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Data Mining using Fractals and Power laws

Data Mining using Fractals and Power laws. Christos Faloutsos Carnegie Mellon University. THANK YOU!. Prof. Srinivasan Parthasarathy. Overview. Goals/ motivation: find patterns in large datasets: (A) Sensor data (B) network/graph data Solutions: self-similarity and power laws

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Data Mining using Fractals and Power laws

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  1. Data Mining using Fractals and Power laws Christos Faloutsos Carnegie Mellon University C. Faloutsos

  2. THANK YOU! • Prof. Srinivasan Parthasarathy C. Faloutsos

  3. Overview • Goals/ motivation: find patterns in large datasets: • (A) Sensor data • (B) network/graph data • Solutions: self-similarity and power laws • Discussion C. Faloutsos

  4. Applications of sensors/streams • ‘Smart house’: monitoring temperature, humidity etc • Financial, sales, economic series C. Faloutsos

  5. Motivation - Applications • Medical: ECGs +; blood pressure etc monitoring • Scientific data: seismological; astronomical; environment / anti-pollution; meteorological C. Faloutsos

  6. # cars Automobile traffic 2000 1800 1600 1400 1200 1000 800 600 400 200 0 time Motivation - Applications (cont’d) • civil/automobile infrastructure • bridge vibrations [Oppenheim+02] • road conditions / traffic monitoring C. Faloutsos

  7. Motivation - Applications (cont’d) • Computer systems • web servers (buffering, prefetching) • network traffic monitoring • ... http://repository.cs.vt.edu/lbl-conn-7.tar.Z C. Faloutsos

  8. Web traffic • [Crovella Bestavros, SIGMETRICS’96] C. Faloutsos

  9. survivable,self-managing storageinfrastructure a storage brick(0.5–5 TB) ~1 PB . . . . . . Self-* Storage (Ganger+) • “self-*” = self-managing, self-tuning, self-healing, … • Goal: 1 petabyte (PB) for CMU researchers • www.pdl.cmu.edu/SelfStar C. Faloutsos

  10. Problem definition • Given: one or more sequences x1 , x2 , … , xt , …; (y1, y2, … , yt, …) • Find • patterns; clusters; outliers; forecasts; C. Faloutsos

  11. Problem #1 # bytes • Find patterns, in large datasets time C. Faloutsos

  12. Problem #1 # bytes • Find patterns, in large datasets time Poisson indep., ident. distr C. Faloutsos

  13. Problem #1 # bytes • Find patterns, in large datasets time Poisson indep., ident. distr C. Faloutsos

  14. Problem #1 # bytes • Find patterns, in large datasets time Poisson indep., ident. distr Q: Then, how to generate such bursty traffic? C. Faloutsos

  15. Overview • Goals/ motivation: find patterns in large datasets: • (A) Sensor data • (B) network/graph data • Solutions: self-similarity and power laws • Discussion C. Faloutsos

  16. Problem #2 - network and graph mining • How does the Internet look like? • How does the web look like? • What constitutes a ‘normal’ social network? • What is the ‘network value’ of a customer? • which gene/species affects the others the most? C. Faloutsos

  17. Network and graph mining Food Web [Martinez ’91] Protein Interactions [genomebiology.com] Friendship Network [Moody ’01] Graphs are everywhere! C. Faloutsos

  18. Problem#2 Given a graph: • which node to market-to / defend / immunize first? • Are there un-natural sub-graphs? (eg., criminals’ rings)? [from Lumeta: ISPs 6/1999] C. Faloutsos

  19. Solutions • New tools: power laws, self-similarity and ‘fractals’ work, where traditional assumptions fail • Let’s see the details: C. Faloutsos

  20. Overview • Goals/ motivation: find patterns in large datasets: • (A) Sensor data • (B) network/graph data • Solutions: self-similarity and power laws • Discussion C. Faloutsos

  21. What is a fractal? = self-similar point set, e.g., Sierpinski triangle: zero area: (3/4)^inf infinite length! (4/3)^inf ... Q: What is its dimensionality?? C. Faloutsos

  22. What is a fractal? = self-similar point set, e.g., Sierpinski triangle: zero area: (3/4)^inf infinite length! (4/3)^inf ... Q: What is its dimensionality?? A: log3 / log2 = 1.58 (!?!) C. Faloutsos

  23. Q: fractal dimension of a line? Q: fd of a plane? Intrinsic (‘fractal’) dimension C. Faloutsos

  24. Q: fractal dimension of a line? A: nn ( <= r ) ~ r^1 (‘power law’: y=x^a) Q: fd of a plane? A: nn ( <= r ) ~ r^2 fd== slope of (log(nn) vs.. log(r) ) Intrinsic (‘fractal’) dimension C. Faloutsos

