4.10.2 Fractal Representations, Fractal Dimension

Mandelbrot, B.B.,
The Fractal Geometry of Nature,
San Francisco: Freeman1968. Fractals. The basic BibRef 6800 Bookon fractals. BibRef

Mandelbrot, B.B.,
Fractals: Form, Chance, and Dimension,
San Francisco: Freeman1977. Fractals. The basic BibRef 7700 Bookon fractals. BibRef

Musgrave, F.K., and Mandelbrot, B.B.,
The art of fractal landscapes,
IBMRD(35), No. 4, 539, July 1991, pp. 535-536. BibRef 9107

Stevens, R.J., Lehar, A.F., and Perston, F.H.,
Manipulation and Presentation of Multidimensional Image Data Using the Peano Scan,
PAMI(5), No. 5, September 1983, pp. 520-526. BibRef 8309

Kube, P.R.[Paul R.], and Pentland, A.P.[Alex P.],
On the Imaging of Fractal Surfaces,
PAMI(10), No. 5, September 1988, pp. 704-707.
IEEE Abstract. IEEE Top Reference.
WWW Version. Relate power spectrum of a surface with that of the image. BibRef 8809

Yokoya, N., Yamamoto, K., Funakubo, N.,
Fractal-Based Analysis of 3D Natural Surface Shapes and Their Application to Terrain Modeling,
CVGIP(46), No. 3, June 1989, pp. 284-302.
WWW Version. BibRef 8906

Heijmans, H.J.A.M., Toet, A.,
Morphological Sampling,
CVGIP(54), No. 3, November 1991, pp. 384-400.
WWW Version. BibRef 9111

Super, B.J., Bovik, A.C.,
Localized Measurement of Image Fractal Dimension Using Gabor Filters,
JVCIR(2), 1991, pp. 114-128. BibRef 9100

Jaggard, D.L., (Ed.)
Special Section on Fractals in Electrical Engineering,
PIEEE(81), No. 10, October 1993, pp. 1423-1533. BibRef 9310

Huang, Q., Lorch, J.R., Dubes, R.C.,
Can the Fractal Dimension of Images Be Measured,
PR(27), No. 3, March 1994, pp. 339-349.
WWW Version. BibRef 9403

Bell, S.B.M.,
Fractals: A Fast, Accurate and Illuminating Algorithm,
IVC(13), No. 4, May 1995, pp. 253-257.
WWW Version. BibRef 9505

Krueger, W.M., Jost, S.D., Rossi, K., Axen, U.,
On Synthesizing Discrete Fractional Brownian-Motion with Applications to Image-Processing,
GMIP(58), No. 4, July 1996, pp. 334-344. 9609For Fractal Dimension estimation. BibRef

Tang, Y.Y., Li, B.F., Ma, H., Liu, J.M.,
Ring-Projection-Wavelet-Fractal Signatures: A Novel-Approach To Feature-Extraction,
CirSysSignal(45), No. 8, August 1998, pp. 1130-1134. 9809 BibRef

Tang, Y.Y., Li, B.F., Ma, H., Liu, J.M., Suen, C.,
A Novel Approach to Optical Character Recognition Based on Ring-Projection-Wavelet-Fractal Signatures,
ICPR96(II: 325-329).
WWW Version. 9608(Hong Kong Baptist Univ., HK) BibRef

Lonardi, S.[Stefano], Sommaruga, P.[Paolo],
Fractal image approximation and orthogonal bases,
SP:IC(14), No. 5, March 1999, pp. 413-423.
WWW Version. BibRef 9903

Zeng, X., Koehl, L., Vasseur, C.,
Design and implementation of an estimator of fractal dimension using fuzzy techniques,
PR(34), No. 1, January 2001, pp. 151-169.
WWW Version. 0010 BibRef

Carlin, M.[Mats],
Measuring the complexity of non-fractal shapes by a fractal method,
PRL(21), No. 11, October 2000, pp. 1013-1017. 0010 BibRef

McGunnigle, G., Chantler, M.J.,
Evaluating Kube and Pentland's fractal imaging model,
IP(10), No. 4, April 2001, pp. 534-542.
WWW Version. 0104 See also On the Imaging of Fractal Surfaces. BibRef

