Pei, S.C.,
Liou, L.G.,
Automatic Symmetry Determination and Normalization for
Rotationally Symmetrical 2D Shapes and 3D Solid Objects,
PR(27), No. 9, September 1994, pp. 1193-1208.
WWW Version.
BibRef
9409
Pei, S.C.,
Lin, C.N.,
Normalization of Rotationally Symmetric Shapes for Pattern Recognition,
PR(25), No. 9, September 1992, pp. 913-920.
WWW Version.
BibRef
9209
Pei, S.C.,
Lin, C.N.,
Image Normalization for Pattern-Recognition,
IVC(13), No. 10, December 1995, pp. 711-723.
WWW Version.
BibRef
9512
Yip, R.K.K.,
Lam, W.C.Y.,
Tam, P.K.S.,
Leung, D.N.K.,
A Hough Transform Technique for the Detection of Rotational Symmetry,
PRL(15), No. 9, September 1994, pp. 919-928.
See also Modification of Hough Transform for Circles and Ellipses Detection Using a 2-Dimensional Array.
BibRef
9409
Yip, R.K.K.[Raymond K.K.],
A Hough transform technique for the detection of parallel projected
rotational symmetry,
PRL(20), No. 10, October 1999, pp. 991-1004.
9911
BibRef
Yip, R.K.K.[Raymond K.K.],
Genetic Fourier descriptor for the detection of rotational symmetry,
IVC(25), No. 2, February 2007, pp. 148-154.
WWW Version.
0701
Genetic algorithm; Fourier descriptors; Rotational symmetry detection
BibRef
Tsai, W.H.,
Chou, S.L.,
Detection of Generalized Principal Axes in
Rotationally Symmetric Shapes,
PR(24), No. 2, 1991, pp. 95-104.
WWW Version.
BibRef
9100
Lin, J.C.[Ja-Chen],
Chou, S.L.[Sheng-Lin],
Tsai, W.H.[Wen-Hsiang],
Detection of Rotationally Symmetric Shape Orientations by
Fold-Invariant Shape-Specific Points,
PR(25), No. 5, May 1992, pp. 473-482.
WWW Version.
BibRef
9205
Chou, S.L.,
Lin, J.C.,
Tsai, W.H.,
Fold Principal Axis:
A New Tool for Defining the Orientations of Rotationally Symmetric Shapes,
PRL(12), 1991, pp. 109-115.
BibRef
9100
Yang, M.C.,
Tsai, W.H.,
Recognition of Single 3D Curved Objects Using 2D
Cross-Sectional Slice Shapes,
IVC(7), No. 3, August 1989, pp. 210-216.
WWW Version.
BibRef
8908
Leou, J.J.,
Tsai, W.H.,
Automatic Rotational Symmetry Determination for Shape Analysis,
PR(20), No. 6, 1987, pp. 571-582.
WWW Version.
BibRef
8700
Lin, J.C.,
Universal Principal Axes: An Easy-to-Construct Tool Useful in
Defining Shape Orientations for Almost Every Kind of Shape,
PR(26), No. 4, April 1993, pp. 485-493.
WWW Version.
BibRef
9304
Lin, J.C.,
The Family of Universal Axes,
PR(29), No. 3, March 1996, pp. 477-485.
WWW Version.
BibRef
9603
Pottmann, H.,
Lu, W.,
Ravani, B.,
Rational Ruled Surfaces and Their Offsets,
GMIP(58), No. 6, November 1996, pp. 544-552.
9701
BibRef
Llados, J.,
Bunke, H.,
Marti, E.,
Finding Rotational Symmetries by Cyclic String Matching,
PRL(18), No. 14, December 1997, pp. 1435-1442.
9806
BibRef
Cheng, H.D.,
Desai, R.,
Scene Classification by Fuzzy Local Moments,
PRAI(12), No. 7, November 1998, pp. 921.
BibRef
9811
Desai, R.,
Cheng, H.D.,
Pattern Recognition by Local Radial Moments,
ICPR94(B:168-172).
IEEE DOI Link
BibRef
9400
Colombo, C.[Carlo],
del Bimbo, A.[Alberto],
Pernici, F.[Federico],
Metric 3D Reconstruction and Texture Acquisition of Surfaces of
Revolution from a Single Uncalibrated View,
PAMI(27), No. 1, January 2005, pp. 99-114.
IEEE Abstract. IEEE Top Reference.
0412
BibRef
Earlier:
Image Mosaicing from Uncalibrated Views of a Surface of Revolution,
BMVC04(xx-yy).
HTML Version.
0508
BibRef
Earlier:
Uncalibrated 3D metric reconstruction and flattened texture acquisition
from a single view of a surface of revolution,
3DPVT02(277-284).
IEEE DOI Link
0206
Surface of revolution. Use textures on the surface.
BibRef
Colombo, C.[Carlo],
Comanducci, D.[Dario],
del Bimbo, A.[Alberto],
Pernici, F.[Federico],
3D Database Population from Single Views of Surfaces of Revolution,
CIAP05(834-841).
Springer DOI Link
0509
BibRef
Earlier:
Accurate Automatic Localization of Surfaces of Revolution for
Self-Calibration and Metric Reconstruction,
PercOrg04(55).