  25. log(#pairs within <=r ) 1.58 log( r ) Sierpinsky triangle == ‘correlation integral’ = CDF of pairwise distances C. Faloutsos

  26. log(#pairs within <=r ) 1.58 log( r ) Observations: Fractals <-> power laws Closely related: • fractals <=> • self-similarity <=> • scale-free <=> • power laws ( y= xa ; F=K r-2) • (vs y=e-ax or y=xa+b) C. Faloutsos

  27. Outline • Problems • Self-similarity and power laws • Solutions to posed problems • Discussion C. Faloutsos

  28. #bytes time Solution #1: traffic • disk traces: self-similar: (also: [Leland+94]) • How to generate such traffic? C. Faloutsos

  29. 20% 80% Solution #1: traffic • disk traces (80-20 ‘law’) – ‘multifractals’ #bytes time C. Faloutsos

  30. 80-20 / multifractals 20 80 C. Faloutsos

  31. 80-20 / multifractals 20 80 • p ; (1-p) in general • yes, there are dependencies C. Faloutsos

  32. More on 80/20: PQRS • Part of ‘self-* storage’ project time cylinder# C. Faloutsos

  33. p q r s More on 80/20: PQRS • Part of ‘self-* storage’ project q r s C. Faloutsos

  34. Overview • Goals/ motivation: find patterns in large datasets: • (A) Sensor data • (B) network/graph data • Solutions: self-similarity and power laws • sensor/traffic data • network/graph data • Discussion C. Faloutsos

  35. Problem #2 - topology How does the Internet look like? Any rules? C. Faloutsos

  36. Patterns? • avg degree is, say 3.3 • pick a node at random – guess its degree, exactly (-> “mode”) count ? avg: 3.3 degree C. Faloutsos

  37. Patterns? • avg degree is, say 3.3 • pick a node at random – guess its degree, exactly (-> “mode”) • A: 1!! count avg: 3.3 degree C. Faloutsos

  38. Patterns? • avg degree is, say 3.3 • pick a node at random - what is the degree you expect it to have? • A: 1!! • A’: very skewed distr. • Corollary: the mean is meaningless! • (and std -> infinity (!)) count avg: 3.3 degree C. Faloutsos

  39. -0.82 att.com log(degree) ibm.com log(rank) Solution#2: Rank exponent R • A1: Power law in the degree distribution [SIGCOMM99] internet domains C. Faloutsos

  40. Solution#2’: Eigen Exponent E Eigenvalue • A2: power law in the eigenvalues of the adjacency matrix Exponent = slope E = -0.48 May 2001 Rank of decreasing eigenvalue C. Faloutsos

  41. Power laws - discussion • do they hold, over time? • do they hold on other graphs/domains? C. Faloutsos

  42. Power laws - discussion • do they hold, over time? • Yes! for multiple years [Siganos+] • do they hold on other graphs/domains? • Yes! • web sites and links [Tomkins+], [Barabasi+] • peer-to-peer graphs (gnutella-style) • who-trusts-whom (epinions.com) C. Faloutsos

  43. att.com -0.82 log(degree) ibm.com log(rank) Time Evolution: rank R Domain level • The rank exponent has not changed! [Siganos+] C. Faloutsos

  44. The Peer-to-Peer Topology count [Jovanovic+] • Number of immediate peers (= degree), follows a power-law degree C. Faloutsos

  45. epinions.com count • who-trusts-whom [Richardson + Domingos, KDD 2001] (out) degree C. Faloutsos

  46. Why care about these patterns? • better graph generators [BRITE, INET] • for simulations • extrapolations • ‘abnormal’ graph and subgraph detection C. Faloutsos

  47. Recent discoveries [KDD’05] • How do graphs evolve? • degree-exponent seems constant - anything else? C. Faloutsos

  48. Evolution of diameter? • Prior analysis, on power-law-like graphs, hints that diameter ~ O(log(N)) or diameter ~ O( log(log(N))) • i.e.., slowly increasing with network size • Q: What is happening, in reality? C. Faloutsos

  49. Evolution of diameter? • Prior analysis, on power-law-like graphs, hints that diameter ~ O(log(N)) or diameter ~ O( log(log(N))) • i.e.., slowly increasing with network size • Q: What is happening, in reality? • A: It shrinks(!!), towards a constant value C. Faloutsos

  50. Shrinking diameter ArXiv physics papers and their citations [Leskovec+05a] C. Faloutsos

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