Self-organized criticality in a continuous, nonconservative cellular automaton modeling earthquakes
- 24 February 1992
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 68 (8), 1244-1247
- https://doi.org/10.1103/physrevlett.68.1244
Abstract
We introduce a new nonconservative self-organized critical model. This model is equivalent to a quasistatic two-dimensional version of the Burridge-Knopoff spring-block model of earthquakes. Our model displays a robust power-law behavior. The exponent is not universal; rather it depends on the level of conservation. A dynamical phase transition from localized to nonlocalized behavior is seen as the level of conservation is increased. The model gives a good prediction of the Gutenberg-Richter law and an explanation to the variances in the observed b values.Keywords
This publication has 16 references indexed in Scilit:
- Statistical properties of the cellular-automaton model for earthquakesPhysical Review A, 1991
- Self-organized criticality in a stick-slip processPhysical Review Letters, 1991
- A simplified spring‐block model of earthquakesGeophysical Research Letters, 1991
- Cascades and self-organized criticalityJournal of Statistical Physics, 1990
- Conservation laws, anisotropy, and ‘‘self-organized criticality’’ in noisy nonequilibrium systemsPhysical Review Letters, 1990
- Properties of earthquakes generated by fault dynamicsPhysical Review Letters, 1989
- Dissipative transport in open systems: An investigation of self-organized criticalityPhysical Review Letters, 1989
- Evidence of bias in estimations of earthquake sizeNature, 1988
- Self-organized criticality: An explanation of the 1/fnoisePhysical Review Letters, 1987
- A simulation of earthquake occurrencePhysics of the Earth and Planetary Interiors, 1972