research-article

Farthest-point optimized point sets with maximized minimum distance

Authors:

Thomas Schlömer,

Oliver DeussenAuthors Info & Claims

HPG '11: Proceedings of the ACM SIGGRAPH Symposium on High Performance Graphics

Pages 135 - 142

https://doi.org/10.1145/2018323.2018345

Published: 05 August 2011 Publication History

Abstract

Efficient sampling often relies on irregular point sets that uniformly cover the sample space. We present a flexible and simple optimization strategy for such point sets. It is based on the idea of increasing the mutual distances by successively moving each point to the "farthest point," i.e., the location that has the maximum distance from the rest of the point set. We present two iterative algorithms based on this strategy. The first is our main algorithm which distributes points in the plane. Our experimental results show that the resulting distributions have almost optimal blue noise properties and are highly suitable for image plane sampling. The second is a variant of the main algorithm that partitions any point set into equally sized subsets, each with large mutual distances; the resulting partitionings yield improved results in more general integration problems such as those occurring in physically based rendering.

References

[1]

Arvo, J., and Kirk, D. 1990. Particle transport and image synthesis. Computer Graphics (Proc. of SIGGRAPH 90), 63--66.

Digital Library

[2]

Balzer, M., Schlömer, T., and Deussen, O. 2009. Capacity-constrained point distributions: A variant of Lloyd's method. ACM Trans. Graph. 28, 3, 86:1--8.

Digital Library

[3]

Cgal, Computational Geometry Algorithms Library. http://www.cgal.org.

[4]

Cook, R. L. 1986. Stochastic sampling in computer graphics. Computer Graphics (Proc. of SIGGRAPH 86) 5, 1, 51--72.

Digital Library

[5]

Devillers, O. 2002. On deletion in Delaunay triangulations. Int. J. Comput. Geometry Appl. 12, 3, 193--205.

[6]

Devroye, L., Lemaire, C., and Moreau, J.-M. 2004. Expected time analysis for Delaunay point location. Comput. Geom. 29, 2 (Oct.), 61--89.

Digital Library

[7]

Du, Q., Faber, V., and Gunzburger, M. 1999. Centroidal Voronoi tessellations: Applications and algorithms. SIAM Review 41, 4, 637--676.

Digital Library

[8]

Dunbar, D., and Humphreys, G. 2006. A spatial data structure for fast Poisson-disk sample generation. ACM Trans. Graph. (Proceedings of SIGGRAPH 2006) 25 (July), 503--508.

Digital Library

[9]

Eldar, Y., Lindenbaum, M., Porat, M., and Zeevi, Y. Y. 1997. The farthest point strategy for progressive image sampling. IEEE Trans. Image Process. 6, 9 (Sept.), 1305--1315.

Digital Library

[10]

Erickson, J. 2005. Dense point sets have sparse Delaunay triangulations. Discrete Comput. Geom. 33 (Jan.), 83--115.

Digital Library

[11]

Gamito, M. N., and Maddock, S. C. 2009. Accurate multidimensional Poisson-disk sampling. ACM Trans. Graph. 29 (Dec.), 8:1--8:19.

Digital Library

[12]

Grünschloss, L., and Keller, A. 2009. (t, m, s)-nets and maximized minimum distance, part II. Monte Carlo and Quasi-Monte Carlo Methods 2008, 395--409.

[13]

Kanamori, Y., Szego, Z., and Nishita, T. 2011. Deterministic blue noise sampling by solving largest empty circle problems. Journal of IIEEJ 40, 210.

[14]

Lagae, A., and Dutré, P. 2008. A comparison of methods for generating Poisson disk distributions. Computer Graphics Forum 27, 1, 114--129.

[15]

Lloyd, S. P. 1982. Least square quantization in PCM. IEEE Transactions on Information Theory 28, 2, 129--137.

Digital Library

[16]

Mitchell, D. P. 1991. Spectrally optimal sampling for distribution ray tracing. Computer Graphics (Proc. of SIGGRAPH 91), 157--164.

Digital Library

[17]

Moenning, C., and Dodgson, N. A. 2003. Fast marching farthest point sampling. Tech. Rep. UCAM-CL-TR-562, University of Cambridge Computer Laboratory, Apr.

[18]

Peyré, G., and Cohen, L. 2006. Geodesic remeshing using front propagation. Int. J. Comput. Vision 69, 1 (Aug.), 145--156.

