论文信息 - Non-universal scaling and dynamical feedback in generalized models of financial markets

Non-universal scaling and dynamical feedback in generalized models of financial markets

We study self-organized models for information transmission and herd behavior in financial markets. Existing models are generalized to take into account the effect of size-dependent fragmentation and coagulation probabilities of groups of agents and to include a demand process. Non-universal scaling with a tunable exponent for the group size distribution is found in the resulting system. We also show that the fragmentation and coagulation probabilities of groups of agents have a strong influence on the average investment rate of the system.

G. J. Rodgers | P. M. Hui | Dafang Zheng | R. D'Hulst

[1] Spatial competition and price formation , 2000, nlin/0005018.

[2] M. Paczuski,et al. Price Variations in a Stock Market with Many Agents , 1997 .

[3] Gregory Bryan. Computing in Science and Engineering , 1999, IEEE Software.

[4] P. Wallace. Mathematical analysis of physical problems , 1972 .

[5] M. Marchesi,et al. Scaling and criticality in a stochastic multi-agent model of a financial market , 1999, Nature.

[6] V. Eguíluz,et al. Transmission of information and herd Behavior: an application to financial markets. , 1999, Physical review letters.

[7] Jeremy J. Ramsden,et al. Company size distribution in different countries , 2000 .

[8] G. J. Rodgers,et al. Democracy versus dictatorship in self-organized models of financial markets , 1999, adap-org/9912003.

[9] 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 .

[10] Dietrich Stauffer,et al. FUNDAMENTAL JUDGEMENT IN CONT-BOUCHAUD HERDING MODEL OF MARKET FLUCTUATIONS , 1999 .

[11] V. Plerou,et al. Scaling of the distribution of fluctuations of financial market indices. , 1999, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[12] A. Banerjee,et al. The Economics of Rumours , 1993 .