IEEE DOI Link
0502
BibRef
Pernici, F.[Federico],
Two Results in Computer Vision using Projective Geometry,
Ph.D.Thesis, University of Florence Faculty of Engineering Dipartimento di Sistemi e Informatica, 2006.
PDF Version.
BibRef
0600
Werghi, N.[Naoufel],
A robust approach for constructing a graph representation of
articulated and tubular-like objects from 3D scattered data,
PRL(27), No. 6, 15 April 2006, pp. 643-651.
WWW Version. Graph-based 3D shape representation; Articulated and tubular-like objects;
Reeb-graph; Geodesic distance; Graph visualization
0604
BibRef
Lee, S.K.[Seung-Kyu],
Liu, Y.X.[Yan-Xi],
Curved glide-reflection symmetry detection,
CVPR09(1046-1053).
IEEE DOI Link
0906
BibRef
Lee, S.K.[Seung-Kyu],
Collins, R.T.[Robert T.],
Liu, Y.X.[Yan-Xi],
Rotation symmetry group detection via frequency analysis of
frieze-expansions,
CVPR08(1-8).
IEEE DOI Link
0806
BibRef
Chionh, E.W.[Eng-Wee],
Shifting Planes to Follow a Surface of Revolution,
GMP08(xx-yy).
Springer DOI Link
0804
BibRef
Ouzounis, G.K.[Georgios K.],
Wilkinson, M.H.F.[Michael H. F.],
Filament Enhancement by Non-linear Volumetric Filtering Using
Clustering-Based Connectivity,
IWICPAS06(317-327).
Springer DOI Link
0608
BibRef
Beder, C.[Christian],
Förstner, W.[Wolfgang],
Direct Solutions for Computing Cylinders from Minimal Sets of 3D Points,
ECCV06(I: 135-146).
Springer DOI Link
0608
BibRef
Gupta, A.,
Prasad, V.S.N.,
Davis, L.S.,
Extracting Regions of Symmetry,
ICIP05(III: 133-136).
IEEE DOI Link
0512
BibRef
Prasad, V.S.N.[V. Shiv Naga],
Davis, L.S.[Larry S.],
Detecting Rotational Symmetries,
ICCV05(II: 954-961).
IEEE DOI Link
0510
BibRef
Thrun, S.[Sebastian],
Wegbreit, B.[Ben],
Shape from Symmetry,
ICCV05(II: 1824-1831).
IEEE DOI Link
0510
Reconstruct probable surface from 3-D range data.
BibRef
Taki, M.,
Sato, J.,
3d reconstruction and virtual forming in rotationally symmetric space,
ICPR04(II: 261-264).
IEEE DOI Link
0409
BibRef
Spies, H.,
Johansson, B.,
Directional channel representation for multiple line-endings and
intensity levels,
ICIP03(I: 265-268).
IEEE Abstract. IEEE Top Reference.
0312
BibRef
Johansson, B.[Bjorn],
Granlund, G.H.[Gosta H.],
Fast Selective Detection of Rotational Symmetries Using Normalized
Inhibition,
ECCV00(I: 871-887).
WWW Version.
0205
BibRef
Johansson, B.[Bjorn],
Knutsson, H.[Hans],
Granlund, G.H.[Gosta H.],
Detecting Rotational Symmetries Using Normalized Convolution,
ICPR00(Vol III: 496-500).
IEEE DOI Link
HTML Version.
0009
BibRef
Yu, Q.[Qingfeng],
Lu, H.Q.[Han-Qing],
Ma, S.D.[Song-De],
Computer Analysis of Rotational Symmetry in CBED Patterns,
ICPR00(Vol III: 746-749).
IEEE DOI Link
IEEE DOI Link
HTML Version.
0009
BibRef
Chaudhuri, B.,
Adiga, P.U.[P. Umesh],
Analysis of Volumetric Images of Filamentous Bacteria in
Industrial Sludge,
ICPR98(Vol II: 1735-1737).
IEEE DOI Link
9808
BibRef
Lenz, R.[Reiner],
Homma, K.[Kazuhiro],
Rotational Symmetry: The Lie Group SO(3) and Its Representations,
ICIP96(III: 203-206).
IEEE DOI Link
BibRef
9600
Fleck, M.M.[Margaret Morrison],
Local Rotational Symmetries,
CVPR86(332-337).
BibRef
8600
And:
Longer version:
MIT AI-TR-852, August 1985.
WWW Version. Extends Brady and Asada
(
See also Smoothed Local Symmetries and Their Implementation. ) to curves. Very time consuming algorithm.
BibRef
Fleck, M.M.[Margaret Morrison],
Classifying Symmetry Sets,
BMVC90(297-302).
PDF Version.
BibRef
9000
Hoffelder, M.,
Sauer, K.,
Rigby Jr., J.K.,
A Hough Transform Technique for Detection of
Rotationally Invariant Surface Features,
ICIP94(I: 944-948).
IEEE DOI Link
BibRef
9400
Chapter on 3-D Object Description and Computation Techniques, Surfaces, Deformable, View Generation, Video Conferencing continues in
General Three-Dimensional Symmetries .