Digital Library

[19]

Pharr, M., and Humphreys, G. 2010. Physically Based Rendering, Second Edition: From Theory To Implementation, 2nd ed. Morgan Kaufmann Publishers Inc.

Digital Library

[20]

Schmaltz, C., Gwosdek, P., Bruhn, A., and Weickert, J. 2010. Electrostatic halftoning. Computer Graphics Forum 29, 8, 2313--2327.

[21]

Sobol, I. 1967. On the distribution of points in a cube and the approximate evaluation of integrals. Zh. vychisl. Mat. mat. Fiz. 7, 4, 784--802.

[22]

Tóth, L. F. 1951. Über gesättigte Kreissysteme. Mathematische Nachrichten 5, 3--5, 253--258.

[23]

Ulichney, R. A. 1988. Dithering with blue noise. Proc. IEEE 76, 1 (Jan.), 56--79.

[24]

Wei, L.-Y. 2008. Parallel Poisson disk sampling. ACM Trans. Graph. (Proceedings of SIGGRAPH 2008) 27 (Aug.), 20:1--20:9.

Digital Library

[25]

Wei, L.-Y. 2010. Multi-class blue noise sampling. ACM Trans. Graph. (Proceedings of SIGGRAPH 2010) 29 (July), 79:1--79:8.

Digital Library

Cited By

Chen SHei NHu SYue ZHe Y(2024)Convex Quadratic Programming for Computing Geodesic Distances on Triangle MeshesMathematics10.3390/math1207099312:7(993)Online publication date: 27-Mar-2024
https://doi.org/10.3390/math12070993
Wan HZhao F(2024)A Hierarchical Neural Network for Point Cloud Segmentation and Geometric Primitive FittingEntropy10.3390/e2609071726:9(717)Online publication date: 23-Aug-2024
https://doi.org/10.3390/e26090717
Wu JCui HDahnoun N(2023)A Voxelization Algorithm for Reconstructing mmWave Radar Point Cloud and an Application on Posture Classification for Low Energy Consumption PlatformSustainability10.3390/su1504334215:4(3342)Online publication date: 11-Feb-2023
https://doi.org/10.3390/su15043342
Show More Cited By

Index Terms

Farthest-point optimized point sets with maximized minimum distance
1. Computing methodologies
  1. Artificial intelligence
    1. Computer vision
      1. Image and video acquisition
  2. Computer graphics
    1. Image manipulation
    2. Rendering

Recommendations

Fréchet distance between two point sets
Abstract
We define and study the Fréchet distance and the discrete Fréchet distance between two point sets in the plane. One problem based on the well-known Fréchet distance is to find a polygonal curve on a point set with small Fréchet ...
Line segment sampling with blue-noise properties

Line segment sampling has recently been adopted in many rendering algorithms for better handling of a wide range of effects such as motion blur, defocus blur and scattering media. A question naturally raised is how to generate line segment samples with ...
Direct sampling on surfaces for high quality remeshing

Isotropic point distribution is crucial in remeshing process to generate a high-quality mesh. In this paper, we present a novel algorithm of isotropic sampling on two-manifold mesh surface. Our main contribution lies in the successful generalization of ...

Comments

Information & Contributors

Information

Published In

cover image ACM Conferences

HPG '11: Proceedings of the ACM SIGGRAPH Symposium on High Performance Graphics

August 2011

185 pages

ISBN:9781450308960

DOI:10.1145/2018323

Editor:
Stephen N. Spencer
University of Washington
,
General Chairs:
John Owens
University of California at Davis
,
Matt Pharr
Intel
,
Program Chairs:
Carsten Dachsbacher
Karlsruhe Institute of Technology
,
William Mark
Intel
,
Jacopo Pantaleoni
NVIDIA

Copyright © 2011 ACM.

Permission to make digital or hard copies of all or part of this work for personal or classroom use is granted without fee provided that copies are not made or distributed for profit or commercial advantage and that copies bear this notice and the full citation on the first page. Copyrights for components of this work owned by others than ACM must be honored. Abstracting with credit is permitted. To copy otherwise, or republish, to post on servers or to redistribute to lists, requires prior specific permission and/or a fee. Request permissions from [email protected]

Sponsors

SIGGRAPH: ACM Special Interest Group on Computer Graphics and Interactive Techniques
EUROGRAPHICS: The European Association for Computer Graphics

Publisher

Association for Computing Machinery

New York, NY, United States

Publication History

Published: 05 August 2011

Permissions

Request permissions for this article.

