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2018 | OriginalPaper | Chapter

5. Correlation Dimension

Author : Eric Rosenberg

Published in: A Survey of Fractal Dimensions of Networks

Publisher: Springer International Publishing

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Abstract

Extending the definition to a complex network, we say that \(\mathbb {G}\) has correlation dimension \(d_{ \stackrel {}{C}}\) if the fraction C(s) of nodes at a distance less than s from a random node follows the scaling law.

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previous chapter Lower Bounds on Box Counting

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10.

Eguiluz, V.M., Hernandez-Garcia, E., Piro, O., and Klemm, K. (2003). Effective Dimensions and Percolation in Hierarchically Structured Scale-Free Networks. Physical Review E, 68: 055102(R).

12.

Falconer, K. (2003). Fractal Geometry: Mathematical Foundations and Applications, 2nd edn. (Wiley, West Sussex, England).CrossRef

20.

Grassberger, P. (1983). Generalized Dimensions of Strange Attractors. Physics Letters, 97A: 227–230.MathSciNetCrossRef

22.

Grassberger P. and Procaccia, I. (1983). Characterization of Strange Attractors. Physical Review Letters, 50: 346–349.MathSciNetCrossRef

23.

Grassberger, P. and Procaccia, I. (1983). Measuring the Strangeness of Strange Attractors. Physica, 9D: 189–208.MathSciNetMATH

32.

Lacasa, L. and Gómez-Gardeñes, J. (2013). Correlation Dimension of Complex Networks. Physical Review Letters, 110: 168703.CrossRef

33.

Lacasa, L. and Gómez-Gardeñes, J. (2014). Analytical Estimation of the Correlation Dimension of Integer Lattices. Chaos, 24: 043101.MathSciNetCrossRef

46.

Rosenberg, E. (2016). The Correlation Dimension of a Rectilinear Grid. Journal of Interconnection Networks, 16: 1550010.CrossRef

57.

Song, C., Havlin, S., and Makse, H.A. (2005). Self-similarity of Complex Networks. Nature, 433: 392–395.CrossRef

66.

Wang, X., Liu, Z., and Wang, M. (2013). The Correlation Fractal Dimension of Complex Networks. International Journal of Modern Physics C, 24: 1350033.CrossRef

Title: Correlation Dimension
Author: Eric Rosenberg
Publisher: Springer International Publishing
Book: A Survey of Fractal Dimensions of Networks
Print ISBN: 978-3-319-90046-9

Electronic ISBN: 978-3-319-90047-6

Copyright Year: 2018
DOI: https://doi.org/10.1007/978-3-319-90047-6_5

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