Source code for openquake.hazardlib.gsim.bindi_2014

# -*- coding: utf-8 -*-
# vim: tabstop=4 shiftwidth=4 softtabstop=4
#
# Copyright (C) 2014-2017 GEM Foundation
#
# OpenQuake is free software: you can redistribute it and/or modify it
# under the terms of the GNU Affero General Public License as published
# by the Free Software Foundation, either version 3 of the License, or
# (at your option) any later version.
#
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# You should have received a copy of the GNU Affero General Public License
# along with OpenQuake. If not, see <http://www.gnu.org/licenses/>.

"""
Module exports :class:`BindiEtAl2014Rjb`,
               :class:`BindiEtAl2014RjbEC8`,
               :class:`BindiEtAl2014RjbEC8NoSOF`,
               :class:`BindiEtAl2014Rhyp`,
               :class:`BindiEtAl2014RhypEC8`,
               :class:`BindiEtAl2014RhypEC8NoSOF`
"""
from __future__ import division

import numpy as np

from scipy.constants import g

from openquake.hazardlib.gsim.base import GMPE, CoeffsTable
from openquake.hazardlib import const
from openquake.hazardlib.imt import PGA, PGV, SA


[docs]class BindiEtAl2014Rjb(GMPE): """ Implements European GMPE: D.Bindi, M. Massa, L.Luzi, G. Ameri, F. Pacor, R.Puglia and P. Augliera (2014), "Pan-European ground motion prediction equations for the average horizontal component of PGA, PGV and 5 %-damped PSA at spectral periods of up to 3.0 s using the RESORCE dataset", Bulletin of Earthquake Engineering, 12(1), 391 - 340 The regressions are developed considering the geometrical mean of the as-recorded horizontal components The printed version of the GMPE was corrected by Erratum: D.Bindi, M. Massa, L.Luzi, G. Ameri, F. Pacor, R.Puglia and P. Augliera (2014), "Erratum to Pan-European ground motion prediction equations for the average horizontal component of PGA, PGV and 5 %-damped PSA at spectral periods of up to 3.0 s using the RESORCE dataset", Bulletin of Earthquake Engineering, 12(1), 431 - 448. The erratum notes that the printed coefficients tables were in error. In this implementation coefficients tables were taken from the Electronic Supplementary material of the original paper, which are indicated as being unaffected. """ #: Supported tectonic region type is 'active shallow crust' DEFINED_FOR_TECTONIC_REGION_TYPE = const.TRT.ACTIVE_SHALLOW_CRUST #: Set of :mod:`intensity measure types <openquake.hazardlib.imt>` #: this GSIM can calculate. A set should contain classes from module #: :mod:`openquake.hazardlib.imt`. DEFINED_FOR_INTENSITY_MEASURE_TYPES = set([ PGA, PGV, SA ]) #: Supported intensity measure component is the geometric mean of two #: horizontal components DEFINED_FOR_INTENSITY_MEASURE_COMPONENT = const.IMC.AVERAGE_HORIZONTAL #: Supported standard deviation types are inter-event, intra-event #: and total DEFINED_FOR_STANDARD_DEVIATION_TYPES = set([ const.StdDev.TOTAL, const.StdDev.INTER_EVENT, const.StdDev.INTRA_EVENT ]) #: Required site parameter is only Vs30 REQUIRES_SITES_PARAMETERS = set(('vs30', )) #: Required rupture parameters are magnitude and rake (eq. 1). REQUIRES_RUPTURE_PARAMETERS = set(('rake', 'mag')) #: Required distance measure is Rjb (eq. 1). REQUIRES_DISTANCES = set(('rjb', ))