Request Permissions

Check for updates

Author Tags

Qualifiers

Research-article

Conference

HPG '11

Sponsor:

SIGGRAPH
EUROGRAPHICS

HPG '11: High Performance Graphics

August 5 - 7, 2011

British Columbia, Vancouver, Canada

Acceptance Rates

Overall Acceptance Rate 15 of 44 submissions, 34%

Contributors

Other Metrics

View Article Metrics

Bibliometrics & Citations

Bibliometrics

Article Metrics

78
Total Citations
View Citations
688
Total Downloads

Downloads (Last 12 months)56
Downloads (Last 6 weeks)15

Reflects downloads up to 08 Feb 2025

Other Metrics

View Author Metrics

Citations

Cited By

Chen SHei NHu SYue ZHe Y(2024)Convex Quadratic Programming for Computing Geodesic Distances on Triangle MeshesMathematics10.3390/math1207099312:7(993)Online publication date: 27-Mar-2024
https://doi.org/10.3390/math12070993
Wan HZhao F(2024)A Hierarchical Neural Network for Point Cloud Segmentation and Geometric Primitive FittingEntropy10.3390/e2609071726:9(717)Online publication date: 23-Aug-2024
https://doi.org/10.3390/e26090717
Wu JCui HDahnoun N(2023)A Voxelization Algorithm for Reconstructing mmWave Radar Point Cloud and an Application on Posture Classification for Low Energy Consumption PlatformSustainability10.3390/su1504334215:4(3342)Online publication date: 11-Feb-2023
https://doi.org/10.3390/su15043342
De Tommasi ERomano SZito G(2023)Blue-Noise-Based Disordered Photonic Structures Show Isotropic and Ultrawide Band GapsOptics10.3390/opt40400424:4(573-583)Online publication date: 3-Nov-2023
https://doi.org/10.3390/opt4040042
Yang YSiau KXie WSun Y(2022)Smart HealthJournal of Organizational and End User Computing10.4018/JOEUC.30881434:1(1-14)Online publication date: 11-Aug-2022
https://dl.acm.org/doi/10.4018/JOEUC.308814
Ahmed ARen JWonka P(2022)Gaussian Blue NoiseACM Transactions on Graphics10.1145/3550454.355551941:6(1-15)Online publication date: 30-Nov-2022
https://dl.acm.org/doi/10.1145/3550454.3555519
Yeh YNagano KKhamis SKautz JLiu MWang T(2022)Learning to Relight Portrait Images via a Virtual Light Stage and Synthetic-to-Real AdaptationACM Transactions on Graphics10.1145/3550454.355544241:6(1-21)Online publication date: 30-Nov-2022
https://dl.acm.org/doi/10.1145/3550454.3555442
Khan DPlopski AFujimoto YKanbara MJabeen GZhang YZhang XKato H(2022)Surface Remeshing: A Systematic Literature Review of Methods and Research DirectionsIEEE Transactions on Visualization and Computer Graphics10.1109/TVCG.2020.301664528:3(1680-1713)Online publication date: 1-Mar-2022
https://doi.org/10.1109/TVCG.2020.3016645
Zhu LChen WLin XHe LGuan Y(2022)Curvature-Variation-Inspired Sampling for Point Cloud Classification and SegmentationIEEE Signal Processing Letters10.1109/LSP.2022.320058529(1868-1872)Online publication date: 2022
https://doi.org/10.1109/LSP.2022.3200585
Baek HLee HKim JJung SChoi MKim J(2022)Trends in 3D Point Cloud Contents Sampling in Mobile AR/VR Platforms2022 IEEE VTS Asia Pacific Wireless Communications Symposium (APWCS)10.1109/APWCS55727.2022.9906510(171-175)Online publication date: 24-Aug-2022
https://doi.org/10.1109/APWCS55727.2022.9906510
Show More Cited By

View Options

Login options

Check if you have access through your login credentials or your institution to get full access on this article.

Full Access

Get this Publication

View options

PDF

View or Download as a PDF file.

eReader

View online with eReader.

Figures

Tables

Media

View Table of Conten