7.1.1 Shape Decomposition

Chapter Contents (Back)
Decomposition.

Pavlidis, T.,
Analysis of set patterns,
PR(1), No. 2, November 1968, pp. 165-178.
Elsevier DOI 0309
Decompose into polygons and recognize. Shape decomposition. BibRef

Bjorklund, C.M., Pavlidis, T.,
Global Shape Analysis by k-Syntactic Similarity,
PAMI(3), No. 2, March 1981, pp. 144-155. BibRef 8103
And: A1 only: Ph.D.Thesis, Princeton, May 1979. BibRef

Bjorklund, C.M., Pavlidis, T.,
Global Shape Decomposition Using the k-Syntactic Similarity Approach,
PRIP79(445-452). BibRef 7900

Reinhardt, J.M., Higgins, W.E.,
Efficient Morphological Shape Representation,
IP(5), No. 1, January 1996, pp. 89-101.
IEEE DOI BibRef 9601
Earlier:
Strategy for shape-based image analysis,
ICIP95(I: 502-505).
IEEE DOI 9510
BibRef
Earlier:
Flexible Search-Based Approach for Morphological Shape Decomposition,
SPIE(2094), Visual Communication, Boston, November 1993, pp. 1424-1435. Shape Representation. BibRef

Reinhardt, J.M., Higgins, W.E.,
Comparison Between the Morphological Skeleton and Morphological Shape Decomposition,
PAMI(18), No. 9, September 1996, pp. 951-957.
IEEE DOI BibRef 9609
Earlier:
Automatic generation of image-segmentation processes,
ICIP94(III: 791-795).
IEEE DOI 9411
Morphology. BibRef

Abe, K.[Keiichi], Arcelli, C.[Carlo], Hisajama, T.[Takeshi], Ibaraki, T.[Toshio],
Parts of Planar Shapes,
PR(29), No. 10, October 1996, pp. 1703-1711.
Elsevier DOI Shape Decomposition. BibRef 9610

Latecki, L.J.[Longin Jan], Lakämper, R.[Rolf],
Convexity Rule for Shape Decomposition Based on Discrete Contour Evolution,
CVIU(73), No. 3, March 1999, pp. 441-454.
DOI Link
See also Application of planar shape comparison to object retrieval in image databases. BibRef 9903

Kim, D.H.[Duck Hoon], Yun, I.D.[Il Dong], Lee, S.U.[Sang Uk],
A new shape decomposition scheme for graph-based representation,
PR(38), No. 5, May 2005, pp. 673-689.
Elsevier DOI 0501
BibRef
Earlier:
Graph-based representation for 2-d shape using decomposition scheme,
ICIP04(V: 3081-3084).
IEEE DOI 0505
Constrained morphological decomposition. BibRef

Prasad, L.[Lakshman],
Rectification of the chordal axis transform skeleton and criteria for shape decomposition,
IVC(25), No. 10, 1 October 2007, pp. 1557-1571.
Elsevier DOI 0709
Shape; Delaunay triangulation; Chordal axis; Medial axis; Skeleton; Shape decomposition; Co-circularity; Shape graph; Grouping BibRef

Dutt, M.[Mousumi], Biswas, A.[Arindam], Bhowmick, P.[Partha],
Approximate partitioning of 2D objects into orthogonally convex components,
CVIU(117), No. 4, April 2013, pp. 326-341.
Elsevier DOI 1303
Convex component; Convex decomposition; Image analysis; Polygon decomposition; Shape decomposition; Shape analysis BibRef

Wang, C.[Chun], Liu, W.Y.[Wen-Yu], Lai, Z.Y.[Zhong-Yuan], Wang, H.Y.[Hong-Yuan],
Perceptually friendly shape decomposition by resolving segmentation points with minimum cost,
JVCIR(24), No. 3, April 2013, pp. 270-282.
Elsevier DOI 1303
Part; Resolve; DCE; Relevance measure; Optimization; Protrusion; Human perception; Relation matrices BibRef

Wang, C.[Chun], Lai, Z.Y.[Zhong-Yuan],
Shape decomposition and classification by searching optimal part pruning sequence,
PR(54), No. 1, 2016, pp. 206-217.
Elsevier DOI 1603
Shape decomposition BibRef

Arslan, M.F., Tari, S.,
Complexity of Shapes Embedded in Zn with a Bias Towards Squares,
IP(29), 2020, pp. 8870-8879.
IEEE DOI 2009
Shape, Complexity theory, Shape measurement, Level set, Transforms, Robustness, ARS-RBS morphological analysis methods, TEC-FOR reconstructibility BibRef

Blana, N.[Natalia], Tsoulos, L.[Lysandros],
Generalization of Linear and Area Features Incorporating a Shape Measure,
IJGI(11), No. 9, 2022, pp. xx-yy.
DOI Link 2209
BibRef


Yang, H.Z.[Hui-Zong], Yezzi, A.J.[Anthony J.],
Decomposing the Tangent of Occluding Boundaries According to Curvatures and Torsions,
ECCV22(XXXII:123-138).
Springer DOI 2211
BibRef

Papanelopoulos, N.[Nikos], Avrithis, Y.[Yannis],
Planar shape decomposition made simple,
BMVC15(xx-yy).
DOI Link 1601
BibRef

Fotopoulou, F.[Foteini], Psarakis, E.Z.[Emmanouil Z.],
Spectral Shape Decomposition by Using a Constrained NMF Algorithm,
FSLCV14(III: 30-43).
Springer DOI 1504
Nonnegative Matrix Factorization. BibRef

Zeng, J.T.[Jing-Ting], Lakaemper, R.[Rolf], Yang, X.W.[Xing-Wei], Li, X.[Xin],
2D Shape Decomposition Based on Combined Skeleton-Boundary Features,
ISVC08(II: 682-691).
Springer DOI 0812
BibRef

Juengling, R.[Ralf], Mitchell, M.[Melanie],
Combinatorial Shape Decomposition,
ISVC07(II: 183-192).
Springer DOI 0711
BibRef

Park, J.S.[Jeong-Sun], Oh, I.S.[Il-Seok],
Shape decomposition and skeleton extraction of character patterns,
ICPR02(III: 411-414).
IEEE DOI 0211
BibRef

Massad, A.[Amin], Medioni, G.[Gerard],
2-D Shape Decomposition into Overlapping Parts,
VF01(398 ff.).
Springer DOI 0209
BibRef

Kim, H.S.[Ho Sung], Haralick, R.M.,
A hybrid shape decomposition using hyperquadrics and mathematical morphology,
ICIP94(II: 101-105).
IEEE DOI 9411
BibRef

Ablameyko, S.V., Frucci, M., Marcelli, A.,
Shape Decomposition by (D1,D2)-Weighted Selection and Directional Information,
ICPR96(II: 275-279).
IEEE DOI 9608
(Univ. di Napoli FedericoII, I) BibRef

Cortopassi, P.P., Rearick, T.C.,
A Computationally Efficient Algorithm for Shape Decomposition,
CVPR88(597-601).
IEEE DOI BibRef 8800

Abidi, M.A., Gonzalez, R.C.,
Harmonic Shape Decomposition,
ICPR86(419-423). BibRef 8600

Chapter on 2-D Feature Analysis, Extraction and Representations, Shape, Skeletons, Texture continues in
Differential and Derivative Filters .


Last update:Mar 25, 2024 at 16:07:51