on the number of distributions in the mixture, and the property that for each distribution, an input instance is drawn from it with a probability of Ω(1/n). For any ε ∈ (0,1), after spending O(mn log^O(1)(mn) + m^ε n^(1+ε) log(mn)) time in a training phase, our algorithm achieves an O(1/ε n log m + 1/ε n 2^O(log^* n) + 1/ε H) expected running time with probability at least 1 - O(1/n), where H is the entropy of the distribution of the Voronoi diagram output. The expectation is taken over the input distribution and the randomized decisions of the algorithm. For the Euclidean metric, the expected running time improves to O(1/ε n log m + 1/ε H).
Subject Classification
ACM Subject Classification
- Theory of computation → Computational geometry
Keywords
- entropy
- Voronoi diagram
- convex distance function
- hidden mixture of product distributions
Metrics
- Access Statistics
-
Total Accesses (updated on a weekly basis)
0PDF Downloads
References
-
N. Ailon, B. Chazelle, K. Clarkson, D. Liu, W. Mulzer, and C. Seshadhri. Self-improving algorithms. SIAM Journal on Computing, 40:350-375, 2011.
-
S. Arya, T. Malamatos, D.M. Mount, and K.C. Wong. Optimal expected-case planar point location. SIAM Journal on Computing, 37:584-610, 2007.
-
K. Buchin and W. Mulzer. Delaunay triangulations in o(sort(n)) time and more. Journal of the ACM, 58:6:1-6:27, 2011.
-
P.B. Callahan and S.R. Kosaraju. A decomposition of multidimensional point sets with applications to k-nearest-neighbors and n-body potential fields. Journal of the ACM, 42:67-90, 1995.
-
T.M. Chan. A simpler linear-time algorithm for intersecting two convex polyhedra in three dimensions. Discrete and Computational Geometry, 56:860-865, 2016.
-
B. Chazelle, O. Devillers, F. Hurtado, M. Mora, V. Sacristan, and M. Teillaud. Splitting a delaunay triangulation in linear time. Algorithmica, 34:39-46, 2002.
-
S.-W. Cheng, M.-K. Chiu, K. Jin, and M.T. Wong. A generalization of self-improving algorithms. In Proceedings of the International Symposium on Computational Geometry, pages 29:1-29:13. Full version: arXiv:2003.08329v2 [cs.CG], 2020, 2020.
-
S.-W. Cheng, K. Jin, and L. Yan. Extensions of self-improving sorters. Algorithmica, 82:88-106, 2020.
-
S.-W. Cheng and M.T. Wong. Self-improving voronoi construction for a hidden mixture of product distributions. arXiv:2109.13460 [cs.CG], 2021.
-
L. Paul Chew and R.L. Scot Drysdale. Voronoi diagrams based on convex distance functions. In Proceedings of the 1st Annual Symposium on Computational Geometry, pages 235-244, 1985.
-
K.L. Clarkson, W. Mulzer, and C. Seshadhri. Self-improving algorithms for coordinatewise maxima and convex hulls. SIAM Journal on Computing, 43:617-653, 2014.
-
K.L. Clarkson and P.W. Shor. Applications of random sampling in computational geometry, II. Discrete and Computational Geometry, 4:387-421, 1989.
-
H. Edelsbrunner, L.J. Guibas, and J. Stolfi. Optimal point location in a monotone subdivision. SIAM Journal on Computing, 15:317-340, 1986.
-
G.N. Frederickson. Fast algorithms for shortest paths in planar graphs, with applications. SIAM Journal on Computing, 16:1004-1022, 1987.
-
S. Har-Peled and M. Mendel. Fast construction of nets in low-dimensional metrics and their applications. SIAM Journal on Computing, 35:1148-1184, 2006.
-
J. Iacono. Expected asymptotically optimal planar point location. Computational Geometry: Theory and Applications, 29:19-22, 2004.
-
K. Junginer and E. Papadopoulou. Deletion in abstract voronoi diagram in expected linear time. In Proceedings of the 34th International Symposium on Computational Geometry, pages 50:1-50:14, 2018.
-
R. Klein, K. Mehlhorn, and S. Meiser. Randomized incremental construction of abstract voronoi diagrams. Computational Geometry: Theory and Applications, 3:157-184, 1993.
-
E. Pyrga and S. Ray. New existence proofs for ε-nets. In Proceedings of the 24th Annual Symposium on Computational Geometry, pages 199-207, 2008.
-
A.K. Tsakalides and J. van Leeuwen. An optimal pointer machine algorithm for finding nearest common ancestors. Technical Report RUU-CS-88-17, Department of Computer Science, University of Utrecht, 1988.
-
P. van Emde Boas, R. Kaas, and E. Zijlstra. Design and implementation of an efficient priority queue. Mathematical Systems Theory, 10:99-127, 1977.
-
R.W. Yeung. A First Course in Information Theory. Kluwer Academic/Plenum Publishers, 2002.