Soft bounds on diffusion produce skewed distributions and Gompertz growth.
暂无分享,去创建一个
Marco Cosentino Lagomarsino | Salvatore Mandrà | Marco Gherardi | M. Lagomarsino | M. Gherardi | Salvatore Mandrà | S. Mandrà
[1] D. Sornette,et al. Convergent Multiplicative Processes Repelled from Zero: Power Laws and Truncated Power Laws , 1996, cond-mat/9609074.
[2] G. Romanes. The Origin of the Fittest , 1887, Nature.
[3] Bruno Bassetti,et al. Evidence for soft bounds in Ubuntu package sizes and mammalian body masses , 2013, Proceedings of the National Academy of Sciences.
[4] V. Giorno,et al. A stochastic model in tumor growth. , 2006, Journal of theoretical biology.
[5] Michael Batty,et al. Cities and Complexity: Understanding Cities Through Cellular Automata, Agent-Based Models and Fractals , 2005 .
[6] L. Bertalanffy. Quantitative Laws in Metabolism and Growth , 1957 .
[7] S. Solomon,et al. Spontaneous Scaling Emergence In Generic Stochastic Systems , 1996 .
[8] Amos Maritan,et al. Size and form in efficient transportation networks , 1999, Nature.
[9] Solène Le Bourdiec,et al. Hybrid deterministic/stochastic algorithm for large sets of rate equations , 2012, Comput. Phys. Commun..
[10] HERBERT A. SIMON,et al. The Architecture of Complexity , 1991 .
[11] Kate E. Jones,et al. Body mass of late Quaternary mammals , 2003 .
[12] Tsvi Tlusty,et al. Protein–DNA computation by stochastic assembly cascade , 2002, Proceedings of the National Academy of Sciences of the United States of America.
[13] Mark D. Uhen,et al. The Evolution of Maximum Body Size of Terrestrial Mammals , 2010, Science.
[14] P. Moran,et al. Reversibility and Stochastic Networks , 1980 .
[15] J. Alroy. Cope's rule and the dynamics of body mass evolution in North American fossil mammals. , 1998, Science.
[16] J. Aitchison,et al. The Lognormal Distribution. , 1958 .
[17] Benjamin Gompertz,et al. On the Nature of the Function Expressive of the Law of Human Mortality , 1815 .
[18] Stephen Jay Gould,et al. Cope's rule as psychological artefact , 1997, Nature.
[19] MAXIMUM BODY SIZE IN A RADIATING CLADE AS A FUNCTION OF TIME , 2005, Evolution; international journal of organic evolution.
[20] Eric J. Deeds,et al. Curvature in metabolic scaling , 2010, Nature.
[21] S. Sharma,et al. The Fokker-Planck Equation , 2010 .
[22] J. L. Gittleman,et al. The maximum rate of mammal evolution , 2012, Proceedings of the National Academy of Sciences.
[23] M. Barthelemy,et al. Modeling the polycentric transition of cities. , 2013, Physical review letters.
[24] Rosario N. Mantegna,et al. Book Review: An Introduction to Econophysics, Correlations, and Complexity in Finance, N. Rosario, H. Mantegna, and H. E. Stanley, Cambridge University Press, Cambridge, 2000. , 2000 .
[25] M. Retsky,et al. A stochastic numerical model of breast cancer growth that simulates clinical data. , 1984, Cancer research.
[26] D. Helbing,et al. Growth, innovation, scaling, and the pace of life in cities , 2007, Proceedings of the National Academy of Sciences.
[27] S Redner,et al. Evolutionary model of species body mass diversification. , 2008, Physical review letters.
[28] L. Walford,et al. Bioenergetics and Growth , 1947 .
[29] B. Derrida,et al. of Statistical Mechanics : Theory and Experiment Non-equilibrium steady states : fluctuations and large deviations of the density and of the current , 2007 .
[30] M. Marsili,et al. Interacting Individuals Leading to Zipf's Law , 1998, cond-mat/9801289.
[31] Aaron Clauset,et al. The Evolution and Distribution of Species Body Size , 2008, Science.