[docs] def get_mean_and_stddevs(self, sites, rup, dists, imt, stddev_types): """ See :meth:`superclass method <.base.GroundShakingIntensityModel.get_mean_and_stddevs>` for spec of input and result values. """ # extracting dictionary of coefficients specific to required # intensity measure type. C = self.COEFFS[imt] imean = self._get_mean(C, rup, dists, sites) if isinstance(imt, (PGA, SA)): # Convert units to g, # but only for PGA and SA (not PGV): mean = np.log((10.0 ** (imean - 2.0)) / g) else: # PGV: mean = np.log(10.0 ** imean) istddevs = self._get_stddevs(C, stddev_types, len(sites.vs30)) stddevs = np.log(10.0 ** np.array(istddevs)) return mean, stddevs
def _get_mean(self, C, rup, dists, sites): """ Returns the mean ground motion """ return (self._get_magnitude_scaling_term(C, rup.mag) + self._get_distance_scaling_term(C, dists.rjb, rup.mag) + self._get_style_of_faulting_term(C, rup) + self._get_site_amplification_term(C, sites.vs30)) def _get_magnitude_scaling_term(self, C, mag): """ Returns the magnitude scaling term of the GMPE described in equation 3 """ dmag = mag - self.CONSTS["Mh"] if mag < self.CONSTS["Mh"]: return C["e1"] + (C["b1"] * dmag) + (C["b2"] * (dmag ** 2.0)) else: return C["e1"] + (C["b3"] * dmag) def _get_distance_scaling_term(self, C, rval, mag): """ Returns the distance scaling term of the GMPE described in equation 2 """ r_adj = np.sqrt(rval ** 2.0 + C["h"] ** 2.0) return ( (C["c1"] + C["c2"] * (mag - self.CONSTS["Mref"])) * np.log10(r_adj / self.CONSTS["Rref"]) - (C["c3"] * (r_adj - self.CONSTS["Rref"]))) def _get_style_of_faulting_term(self, C, rup): """ Returns the style-of-faulting term. Fault type (Strike-slip, Normal, Thrust/reverse) is derived from rake angle. Rakes angles within 30 of horizontal are strike-slip, angles from 30 to 150 are reverse, and angles from -30 to -150 are normal. Note that the 'Unspecified' case is not considered in this class as rake is required as an input variable """ SS, NS, RS = 0.0, 0.0, 0.0 if np.abs(rup.rake) <= 30.0 or (180.0 - np.abs(rup.rake)) <= 30.0: # strike-slip SS = 1.0 elif rup.rake > 30.0 and rup.rake < 150.0: # reverse RS = 1.0 else: # normal NS = 1.0 return (C["sofN"] * NS) + (C["sofR"] * RS) + (C["sofS"] * SS) def _get_site_amplification_term(self, C, vs30): """ Returns the site amplification term for the case in which Vs30 is used directly """ return C["gamma"] * np.log10(vs30 / self.CONSTS["Vref"]) def _get_stddevs(self, C, stddev_types, num_sites): """ Return standard deviations as defined in table 2. """ stddevs = [] for stddev_type in stddev_types: assert stddev_type in self.DEFINED_FOR_STANDARD_DEVIATION_TYPES if stddev_type == const.StdDev.TOTAL: stddevs.append(C['sigma'] + np.zeros(num_sites)) elif stddev_type == const.StdDev.INTRA_EVENT: stddevs.append(C['phi'] + np.zeros(num_sites)) elif stddev_type == const.StdDev.INTER_EVENT: stddevs.append(C['tau'] + np.zeros(num_sites)) return stddevs #: Coefficients from Table 2 COEFFS = CoeffsTable(sa_damping=5, table=""" imt e1 c1 c2 h c3 b1 b2 b3 gamma sofN sofR sofS tau phi phis2s sigma pgv 2.264810000 -1.224080000 0.202085000 5.061240000 0.000000000 0.162802000 -0.092632400 0.044030100 -0.529443000 -0.009476750 0.040057400 -0.030580500 0.156062000 0.277714000 0.120398000 0.318560000 pga 3.328190000 -1.239800000 0.217320000 5.264860000 0.001186240 -0.085504500 -0.092563900 0.000000000 -0.301899000 -0.039769500 0.077525300 -0.037755800 0.149977000 0.282398000 0.165611000 0.319753000 0.02 3.370530000 -1.263580000 0.220527000 5.200820000 0.001118160 -0.089055400 -0.091615200 0.000000000 -0.294021000 -0.039236000 0.081051600 -0.041815600 0.158670000 0.282356000 0.183959000 0.323885000 0.04 3.439220000 -1.310250000 0.244676000 4.916690000 0.001091830 -0.116919000 -0.078378900 0.000000000 -0.241765000 -0.037720400 0.079778300 -0.042057900 0.154621000 0.291143000 0.187409000 0.329654000 0.07 3.596510000 -1.290510000 0.231878000 5.359220000 0.001820940 -0.085012400 -0.056996800 0.000000000 -0.207629000 -0.045943700 0.087496800 -0.041553000 0.172785000 0.291499000 0.199913000 0.338860000 0.10 3.686380000 -1.281780000 0.219406000 6.121460000 0.002114430 -0.113550000 -0.075332500 0.000000000 -0.173237000 -0.038052800 0.084710300 -0.046658500 0.169691000 0.301967000 0.208178000 0.346379000 0.15 3.686320000 -1.176970000 0.182662000 5.741540000 0.002540270 -0.092872600 -0.102433000 0.073904200 -0.202492000 -0.026729300 0.067844100 -0.041114700 0.152902000 0.305804000 0.212124000 0.341900000 0.20 3.682620000 -1.103010000 0.133154000 5.319980000 0.002420890 0.010085700 -0.105184000 0.150461000 -0.291228000 -0.032653700 0.075976900 -0.043323200 0.150055000 0.300109000 0.190469000 0.335532000 0.26 3.643140000 -1.085270000 0.115603000 5.134550000 0.001964370 0.029939700 -0.127173000 0.178899000 -0.354425000 -0.033843800 0.074982000 -0.041138100 0.151209000 0.302419000 0.187037000 0.338114000 0.30 3.639850000 -1.105910000 0.108276000 5.128460000 0.001499220 0.039190400 -0.138578000 0.189682000 -0.393060000 -0.037245300 0.076701100 -0.039455900 0.157946000 0.297402000 0.174118000 0.336741000 0.36 3.574800000 -1.099550000 0.103083000 4.905570000 0.001049050 0.052103000 -0.151385000 0.216011000 -0.453905000 -0.027906700 0.069789800 -0.041883200 0.165436000 0.294395000 0.175848000 0.337694000 0.40 3.530060000 -1.095380000 0.101111000 4.953860000 0.000851474 0.045846400 -0.162090000 0.224827000 -0.492063000 -0.025630900 0.072566800 -0.046936000 0.157728000 0.296992000 0.169883000 0.336278000 0.46 3.433870000 -1.065860000 0.109066000 4.659900000 0.000868165 0.060083800 -0.165897000 0.197716000 -0.564463000 -0.018663500 0.064599300 -0.045935800 0.173005000 0.291868000 0.164162000 0.339290000 0.50 3.405540000 -1.057670000 0.112197000 4.432050000 0.000788528 0.088318900 -0.164108000 0.154750000 -0.596196000 -0.017419400 0.060282600 -0.042863200 0.180820000 0.289957000 0.165090000 0.341717000 0.60 3.304420000 -1.050140000 0.121734000 4.216570000 0.000487285 0.120182000 -0.163325000 0.117576000 -0.667824000 -0.000486417 0.044920900 -0.044434500 0.182233000 0.292223000 0.175634000 0.344388000 0.70 3.238820000 -1.050210000 0.114674000 4.171270000 0.000159408 0.166933000 -0.161112000 0.112005000 -0.738390000 0.011203300 0.028150600 -0.039353900 0.189396000 0.289307000 0.168617000 0.345788000 0.80 3.153700000 -1.046540000 0.129522000 4.200160000 0.000000000 0.193817000 -0.156553000 0.051728500 -0.794076000 0.016525800 0.020352200 -0.036878300 0.189074000 0.288815000 0.168170000 0.345200000 0.90 3.134810000 -1.046120000 0.114536000 4.480030000 0.000000000 0.247547000 -0.153819000 0.081575400 -0.821699000 0.016449300 0.021242200 -0.037691300 0.191986000 0.293264000 