11.7 SuperQuadric Representations

Barr, A.H.,
Superquadrics and Angle-Preserving Transformations,
IEEE_CGA(1), No. 1, January 1981, pp. 11-23. BibRef 8101

Barr, A.H.,
Global and Local Deformations of Solid Primitives,
Computer Graphics(18), No. 3, 1984, pp. xx. BibRef 8400

Raja, N.S., Jain, A.K.,
Recognizing Geons from Superquadrics Fitted to Range Data,
IVC(10), No. 3, April 1992, pp. 179-190.
WWW Version. BibRef 9204

Chen, L.H., Lin, W.C., Liao, H.Y.M.,
Recovery of Superquadric Primitive from Stereo Images,
IVC(12), No. 5, June 1994, pp. 285-296.
WWW Version. BibRef 9406

Keren, D., Cooper, D.B., and Subrahmonia, J.,
Describing Complicated Objects by Implicit Polynomials,
PAMI(16), No. 1, January 1994, pp. 38-53.
IEEE Abstract. IEEE Top Reference.
WWW Version. BibRef 9401
Earlier: BrownLEMS-102, 1992. 2-D curves in images are represented by fourth order polynomials to describe basic shapes (superquadrics). BibRef

Solina, F., and Bajcsy, R.K.,
Recovery of Parametric Models from Range Images: The Case for Superquadrics with Global Deformations,
PAMI(12), No. 2, February 1990, pp. 131-147.
IEEE Abstract. IEEE Top Reference.
WWW Version. BibRef 9002
Earlier:
Range Image Interpretation of Mail Pieces with Superquadrics,
AAAI-87(733-737). Functional Minimization. Descriptions, Superquadrics. Descriptions, Parametric. BibRef

Jaklic, A.[Ales], Leonardis, A.[Ales], Solina, F.[Franc],
Segmentation and Recovery of Superquadrics,
KluwerSeptember 2000, ISBN 0-7923-6601-8
WWW Version. Or:
HTML Version. How to describe objects, how to computer superquadrics. BibRef 0009

Leonardis, A., Jaklic, A., Solina, F.,
Superquadrics for Segmenting and Modeling Range Data,
PAMI(19), No. 11, November 1997, pp. 1289-1295.
IEEE Abstract. IEEE Top Reference.
WWW Version. 9712Directly recover superquadric from range data. BibRef

Jaklic, A., Solina, F.,
Moments of superellipsoids and their application to range image registration,
SMC-B(33), No. 4, August 2003, pp. 648-657.
IEEE Abstract. IEEE Top Reference. 0308 BibRef

Leonardis, A., Solina, F., Macerl, A.,
A Direct Recovery of Superquadric Models in Range Images Using Recover-and-Select Paradigm,
ECCV94(A:309-318).
WWW Version. BibRef 9400

Solina, F., Leonardis, A.,
Selective Scene Modeling,
ICPR92(I:87-90).
WWW Version. BibRef 9200

Krivic, J.[Jaka], Solina, F.[Franc],
Part-level object recognition using superquadrics,
CVIU(95), No. 1, July 2004, pp. 105-126.
WWW Version. 0407 BibRef
Earlier:
Superquadric-Based Object Recognition,
CAIP01(134 ff.).
HTML Version. 0210Hypothesize in database, then verify by projecting and refitting. BibRef

Gupta, A., and Bogoni, L., and Bajcsy, R.,
Quantitative and Qualitative Measures for the Evaluation of the Superquadric Models,
3DWS89(162-169). BibRef 8900

Bajcsy, R.[Ruzena], Solina, F.[Franc], and Gupta, A.[Alok],
Segmentation Versus Object Representation: Are They Separable?,
AIRI90(207-223). BibRef 9000

Bajcsy, R.[Ruzena], and Solina, F.[Franc],
Three Dimensional Object Representation Revisited,
ICCV87(231-240). BibRef 8700

Ferrie, F.P., Lagarde, J., and Whaite, P.,
Darboux Frames, Snakes, and Super-Quadrics: Geometry from the Bottom Up,
PAMI(15), No. 8, August 1993, pp. 771-784.
IEEE Abstract. IEEE Top Reference.
WWW Version. BibRef 9308
And: 3DWS89(170-176). BibRef
Earlier:
Recovery of Volumetric Object Descriptions from Laser Rangefinder Images,
ECCV90(385-396).
WWW Version. Bottom-up approach for articulated volumetric descriptions. Use ellipsoid and superquadric models. BibRef

Ferrie, F.P., and Levine, M.D.,
Deriving Coarse 3-D Models of Objects,
CVPR88(345-353).
IEEE Abstract. IEEE Top Reference. Models based on cylinders or ellipsoids. See also Integrating Information from Multiple Views. BibRef 8800

Ayoung-Chee, N., Dudek, G., Ferrie, F.P.,
Enhanced 3D Representation Using a Hybrid Model,
ICPR96(I: 575-579).
WWW Version. 9608(McGill Univ., CDN) BibRef

Hanson, A.J.,
Hyperquadrics: Smoothly Deformable Shapes with Convex Polyhedral Bounds,
CVGIP(44), No. 2, November 1988, pp. 191-210. Hyperquadrics. The introductions of Hyperquadrics a generalization of superquadrics. BibRef 8811

Chen, L.H., Liu, Y.T., Liao, H.Y.,
Similarity Measure for Superquadrics,
VISP(144), No. 4, August 1997, pp. 237-243. 9806 BibRef

