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[25] J. C. Nacher and T. Akutsu, “Recent progress on the analysis of power-law features in
complex cellular networks,”
Cell. Biochem. Biophys.
49
, 37-47 (2007).
[26] M. E. J. Newman, “The structure and function of complex networks,”
SIAM Rev
.
45
,47
(2002).
[27] J. C. Oliveira and A.-L. Barabási, “Darwin and Einstein correspondence pattern,”
Nature
437
, 1251 (2005).
[28] D. J. de Sola Price, “A general theory of bibliometric and other cumulative advantage
processes,”
J. Amer. Soc. Inform. Sci.
27
, 292-306 (1976).
[29] P. Sheridan, Y. Yagahara and H. Shimodaira, “A preferential attachment model with Poisson
growth for scale-free networks,”
Ann. Inst. Statist. Math
.
60
, 747-761 (2008).
[30] H. A. Simon, “On a class of skew distribution functions,”
Biometrika
42
, 425-440 (1935).
[31] W. Singer, “The brain - an orchestra without a conductor,”
Max Planck Res
.
18
, 3 (2005).
[32] J. Travers and S. Milgram, “An experimental study of the small world problem,”
Sociometry
32
, 425-443 (1969).
[33] A. Vásquez, “Exact results for the Barabási model of human dynamics,”
Phys.Rev.Lett
.
95
,
248701 (2005).
[34] D. J. Watts,
Six Degrees
, New York: W. W. Norton (2003).
[35] D. J. Watts and S. H. Strogatz, “Collective dynamics of “small-world” networks,”
Nature
393
, 440-442 (1998).
[36] B. J. West,
Where Medicine Went Wrong
, Singapore: World Scientific (2006).
[37] B. J. West and W. Deering,
The Lure of Modern Science
, Singapore: World Scientific (1995).
[38] G. U. Yule, “A mathematical theory of evolution based on the conclusions of Dr. J. C.
Willis,”
Philos. Trans. R. Soc. London B
213
, 21-87 (1925).