References

1

C. Fortin, R. Kumaresan, W. Ohley, and S. Hoefer. Fractal dimension in the analysis of medical images. IEEE Engineering in Medicine and Biology, 11:65-71, 1992.

2

A. Pentland. Fractal-based description of natural scenes. In IEEE Computer Society Conference on Computer Vision and Pattern Recognition, pages 201-209, 1983.

3

C.C. Chen, J.S. Daponte, and M.D. Fox. Fractal feature analysis and classification in medical imaging. IEEE Transactions on Medical Imaging, 8:133-142, 1989.

4

A.P. Pentland. Fractal based description of natural scenes. IEEE Trans. Pattern Anal. Machine Intell., 6:661-674, 1984.

5

J. Gangepain and C. Roques-Carmes. Fractal approach to two-dimensional and three-dimensional surface roughness. WEAR, 109:119-126, 1986.

6

S.S. Chen, J.M. Keller, and R.M. Crownover. On the calculation of fractal features from images. IEEE Trans. Pattern Anal. Machine Intell., 15:1087-1090, 1993.

7

T. Lundahl, W.J. Ohley, and W.S. Kuklinski. Analysis and interpretation of angiographic images by use of fractals. Trans. IEEE, pages 355-358, 1985.

8

N. Sarkar and B.B. Chaudhuri. An efficient differential box-counting approach to compute the fractal dimension of image. IEEE Trans. Systems Man Cybern., 24:115-120, 1994.

9

S. Peleg, J. Naor, R. Hartley, and D. Avnir. Multiple resolution texture analysis and classification. IEEE Transactions on Pattern Analysis and Machine Intelligence, 6:518-523, 1984.

10

P. Kube and A. Pentland. On the imaging of fractal surfaces. IEEE Transactions on Pattern Analysis and Machine Intelligence, 10:704-707, 1988.

11

D.J. Field. Relations between the statistics of natural images and the response properties of cortical cells. Journal Optical Society America, 4:2379-2394, 1987.

12

R.F. Voss. Random fractal forgeries. In R.A. Earnshaw, editor, Fundamental Algorithms in Computer Graphics, pages 805-835. Springer-Verlag, 1985.

13

J. Feder. Fractals. Plenum Press, New York and London, 1988.

14

H.E. Schepers, J.H.K.M. Beek, and J.B. Bassingthwaighte. Four methods to estimate the fractal dimension from self-affine signals. IEEE Engineering in Medicine and Biology, 11:57-64, 1992.