0.183719000 0.350517000 1.00 3.124740000 -1.052700000 0.103471000 4.416130000 0.000000000 0.306569000 -0.147558000 0.092837300 -0.826584000 0.026307100 0.018604300 -0.044911100 0.195026000 0.297907000 0.200775000 0.356067000 1.30 2.898410000 -0.973828000 0.104898000 4.258210000 0.000000000 0.349119000 -0.149483000 0.108209000 -0.845047000 0.025233900 0.022362100 -0.047595700 0.181782000 0.306676000 0.209625000 0.356504000 1.50 2.847270000 -0.983388000 0.109072000 4.566970000 0.000000000 0.384546000 -0.139867000 0.098737200 -0.823200000 0.018673800 0.023089400 -0.041763000 0.177752000 0.316312000 0.218569000 0.362835000 1.80 2.680160000 -0.983082000 0.164027000 4.680080000 0.000000000 0.343663000 -0.135933000 0.000000000 -0.778657000 0.011371300 0.016688200 -0.028059400 0.163242000 0.326484000 0.221367000 0.365020000 2.00 2.601710000 -0.979215000 0.163344000 4.581860000 0.000000000 0.331747000 -0.148282000 0.000000000 -0.769243000 0.005535450 0.019856600 -0.025392000 0.164958000 0.329916000 0.225350000 0.368857000 2.60 2.390670000 -0.977532000 0.211831000 5.395170000 0.000000000 0.357514000 -0.122539000 0.000000000 -0.769609000 0.008734600 0.023314200 -0.032048600 0.170280000 0.320626000 0.210193000 0.363037000 3.00 2.253990000 -0.940373000 0.227241000 5.741730000 0.000000000 0.385526000 -0.111445000 0.000000000 -0.732072000 0.022989300 -0.020662000 -0.002327150 0.176546000 0.314165000 0.207247000 0.360373000 """) CONSTS = {"Mref": 5.5, "Mh": 6.75, "Rref": 1.0, "Vref": 800.0}
[docs]class BindiEtAl2014RjbEC8(BindiEtAl2014Rjb): """ Implements the Bindi et al (2014) GMPE for the case where Joyner-Boore distance is specified but Eurocode 8 Site classification is used. """ def _get_site_amplification_term(self, C, vs30): """ Returns the site amplification given Eurocode 8 site classification """ f_s = np.zeros_like(vs30) # Site class B idx = np.logical_and(vs30 < 800.0, vs30 >= 360.0) f_s[idx] = C["eB"] # Site Class C idx = np.logical_and(vs30 < 360.0, vs30 >= 180.0) f_s[idx] = C["eC"] # Site Class D idx = vs30 < 180.0 f_s[idx] = C["eD"] return f_s #: Coefficients from Table 1 COEFFS = CoeffsTable(sa_damping=5, table=""" imt e1 c1 c2 h c3 b1 b2 b3 eA eB eC eD sofN sofR sofS sofU tau phi phis2s sigma pgv 2.375220000 -1.304700000 0.209460000 5.761910000 0.000000000 0.273952000 -0.051424900 0.000000000 0.000000000 0.122258000 0.276738000 0.380306000 -0.001827210 0.057498900 0.022657800 0.000000000 0.186089000 0.271268000 0.177104000 0.328961000 pga 3.450780000 -1.360610000 0.215873000 6.147170000 0.000732525 -0.020871500 -0.072242500 0.000000000 0.000000000 0.137715000 0.233048000 0.214227000 -0.032284600 0.073677800 -0.019431300 0.000000000 0.180904000 0.276335000 0.206288000 0.330284000 0.02 3.478060000 -1.375190000 0.218095000 5.906840000 0.000710063 -0.026825000 -0.072604300 0.000000000 0.000000000 0.134904000 0.226827000 0.213357000 -0.028085300 0.077531800 -0.020641400 0.000000000 0.182533000 0.278823000 0.208393000 0.333258000 0.04 3.580060000 -1.433270000 0.238839000 5.793940000 0.000685158 -0.056875100 -0.063729800 0.000000000 0.000000000 0.133973000 0.218136000 0.176183000 -0.038661200 0.060308000 -0.033402300 0.000000000 0.180630000 0.289652000 0.220859000 0.341358000 0.07 3.781630000 -1.461340000 0.225844000 6.620190000 0.001175680 -0.043052000 -0.049789000 0.000000000 0.000000000 0.139714000 0.206862000 0.145621000 -0.038893400 0.071260300 -0.027363900 0.000000000 0.194176000 0.296609000 0.235714000 0.354515000 0.10 3.792600000 -1.414410000 0.208667000 6.892480000 0.001601790 -0.058451800 -0.064433500 0.000000000 0.000000000 0.155236000 0.210168000 0.156052000 -0.019545700 0.084246100 -0.022831500 0.000000000 0.181926000 0.306918000 0.244969000 0.356785000 0.15 3.778380000 -1.293440000 0.163550000 6.717350000 0.002028820 -0.035863600 -0.091537900 0.085537200 0.000000000 0.158937000 0.199726000 0.186495000 -0.020557800 0.074269000 -0.026728700 0.000000000 0.181380000 0.305998000 0.241833000 0.355716000 0.20 3.692760000 -1.181950000 0.119101000 5.786590000 0.002122900 0.067201900 -0.091505400 0.145251000 0.000000000 0.138968000 0.216584000 0.199500000 0.018953200 0.133352000 0.026665200 0.000000000 0.177903000 0.300131000 0.219913000 0.348896000 0.26 3.676100000 -1.165490000 0.102609000 5.451920000 0.001653610 0.129716000 -0.097514500 0.135986000 0.000000000 0.126737000 0.249141000 0.229736000 0.023562700 0.143428000 0.039233500 0.000000000 0.178211000 0.300652000 0.200662000 0.349501000 0.30 3.669660000 -1.175200000 0.099164000 5.407320000 0.001247800 0.145499000 -0.104880000 0.135159000 0.000000000 0.113881000 0.259274000 0.252504000 0.018438300 0.138662000 0.043489300 0.000000000 0.184254000 0.295463000 0.193285000 0.348207000 0.36 3.597210000 -1.144790000 0.095007700 5.020640000 0.000918966 0.168179000 -0.114223000 0.149582000 0.000000000 0.109638000 0.274211000 0.282686000 0.012675100 0.122472000 0.036661700 0.000000000 0.184085000 0.295192000 0.187569000 0.347887000 0.40 3.556710000 -1.145200000 0.094317300 5.080660000 0.000672779 0.173884000 -0.120149000 0.151849000 0.000000000 0.110223000 0.280836000 0.301657000 0.022149900 0.129181000 0.046122800 0.000000000 0.191734000 0.292878000 0.180758000 0.350056000 0.46 3.501770000 -1.130800000 0.100456000 4.957770000 0.000583160 0.190813000 -0.123177000 0.130847000 0.000000000 0.108079000 0.298022000 0.347080000 0.017164500 0.115968000 0.044778200 0.000000000 0.199690000 0.291096000 0.182941000 0.353006000 0.50 3.457170000 -1.116310000 0.101994000 4.698770000 0.000508794 0.203522000 -0.126077000 0.122339000 0.000000000 0.108783000 0.305295000 0.370989000 0.016711700 0.114252000 0.049822200 0.000000000 0.200063000 0.291640000 0.175988000 0.353665000 0.60 3.387990000 -1.104700000 0.104529000 4.546430000 0.000249318 0.242603000 -0.126011000 0.095964800 0.000000000 0.106929000 0.321296000 0.440581000 0.013694500 0.100223000 0.042017600 0.000000000 0.207756000 0.289459000 0.176453000 0.356299000 0.70 3.343810000 -1.116090000 0.099989200 4.640170000 0.000000000 0.280922000 -0.124614000 0.092047500 0.000000000 0.102965000 0.331801000 0.503562000 0.024399300 0.092189300 0.049608600 0.000000000 0.208828000 0.290952000 0.178954000 0.358137000 0.80 3.258020000 -1.109070000 0.119754000 4.638490000 0.000000000 0.291242000 -0.122604000 0.032747700 0.000000000 0.097480900 0.341281000 0.542709000 0.024482700 0.078739400 0.049226200 0.000000000 0.211136000 0.294168000 0.180310000 0.362096000 0.90 3.168990000 -1.087140000 0.117879000 4.504810000 0.000000000 0.311362000 -0.123730000 0.052576100 0.000000000 0.087056700 0.342803000 0.581633000 0.042375500 0.091253700 