Båth's law and the self‐similarity of earthquakes

Console, Rodolfo; Lombardi, Anna Maria; Murru, Maura; Rhoades, David A.

doi:10.1029/2001jb001651

Cited by 85 publications

(60 citation statements)

References 18 publications

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“…A number of extensive studies of the statistical variability of Dm have been carried out (VERE-JONES, 1969;KISSLINGER and JONES, 1991;TSAPANOS, 1990;FELZER et al, 2002FELZER et al, , 2003CONSOLE et al, 2003;. Despite progress in understanding the nature of Ba˚th's law, its validity still remains an open question.…”

Section: Modified Ba˚th's Lawmentioning

confidence: 99%

Aftershock Statistics

Shcherbakov

Turcotte

Rundle

2005

Pure appl. geophys.

134

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The statistical properties of aftershock sequences are associated with three empirical scaling relations: (1) Gutenberg-Richter frequency-magnitude scaling, (2) Ba˚th's law for the magnitude of the largest aftershock, and (3) the modified Omori's law for the temporal decay of aftershocks. In this paper these three laws are combined to give a relation for the aftershock decay rate that depends on only a few parameters. This result is used to study the temporal properties of aftershock sequences of several large California earthquakes. A review of different mechanisms and models of aftershocks are also given. The scale invariance of the process of stress transfer caused by a main shock and the heterogeneous medium in which aftershocks occur are responsible for the occurrence of scaling laws. We suggest that the observed partitioning of energy could play a crucial role in explaining the physical origin of Ba˚th's law. We also study the stress relaxation process in a simple model of damage mechanics and find that the rate of energy release in this model is identical to the rate of aftershock occurrence described by the modified Omori's law.

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Section: Modified Ba˚th's Lawmentioning

confidence: 99%

Aftershock Statistics

Shcherbakov

Turcotte

Rundle

2005

Pure appl. geophys.

134

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“…These studies yield α-value close to 1, but the limited range of the mainshock magnitude considered and the large scatter of the number of aftershocks per mainshock do not allow an accurate estimation of α. The case α = b also explains another well documented property of aftershocks, known as Bath's Law [Bath, 1965;Drakatos et al, 2001;Felzer et al, 2002;Console et al, 2002], which states that the difference between the mainshock magnitude and its largest aftershock is on average close to 1, independently of the mainshock magnitude. Again, the limited range of mainshock magnitudes used in these studies and possible biases in the method of data selection [VereJones, 1969;Console et al, 2002] does not allow one to test the dependence of the magnitude difference as a function of the mainshock magnitude.…”

Section: Introductionmentioning

confidence: 99%

Is Earthquake Triggering Driven by Small Earthquakes?

2003

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Using a catalog of seismicity for Southern California, we measure how the number of triggered earthquakes increases with the earthquake magnitude. The trade-off between this scaling and the distribution of earthquake magnitudes controls the relative role of small compared to large earthquakes. We show that seismicity triggering is driven by the smallest earthquakes, which trigger fewer aftershocks than larger earthquakes, but which are much more numerous. We propose that the non-trivial scaling of the number of aftershocks emerges from the fractal spatial distribution of aftershocks.

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“…According to Bath (1965), generally, this size difference shows a constant value (Dm = 1.2) and does not depend upon the size of main shock which implies that the stress transfer responsible for the occurrence of aftershocks is a self-similar process (Utsu, 2002a;Shcherbakov and Turcotte, 2004). A number of studies have been carried out to show the statistical variability of this law (Kisslinger and Jones, 1991;Tsapanos, 1990;Felzer et al, 2002Felzer et al, , 2003Console et al, 2003;Helmstetter and Sornette, 2003;Yadav et al, , 2011. However, its validity remains an open question, regardless of the progress of understanding the characteristics of Bath's law.…”

Section: Relationship Between Magnitude Of Main Shock and Its Largestmentioning

confidence: 96%