Statistical Methods and Modeling of Seismogenesis. Eleftheria Papadimitriou
combinations of two free parameters described in the text."/>
Figure 2.5. Frequency-magnitude distribution of the earthquakes in the synthetic catalogs obtained from the simulation algorithm with different combinations of two free parameters described in the text. In panels a, b and c, labels (1) and (2) refer to the values of parameters S-R and A-R, respectively. The total seismic moment released by the events in all the synthetic catalogs is the same. The bottom data refer to the earthquakes observed in the area starting in 1911 (based on Console et al. 2015). For a color version of this figure, see www.iste.co.uk/limnios/statistical.zip
Figure 2.5(c), where the three plots refer to three different values of the second free parameter A-R, does not show visible differences in the distribution below magnitude 6.0, but a clear difference of the shape above this threshold. This is explained by the fact that parameter A-R has discourages the size of a rupture to expand beyond a length that exceeds A-R times the width of the fault segment. All the plots shown in Figure 2.5 show a clear deviation of the magnitude distribution obtained by the simulation algorithm from a plain linear Gutenberg–Richter distribution. In some cases, the magnitude distributions show a sharp “bump” around a value of magnitude that could be defined as “characteristic” behavior. All three panels of Figure 2.5 also show the magnitude density distribution of the real earthquakes observed in the Corinth fault system and reported in the seismic catalog since 1911. On the basis of a visual comparison, it seems possible to recognize the set of free parameters (0.10, 1.0) as the one that exhibits the best match between the real and simulated catalogs (Figure 2.5(b)), taking into account the large difference in the different scale of the total number of events. This combination of parameters produces a nearly flat magnitude distribution (i.e. a b-value equal to 0) in the magnitude range 5.5 < M < 6.5 that reminds us of the unsegmented option of the WGCEP (2008). In the following, we shall show results of a simulation lasting 100,000 years, obtained by running our algorithm with the selected free parameters S-R and A-R, respectively, equal to 0.1 and 1.0.
2.3.3. Temporal features of the synthetic catalog (2015)
In order to test the potential use of the simulation algorithm for drawing conclusions about the predictability of large earthquakes, one should make a comparison between the synthetic and the real catalog. The analysis was based on some arbitrary criteria to attribute a specific earthquake to one or more segments. The rules adopted for this purpose are: the earthquake must have a minimum magnitude of 6.0; the earthquake is first assigned to the segment that contains the largest number of fractured cells; the same earthquake can also be assigned to other segments if the number of cells ruptured by the event exceeds the number of 600 or at least 80% of the total number of cells for the specific segment. Examples of time-space plots of the synthetic catalogs obtained after applying the above-mentioned criteria to the first 2,500 years are shown by blue bars in Figure 2.6. For the sake of comparison, this figure also shows the 17 earthquakes that are reported in the real catalog since 1700 CE (red squares).
A visual inspection of Figure 2.6 does not reveal any systematic behavior that can be recognized as substantial discrepancy between the synthetic and the real catalogs. Note that Figure 2.6 displays all the ruptures that constitute a single earthquake as individual events. This justifies the apparent larger number of synthetic events with respect to those reported in the real catalog (which assigns each earthquake to a single segment, independently of its size). We observe a non-periodical time distribution, with interevent times ranging from a few years to hundreds of years on the same segment. We can also see earthquakes that rupture different segments as a unique event or more events that occur with very short time separation. This feature is consistent with historical observations.
Figure 2.6. Space-time features of synthetic catalogs concerning earthquakes with M > 6.0 for the first 2,500 years (blue bars). Red squares show the occurrence time and location of the observed earthquakes in the last 300 years (based on Console et al. 2015). For a color version of this figure, see www.iste.co.uk/limnios/statistical.zip
In order to assess whether the earthquake occurrence time on the same segments in the synthetic catalogs behaves as a Poisson process or not, we carried out a statistical analysis of the interevent times for the entire 100,000 years simulation. In this respect, Figure 2.7 shows the interevent time distribution of the simulation. Table 2.1 displays the mean interevent time, the standard deviation and the coefficient of variation for each segment. The relatively short average interevent times of the simulations can be justified by the circumstance that often two or more segments rupture simultaneously in a single earthquake. Along with the above-mentioned temporal parameters, Table 2.1 also reports the results of the difference between the log-likelihood computed by the BPT renewal model and the Poisson time-independent model (dlogL). For the likelihood estimation, we have adopted the values obtained for Tr and Cν reported in Table 2.1 for each fault segment.
Both Figure 2.7 and Table 2.1 show, as expected, that the most active segments are those characterized by larger size and higher slip rate (such as Psathopyrgos, Aigion, Eliki and Xylokastro). The simulation also shows that, especially for the less active segments (offshore Perachora, Skinos and Alepochori), interevent times of several hundreds of years are possible. The coefficient of variation Cν is typically close to 0.6, which would be associated with moderately time-predictable behavior of the seismicity. The log-likelihood difference denotes an outstanding better performance of the renewal model against the time-independent hypothesis. The exception to this pseudo-periodical behavior is presented by segment #4 (offshore Akrata), which exhibits a coefficient of variation slightly larger than 1 and a modest log-likelihood difference.
Figure 2.7. Interevent time distribution from a simulation of 100,000 years of seismic activity across the CGFS (based on Console et al. 2015). For a color version of this figure, see www.iste.co.uk/limnios/statistical.zip
Table 2.1. Statistical parameters of the synthetic catalog (based on Console et al. 2015).
2.3.4. Improvements in the physics-based earthquake simulator (2017–2018)
The next versions of the simulation algorithm developed