Recurrence intervals between earthquakes strongly depend on history
arXiv:physics/0410274 · doi:10.1016/j.physa.2004.08.032
Abstract
We study the statistics of the recurrence times between earthquakes above a certain magnitude M$ in California. We find that the distribution of the recurrence times strongly depends on the previous recurrence time $Ï_0$. As a consequence, the conditional mean recurrence time $\hat Ï(Ï_0)$ between two events increases monotonically with $Ï_0$. For $Ï_0$ well below the average recurrence time $\ovÏ, \hatÏ(Ï_0)$ is smaller than $\ovÏ$, while for $Ï_0>\ovÏ$, $\hatÏ(Ï_0)$ is greater than $\ovÏ$. Also the mean residual time until the next earthquake does not depend only on the elapsed time, but also strongly on $Ï_0$. The larger $Ï_0$ is, the larger is the mean residual time. The above features should be taken into account in any earthquake prognosis.
5 pages, 3 figures, submitted to Physica A