Information Technology Reference
In-Depth Information
[23] P. Gong, A. R. Nikolaev and C. van Leeuwen, “Scale-invariant fluctuations of the
dynamical synchronization in human brain electrical activity,”
Phys. Rev. E
76
, 011904
(2007).
[24] P. Gopikrishnan, M. Meyer, L. A. N. Amaral and H. E. Stanley, “Inverse cubic law for the
distribution of stock price variations,”
Eur. Phys. J. B
3
, 139-140 (1998).
[25] P. Grigolini, D. Leddon and N. Scafetta, “The diffusion entropy and waiting-time statistics
and hard X-ray solar flares,”
Phys. Rev. E
65
, 046203 (2002).
[26] B. Gutenberg and C. F Richter,
Seismicity of the Earth and Associated Phenomena
, 2nd
edn., Princeton, NJ: Princeton University Press (1954), pp. 17-19.
[27] J. T. Hack, “Studies of longitudinal stream profiles in Virginia and Maryland,”
U.S. Geol.
Surv. Prof. Paper
294-B
, 45 (1957).
[28] J. M. Hausdorff, C.-K. Peng, Z. Ladin
et al
., “Is walking a random walk? Evidence for
long-range correlations in stride interval of human gait,”
J. Appl. Physiol.
78
(1), 349-358
(1995).
[29] R. J. Herrnstein, “Relative and absolute strength of response as a function of frequency of
reinforcement,”
J. Exp. Anal. Behav
.
29
, 267-272 (1961).
[30] M. A. Hofman, “The fractal geometry of the convoluted brain,”
J. Hirnforsch
.
32
, 103-111
(1991).
[31] R. E. Horton, “Erosional development of streams and their drainage basins: hydrophysical
approach to quantitative morphology,”
Bull. Geol. Soc. Am
.
56
, 275-370 (1945).
[32] B. A. Huberman and L. A. Adamic, “Growth dynamics of the World-Wide Web,”
Nature
401
, 131 (1999).
[33] H. F. Jelinek and E. Fernandez, “Neurons and fractals: how reliable and useful are
calculations of fractal dimensions?,”
J. Neurosci. Methods
81
, 9-18 (1998).
[34] H. Jeong, B. Tombor, R. Albert, Z. N. Oltvai and A.-L. Barabási, “The large-scale
organization of metabolic networks,”
Nature
407
, 651 (2000).
[35] H. Jeong, S. P. Mason, A.-L. Barabási and Z. N. Oltvai, “Lethality and centrality in protein
networks,”
Nature
411
, 41 (2001).
[36] E. R. Kandel, “Small systems of neurons,” in
Mind and Behavior
,eds.R.L.Atkinsonand
R. C Atkinson, San Francisco, CA: W. H. Freeman and Co. (1979).
[37] M. G. Kitzbichler, M. L. Smith, S. R. Christensen and E. Bullmore, “Broadband crit-
icality of human brain network synchronization,”
PLoS Comp. Biol
.
5
, 1-13, www.
ploscombiol.org (2009).
[38] A. N. Kolmogorov, “Local structure of turbulence in an incompressible liquid for very large
Reynolds numbers,”
Comptes Rendus (Dokl.) Acad. Sci. URSS (N.S.)
26
, 115-118 (1941);
“A refinement of previous hypotheses concerning the local structure of turbulence in a
viscous incompressible fluid at high Reynolds number,”
J. Fluid Mech
.
13
, 82-85 (1962).
[39] W. Li, “Random texts exhibit Zipf's-law-like word frequency distribution,”
IEEE Trans.
Information Theory
38
(6), 1842-1845 (1992).
[40] F. Lilerjos, C. R. Edling, L. A. N. Amaral, H. E. Stanley and Y. Aberg, “The web of human
sexual contacts,”
Nature
411
, 907 (2001).
[41] A. J. Lotka, “The frequency distribution of scientific productivity,”
J. Wash. Acad. Sci
.
16
,
317 (1926).
[42] S. Mallat,
A Wavelet Tour of Signal Processing
, 2nd edn., San Diego, CA: Academic Press
(1999).
[43] B. B. Mandelbrot, “On the theory of word frequencies and on related Markovian models
of discourse,” in
Structures of Language and Its Mathematical Aspect
s, ed. R. Jacobson,
New York: American Mathematical Society (1961).
