An algorithm for computing the fractal dimension of waveforms

Applied Mathematics and Computation

Volumn 195, Issue 2, 2008, Pages 598-603

  Paramanathan, P ^a   Uthayakumar, R ^a  

^a GANDHIGRAM RURAL UNIVERSITY   (India)

Author keywords

Fractal dimension (FD); Waveforms; Weierstrass function

Indexed keywords

ALGORITHMS; SIGNAL ANALYSIS; TRANSIENT ANALYSIS; WAVEFORM ANALYSIS;

PHYSIOLOGICAL FUNCTIONS; TRANSIENT DETECTION; WEIERSTRASS FUNCTIONS;

FRACTAL DIMENSION;

EID: 37349061961     PISSN: 00963003     EISSN: None     Source Type: Journal    
DOI: 10.1016/j.amc.2007.05.011     Document Type: Article

References (7)

1. Falconer J. Fractal Geometry-Mathematical Foundations and Applications (2003), John Wiley and Sons
2. Mandelbrot B.B. The Fractal Geometry of Nature (1983), Freeman, New York
3. Carlin M. Measuring the complexity of non-fractal shapes by a fractal method. Pattern Recognition Letters (2000) 1013-1017
4. Higuchi T. Approach to an irregular time series on the basis of the fractal theory. Physica D 31 (1988) 277-283
5. Katz M. Fractals and the analysis of waveforms. Comput. Biol. Med. 18 3 (1988) 145-156
6. Normant F., and Tricot C. Method for evaluating the fractal dimension of curves using convex hulls. Phys. Rev. A (1991) 6518-6525
7. Tricot C. Curves and Fractal Dimension (1995), Springer-Verlag, New York