Self-organized criticality in an interface-growth model with quenched randomness

Details Self-organized criticality in an interface-growth model with quenched randomness Self-organized criticality in an interface-growth model with quenched randomness

2010-08-25

arxiv.org/abs/1008.4211v1

Physics

Condensed Matter

Statistical Mechanics

4 pages, 4 figures

Scientific paper

We study a modified model of the Kardar-Parisi-Zhang equation with quenched
disorder, in which the driving force decreases as the interface rises up. A
critical state is self-organized, and the anomalous scaling law with roughness
exponent alpha=0.63 is numerically obtained.

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