Multifractals in Real World

1. ICT COLLEGEICT COLLEGE OF VOCATIONAL STUDIES Multifractals in Real World Goran Zajic

2. Agenda • Introductions to fractals • Fractals in architecture • Introduction to multifractals • Multifractals in real world • Application in biomedical engeenering • Application in acoustics • Application in video processing

3. Fractals • The fractal concept has been introduced by Benoit Mandelbrot in the middle of last century. • Fractals can be defined as structures with scalable property or as set of objects, entities that are similar to the whole unit.

4. Self-similarity • Fractals have self-similarity property. • A structure is self-similar if it has undergone a transformation whereby the dimensions of the structure were all modified by the same scaling factor. • Relative proportions of the shapes sides and internal angles remain the same.

5. Fractals • Two types of fractals: • Deterministic fractals : artifitial fractals generated using specific rule for transformation (self-similarity exist in all scales). • Random fractals: Nature fractals with self-similarity properties in limited range of scales.

6. Fractals – Example 1 • Cantor Set Data je linija. Podeli sa na 3. Ukloni se srednji deo. Line is divided into 3 parts. The central part is removed. The same rule is repeated for new created parts of original line. Ponavlja se procedura za svaki deo.

7. Fractals – Example 2 Line is divided into 3 parts. The central part is removed. Van Koch Curve Von Koch kriva New four segments.

8. Fractals – Example 3 asddadsdasdasdadasdasdasdsadsadasdas Line is divided into 3 parts. The casasas Von Koch pahuljica Van Koch Snowflake New four segments.

9. Fractals – Example 4 Sierpinski Carpet New nine quadratic fields. Central one is removed

10. Fractal dimension • Fractal dimension is describing how a set of items are filing the 'space' • Three types of Fractal dimension: • Self-similarity dimension (Ds) • Measured dimension (d) • Box-counting dimension (Db)

11. Fractal dimension • Self-similarity dimension (Ds): • Measured dimension (d) • Set of strate line segments which cover the curve of fractal structure. • Smaller segments, better approximation of structure curve. N – number of copiesr < 1 – scaling ratio Connection between dimensions : Ds = d + 1

12. N=52 Fractal dimension • Box-counting dimension (Db) L=1 e=1/22 N – number of colored boxes - dimension of box DB(e)=lnN/ln DB(e)=1.278 DB(e0)=1.25

13. Fractals – Example 1 • Cantor Set N – number of copies(2) r < 1 – scaling ratio (1/3) Data je linija. Podeli sa na 3. Ukloni se srednji deo. Line is divided into 3 parts. The central part is removed. The same rule is repeated for new created parts of original line. Ponavlja se procedura za svaki deo. D=1 (line), D<1 (fractal line)

14. Fractals – Example 2 Line is divided into 3 parts. The central part is removed. Van Koch Curve Von Koch kriva New four segments. Fractal line(1D signal): 1<DS<2 Fractalsurface (2D signal, slika): 2<DS<3 Fractal volume: 3<DS<4 N = 4, r =1/3

15. Fractals – Example 4 Sierpinski Carpet New nine quadratic fields. Central one is removed N =8 fields r =1/3 scaling ratio D=2 (surface) D<2 (fractal surface)

16. Introduction to fractals “Fractal is a structure, composed of parts, which in some sense similar to the whole structure” B. Mandelbrot

17. Introduction to fractals “The basis of fractal geometry is the idea of self-similarity” S. Bozhokin

18. Introduction to fractals “Nature shows us […] another level of complexity. Amount of different scales of lengths in [natural] structures is almost infinite” B. Mandelbrot

19. Fractals in Architecture Visualization of object in different planes and scale. Fractal dimension is used for object description and comparison.

20. Multifractals • Fractal dimension is not the same in all scales

21. Multifractal Analysis • Presents the way of describing irregular objects and phenomena. • Multifractal formalism is based on the fact that the highly nonuniform distributions, arising from the nonuniformity of the system, often have many scalable features including self-similarity describing irregular objects and phenomena.

22. Multifractal Analysis (MA) • Studying the so-called long-term dependence (long range dependency), dynamics of some physical phenomena and the structure and nonuniform distribution of probability, • MA can be used for characterization of fractal characteristics of the results of measurements. • Multifractal analysis studies the local and global irregularities of variables or functions in a geometrical or statistical way. • Multifractal formalism describes the statistical properties of these singular results of measurements in the form of their generalized dimensions (local property) and their singularity spectrum (global)

23. Multifractal Analysis (MA) • There are several ways to determine the multifractal parameters and one of the most common is called box-counting method. Histogram based algorithm forcalculation of MA singularity spectrum.

24. Multifractal Analysis (MA) Legendre multifractal singularity spectrum

25. MA - Biomedical engineering • Random signals (self-similarity). • PMV versus Healthy classification • PMV (Prolaps Mitral Valve) heart beat anomaly. • PMV signal has weak statistical properties.

26. Heart beat signal with PMV anomaly.

27. MA - Biomedical engineering Analysis of Multifractal singularity spectrum

28. Transformation of MA spectrum to angle domain and classification

29. MA - Acoustics • Random signals (self-similarity). • Detection of early reflections in room impulse response • Aplication of Inverse MA. • Signal is tranform into MA alpha domain. • Detection of reflections is performed on alpha values.

30. MA - Acoustics Real room impulse response Structure of room impulse response

31. MA - Acoustics Detection of early reflections in room impulse response

32. MA - Video processing • Random signals (self-similarity) • Shot boundary detection • Color and texture features are extracted from video frames. • Inverse MA is implemented on time series of specific feature elements.

33. MA - Video processing Co-occurrence feature Wavelet feature

34. MA - Video processing Shot boundary detection in MA alpha domain Co-occurrence feature Wavelet feature