6–7 Jul 2026
Wydział Fizyki Uniwersytetu Warszawskiego
Europe/Warsaw timezone

On inverse power cluster-size distributions generated by the Random Domino Automaton

7 Jul 2026, 15:40
20m
Sala 0.06 (Wydział Fizyki Uniwersytetu Warszawskiego)

Sala 0.06

Wydział Fizyki Uniwersytetu Warszawskiego

ul. Pasteura 5, Warszawa

Speaker

Mariusz Białecki (Instytut Geofizyki PAN)

Description

The Random Domino Automaton (RDA)—a slowly driven system in the form of a one-dimensional stochastic cellular automaton—was introduced as a stylized simple model of earthquake statistics to provide a basis for the interrelation of Gutenberg–Richter law and Omori law with the waiting time distribution for earthquakes. The Gutenberg–Richter distribution provides a universal relationship between the frequency of earthquakes and their size, and—if earthquake magnitude is measured by their energy (or seismic moment)—it has the form of an inverse power-law distribution.

In the RDA model, energy-related clusters can grow, merge, and disintegrate (trigger avalanches) depending on specific system parameters, which in stationary conditions is described in terms of the coupled recurrence relation for cluster-size statistics. This formulation proves appropriate for studying the role of these mechanisms in the formation of discrete inverse power-law distributions, or discrete Zeta distributions.

By asymptotic analysis of the relationship between the avalanche probability and the resulting stationary cluster-size distribution, we show that the convolution term in the governing equation, which encodes cluster merging, plays a decisive role in generating inverse power-law relations for a wide regime of parameters.

We conclude by pointing out an interesting connection of RDA-type systems with well-known Catalan-like integer sequences (Catalan, Motzkin, Schröder numbers) and also mention the generalization of RDA to the geometry of the Bethe lattice.

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