Lundmark, A., Wadströmer, N., Li, H.,
Hierarchical Subsampling Giving Fractal Regions,
IP(10), No. 1, January 2001, pp. 167-173.
WWW Version. 0101 BibRef

Tolle, C.R., McJunkin, T.R., Gorsich, D.J.,
Suboptimal minimum cluster volume cover-based method for measuring fractal dimension,
PAMI(25), No. 1, January 2003, pp. 32-41.
IEEE Abstract. IEEE Top Reference.
WWW Version. 0301 BibRef

Marsh, R.[Ronald],
FractalNet: A biologically inspired neural network approach to fractal geometry,
PRL(24), No. 12, August 2003, pp. 1881-1887.
WWW Version. 0304 BibRef

Chang, H.T.[Hsuan T.],
Arbitrary affine transformation and their composition effects for two-dimensional fractal sets,
IVC(22), No. 13, 1 November 2004, pp. 1117-1127.
WWW Version. 0410 BibRef

Duh, D.J., Jeng, J.H., Chen, S.Y.,
DCT based simple classification scheme for fractal image compression,
IVC(23), No. 13, 29 November 2005, pp. 1115-1121.
WWW Version. 0512 BibRef

Xu, S.[Shujian], Weng, Y.J.[Yong-Ji],
A new approach to estimate fractal dimensions of corrosion images,
PRL(27), No. 16, December 2006, pp. 1942-1947.
WWW Version. 0611Corrosion image; FD determination; Image FD; Pit diameter distribution; Pit depth distribution; Relativity analysis BibRef

Ozawa, K.[Kuzumasa],
Dual fractals,
IVC(26), No. 5, May 2008, pp. 622-631.
WWW Version. 0803 BibRef
Earlier:
Dual Fractals: Theory and Applications,
SCIA01(P-W5). 0206Dual fractals; Dual-similarity; Hutchinson operator; Image coding; Template matching; Secret sharing; Feature extraction BibRef

Bouridane, A., Alexander, A., Nibouche, M., Crookes, D.,
Application of Fractals to the Detection and Classification of Shoeprints,
ICIP00(Vol I: 474-477).
IEEE Abstract. IEEE Top Reference. 0008 BibRef

Chu, H.T., Chen, C.C.,
A Fast Algorithm for Generating Fractals,
ICPR00(Vol III: 302-305).
WWW Version.
HTML Version. 0009 BibRef

Shen, J., Zhang, T.X., Li, J.,
New Fractal Feature with Application in Image Analysis,
SCIA99(Image Analysis). BibRef 9900

Skarbek, W.[Wladyslaw],
On Convergence of Discrete and Selective Fractal Operators,
CAIP99(201-208).
WWW Version. 9909 BibRef

Vehel, J.L.[J. Levy],
About Lacunarity, Some Links Between Fractal and Integral Geometry and an Application to Texture Segmentation,
ICCV90(380-384).
WWW Version. BibRef 9000

Feng, J., Lin, W., Chen, C.,
Fractional Box-Counting Approach to Fractal Dimension Estimation,
ICPR96(II: 854-858).
WWW Version. 9608(Northwestern Univ., USA) BibRef

Chernov, V.,
Tauber Theorems for Dirichlet Series and Fractals,
ICPR96(II: 656-661).
WWW Version. 9608(Image Processing Systems Inst., RUS) BibRef

Nikiel, S.S.,
Noise suppression based on the fractal dimension estimates,
ICIP96(II: 193-196).
WWW Version. 9610 BibRef

Swarnakar, V., Acharya, R.S.,
Fractal dimension estimation using continuous alternating sequential filter pyramid,
ICIP95(III: 652-655).
WWW Version. 9510 BibRef

Talukdar, D., Acharya, R.,
Estimation of fractal dimension using alternating sequential filters,
ICIP95(I: 231-234).
WWW Version. 9510 BibRef

Chapter on Computational Vision, Regularization, Connectionist, Morphology, Scale-Space, Perceptual Grouping, Wavelets, Color, Sensors, Optical, Laser, Radar continues in
Fractal Based Coding and Compression, Fractal Coding, Fractal Compression .