Pilu, M.[Maurizio], Fisher, R.B.[Robert B.],
Training PDMs on models: the case of deformable superellipses,
PRL(20), No. 5, May 1999, pp. 463-474. BibRef 9905
Earlier: Add: second of three: Fitzgibbon, A.W., BMVC96(Deformable Models). 9608 BibRef
And: DAINo. 818, July 1996. BibRef EdinburghUniversity of Edinburgh. Trying to simplify the complex model. BibRef

Pilu, M., and Fisher, R.B.,
Equal-Distance Sampling of Superellipse Models,
BMVC95(xx-yy). BibRef 9500
And: DAI-No. 764, July 1995. BibRef Edinburgh BibRef

Tasdizen, T., Tarel, J.P., Cooper, D.B.,
Improving the Stability of Algebraic Curves for Applications,
IP(9), No. 3, March 2000, pp. 405-416.
WWW Version. 0003
HTML Version.
Postscript Version. BibRef

Tasdizen, T.[Tolga], Tarel, J.P.[Jean-Philippe], Cooper, D.B.[David B.],
Algebraic Curves that Work Better,
CVPR99(II: 35-41).
IEEE Abstract. IEEE Top Reference.
WWW Version. Better than conics or superquadrics. BibRef 9900

Zhou, L.[Lin], Kambhamettu, C.[Chandra],
Extending Superquadrics with Exponent Functions: Modeling and Reconstruction,
GM(63), No. 1, January 2001, pp. 1-20. 0102 BibRef
Earlier: CVPR99(II: 73-78).
IEEE Abstract. IEEE Top Reference.
WWW Version. BibRef

Zhou, L.[Lin], Kambhamettu, C.,
Representing and recognizing complete set of geons using extended superquadrics,
ICPR02(III: 713-718).
WWW Version. 0211 BibRef

Hu, W.C., Sheu, H.T.,
Efficient and consistent method for superellipse detection,
VISP(148), No. 4, August 2001, pp. 227-233. 0201 BibRef

Zhang, X.M.[Xiao-Ming], Rosin, P.L.[Paul L.],
Superellipse fitting to partial data,
PR(36), No. 3, March 2003, pp. 743-752.
WWW Version.
PDF Version. 0301 BibRef

Zhang, Y.[Yan],
Experimental comparison of superquadric fitting objective functions,
PRL(24), No. 14, October 2003, pp. 2185-2193.
WWW Version. 0307 BibRef

Wen, F.[FurOng], Yuan, B.[BaoZong],
Least-squares fitting for deformable superquadric model based on orthogonal distance,
PRL(25), No. 8, June 2004, pp. 933-941.
WWW Version. 0405See retraction. BibRef

Ho, T.K.[Tin Kam],
Article retraction: Least-squares fitting for deformable superquadric model based on orthogonal distance,
PRL(26), No. 6, 1 May 2005, pp. 685-686.
WWW Version. 0501 BibRef

Katsoulas, D.[Dimitrios], Bastidas, C.C.[Christian Cea], Kosmopoulos, D.I.[Dimitrios I.],
Superquadric Segmentation in Range Images via Fusion of Region and Boundary Information,
PAMI(30), No. 5, May 2008, pp. 781-795.
WWW Version. 0803 BibRef

Katsoulas, D.[Dimitrios], Kosmopoulos, D.I.[Dimitrios I.],
Box-like Superquadric Recovery in Range Images by Fusing Region and Boundary Information,
ICPR06(I: 719-722).
WWW Version. 0609 BibRef

Katsoulas, D.[Dimitrios],
Reliable recovery of piled box-like objects via parabolically deformable superquadrics,
ICCV03(931-938).
WWW Version. 0311Hypothesis generation and refinement. BibRef

Katsoulas, D., Jakli, A.,
Fast Recovery of Piled Deformable Objects Using Superquadrics,
DAGM02(174 ff.).
HTML Version. 0303 BibRef

Zhang, Y., Paik, J., Koschan, A.F.[Andreas F.], Abidi, M.A.[Mongi A.],
3-D object representation from multi-view range data applying deformable superquadrics,
ICPR02(III: 611-614).
WWW Version. 0211 BibRef

Chevalier, L., Jaillet, F., Baskurt, A.,
3d Shape Coding with Superquadrics,
ICIP01(II: 93-96).
IEEE Abstract. IEEE Top Reference. 0108 BibRef

Plaenkers, R.[Ralf], Fua, P.V.[Pascal V.],
Articulated Soft Objects for Video-based Body Modeling,
ICCV01(I: 394-401).
WWW Version. 0106Model of shape and motion from video. Skeleton plus meta-ball surfaces plus skin. BibRef

Zha, H.B.[Hong-Bin], Hoshide, T.[Tsuyoshi], Hasegawa, T.[Tsutomu],
A Recursive Fitting-and-Splitting Algorithm for 3-D Object Modeling Using Superquadrics,
ICPR98(Vol I: 658-662).
WWW Version. 9808 BibRef

van Dop, E.R.[Erik R.], Regtien, P.P.L.[Paul P.L.],
Fitting Undeformed Superquadrics to Range Data: Improving Model Recovery and Classification,
CVPR98(396-401).
IEEE Abstract. IEEE Top Reference. BibRef 9800

Yokoya, N., Kaneta, M., Yamamoto, K.,
Recovery Of Superquadric Primitives from a Range Image Using Simulated Annealing,
ICPR92(I:168-172).
WWW Version. BibRef 9200

Horikoshi, T., and Suzuki, S.,
3D Parts Decomposition from Sparse Range Data Information Criterion,
CVPR93(168-173).
IEEE Abstract. IEEE Top Reference. Segmented descriptions for superquadrics. BibRef 9300

Chapter on 3-D Object Description and Computation Techniques, Surfaces, Deformable, View Generation, Video Conferencing continues in
Active Volumes, Deformable Solids, 3-D Snakes, etc. .