1 / 85

Architecture of Complex Weighted Networks

Architecture of Complex Weighted Networks. Marc Barth é lemy CEA, France. Collaborators. A. Barrat (LPT-Orsay, France) R. Pastor-Satorras (Politechnica Univ. Catalunya) A. Vespignani (Indiana Univ., USA) A. Chessa (Univ. Cagliari, Italy) A. de Montis (Univ. Cagliary, Italy).

sheba
Download Presentation

Architecture of Complex Weighted Networks

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Architecture of Complex Weighted Networks Marc Barthélemy CEA, France

  2. Collaborators • A. Barrat (LPT-Orsay, France) • R. Pastor-Satorras (Politechnica Univ. Catalunya) • A. Vespignani (Indiana Univ., USA) • A. Chessa (Univ. Cagliari, Italy) • A. de Montis (Univ. Cagliary, Italy)

  3. Outline • Weighted Complex networks • Motivations • Characterization: Measurement tools • II. Case-studies: Transportation networks • Inter-cities network: Sardinia • Global network: World Airport Network • III. Modeling • Necessity of topology-traffic coupling: Simple model

  4. Complex Networks • Recent studies on topological properties showed: - broad distribution of connectivities - impact on different processes (eg. Resilience, epidemics)

  5. Beyond Topology: Weighted Networks w ij j i w ji

  6. Beyond Topology: Weighted Networks • Internet, Web, Emails: importance of traffic • Ecosystems: prey-predator interaction • Airport network: number of passengers • Scientific collaboration: number of papers • Metabolic networks: fluxes heterogeneous Are: - Weighted networks - With broad distributions of weights

  7. Motivation Why study weighted networks ? • )The weights can modify the behavior predicted • by topology: • Resilience • Epidemics • …

  8. Motivation: Epidemics • )Epidemics spread on a ‘contact network’ • Social networks (STDs on sexual contact network) • Transportation network (Airlines, railways, highways) • WWW and Internet (e-viruses) )The weights will affect the propagation of the disease )Immunization strategies ?

  9. Topological Characterization of Large Networks All these networks are: • Complex • Very large • Statistical tools needed ! • Statistical mechanics of large networks

  10. Topological Characterization • Diameter: d» logN) ‘small-world’ • d» N1/D ) ‘large world’ • Clustering coeff.: CÀ CRG» 1/N • C(k)» k-) Hierarchy • Assortativity: knn versus k ? • Betweenness centrality, modularity, …

  11. Topological Characterization: P(k) • Connectivity k (kÀ 1: Hubs) • Connectivity distribution P(k) : probability that a node has k links • Usual random graphs: Erdös-Renyi model (1960)

  12. Classes of networks Poisson distribution Power-law distribution Exponential Network Scale-free Network

  13. Weighted Networks )New measurement tools needed !

  14. Weighted networks characterization Generalization of ki: strength • For wij=w0: • For wij and ki independent:

  15. Weighted networks characterization • In general: • If  > 1 or if =1 and A<w> )Existence of strong correlations !

  16. Weighted networks characterization • Weighted clustering coefficient: • If ciw/ci>1: Weights localized on clicques • If ciw/ci<1: Important links don’t form clicques • If w and k uncorrelated ) ciw=ci

  17. Weighted networks characterization • Weighted assortativity: • If knnw(i)/knn(i) >1: Edges with larger weights • point to nodes with larger k

  18. Weighted networks characterization

  19. Weighted networks characterization • « Disparity »: • If Y2(i)» 1/ki¿ 1: No dominant connections • If Y2(i)À 1/ki: A few dominant connections

  20. Weighted networks characterization • Disparity:

  21. Case study: Transportation networks Different studies at different scales: • Intra-urban flows (Eubank et al, PRE 2003, Nature 2004) • Inter-cities flows (with A. Chessa and A. de Montis) • Global flows: Word Airport network (PNAS, 2004)

  22. Airplane route network Nodes: airports Links: direct flight

  23. Case study: Global Air Travel Number of airports 3863; 18807 links Topology: Maximum coordination number 318 Average coordination number 9.74 Average clustering coefficient 0.53 Average shortest path 4.37 Weights: Maximum weight 6167177 (seats/year, 2002) Average weight 74509

  24. Case study: Airport network • Broad distribution: connectivity and weights

  25. Correlations topology-traffic: Airports s(k) proportional to k=1.5 (Randomized weights: s=<w>k: =1) Strong correlations between topology and dynamics

  26. Correlations topology-traffic • <wij>» (kikj) ¼ 0.5

  27. Weighted clustering coefficient: Airport Cw(k) > C(k): larger weights on cliques at all scales (esp. for large k)

  28. Weighted assortativity: Airport knn(k) < knnw(k): larger weights between large nodes For large k ) Large traffic between hubs

  29. Disparity: Airport Y2(k)» 1/k ) No dominant connection

  30. Airport: Summary • Topology: Scale-free network • Rich traffic structure • Strong correlations traffic-topology

  31. Case study: Inter-cities movements • Sardinia: • - Italian island 24,000 km2 • - 1,600,000 inhabitants

  32. Case study: Inter-cities movements • Sardinian network: • Nodes: 375 Cities • Link wji=wij: • # of individuals • going from i • to j (daily and by any means)

  33. Case study: Inter-cities movements-Topology • N=375, E=16,248 ) <k>=43, kmax=279

  34. Case study: Inter-cities movements-Topology • Clustering: <C>¼ 0.26' CRG¼ 0.24

  35. Case study: Inter-cities movements-Topology • Slightly disassortative network

  36. Case study: Inter-cities movements-Traffic • <w>¼ 23, wmax¼ 14.000 (!) P(w)» w-w w¼ 2.2

  37. Case study: Inter-cities movements-Traffic • Correlations: s» k, ' 1.9

  38. Case study: Inter-cities movements-Traffic • Weighted clustering: Hubs form large w-clicques

  39. Case study: Inter-cities movements-Traffic • Weighted assortativity: Large w between hubs

  40. Case study: Inter-cities movements-Traffic • Y2(k) » k-, ' 0.4 ) Traffic jams !

  41. Transportation networks: Summary

  42. Summary: Weighted networks • Broad strength distributions ) weights are relevant ! (independently from topology) • Topology-weight correlations important )Model for networks with heterogeneous and correlated connectivities and weights ?

  43. Weighted networks: Model • Growing network: addition of nodes • Proba(n! i)/ si

  44. Weighted networks: Model • Rearrangement of weights • ¿ 1: No effect (=0: BA model) • À 1: Traffic stimulation

  45. Evolution equations (mean-field)

  46. Analytical results • Power law distributions for k and s: • P(k) ~ k -g ; P(s)~s-g 2 <  < 3: • Strong coupling ! 2 • Weak coupling ! 3

  47. Analytical results • Power law distributions for w: • P(w)» w- • Correlations topology/weights: si ' (2+1)ki  <w> ki

  48. Nonlinear correlations ? • Correlations topology/weights: si ' (2+1)ki  <w> ki) = 1 )How can we obtain   1 ? • Inclusion of space • …

  49. Nonlinear correlations ? • Growing network: addition of nodes + distance • Proba(n! i)/ sif(dni) With: f(d)» e-d/d0 • d0/LÀ 1 ) = 1 • d0/L¿ 1 ) > 1 !

  50. Summary & Perspectives • Weighted networks: Complexity not only topological ! • Very rich traffic structure • Correlations between weights and topology • Model for weighted networks: topology-traffic coupling (variants…) • Perspectives: • Effect of weights heterogeneity on dynamical processes (epidemics) • Getting more data: common features ?

More Related