0.068451600 0.000000000 0.220213000 0.293618000 0.194549000 0.367022000 1.00 3.146490000 -1.093870000 0.114285000 4.531180000 0.000000000 0.359324000 -0.117738000 0.044584200 0.000000000 0.086495700 0.345210000 0.590175000 0.053679200 0.091382100 0.067455400 0.000000000 0.221524000 0.295365000 0.196091000 0.369206000 1.30 2.895150000 -1.030420000 0.136666000 4.532080000 0.000000000 0.393471000 -0.115441000 0.000000000 0.000000000 0.092091300 0.345292000 0.618805000 0.087972000 0.119863000 0.100768000 0.000000000 0.222493000 0.296657000 0.196817000 0.370822000 1.50 2.763660000 -1.014370000 0.144100000 4.611720000 0.000000000 0.432513000 -0.104296000 0.000000000 0.000000000 0.103385000 0.342842000 0.653192000 0.123393000 0.165217000 0.143638000 0.000000000 0.218105000 0.303878000 0.198490000 0.374047000 1.80 2.636620000 -1.048380000 0.180838000 5.396070000 0.000000000 0.434162000 -0.096297900 0.000000000 0.000000000 0.107251000 0.333706000 0.618956000 0.161886000 0.193198000 0.201695000 0.000000000 0.212905000 0.310360000 0.201126000 0.376367000 2.00 2.621500000 -1.054300000 0.181367000 5.567720000 0.000000000 0.458752000 -0.095576300 0.000000000 0.000000000 0.099358000 0.329709000 0.604177000 0.139794000 0.167929000 0.185814000 0.000000000 0.222240000 0.309638000 0.202676000 0.381138000 2.60 2.463180000 -1.073080000 0.226407000 6.234910000 0.000000000 0.475305000 -0.078811800 0.000000000 0.000000000 0.105913000 0.312454000 0.577657000 0.125695000 0.153396000 0.173281000 0.000000000 0.223041000 0.310755000 0.207080000 0.382513000 3.00 2.396800000 -1.057060000 0.248126000 6.767400000 0.000000000 0.481080000 -0.071968900 0.000000000 0.000000000 0.127642000 0.318684000 0.597588000 0.052424200 0.047118500 0.116645000 0.000000000 0.236576000 0.302186000 0.212410000 0.383777000 """)
[docs]class BindiEtAl2014RjbEC8NoSOF(BindiEtAl2014RjbEC8): """ Implements the Bindi et al (2014) GMPE for the case in which the site amplification is defined according to the Eurocode 8 classification, but style-of-faulting is neglected """ #: Required rupture parameters are magnitude REQUIRES_RUPTURE_PARAMETERS = set(('mag',)) def _get_mean(self, C, rup, dists, sites): """ Returns the mean value of ground motion - noting that in this case the style-of-faulting term is neglected """ return (self._get_magnitude_scaling_term(C, rup.mag) + self._get_distance_scaling_term(C, dists.rjb, rup.mag) + self._get_site_amplification_term(C, sites.vs30))
[docs]class BindiEtAl2014Rhyp(BindiEtAl2014Rjb): """ Implements the Bindi et al (2014) GMPE for the case in which hypocentral distance is preferred, style-of-faulting is specfieid and for which the site amplification is dependent directly on Vs30 """ #: Required distance measure is Rhypo (eq. 1). REQUIRES_DISTANCES = set(('rhypo', )) def _get_mean(self, C, rup, dists, sites): """ Returns the mean value of ground motion """ return (self._get_magnitude_scaling_term(C, rup.mag) + self._get_distance_scaling_term(C, dists.rhypo, rup.mag) + self._get_style_of_faulting_term(C, rup) + self._get_site_amplification_term(C, sites.vs30)) #: Coefficients from Table 4 COEFFS = CoeffsTable(sa_damping=5, table=""" imt e1 c1 c2 h c3 b1 b2 b3 gamma sofN sofR sofS tau phi phis2s sigma pgv 3.242490000 -1.575560000 0.079177400 4.389180000 0.0000000000 0.472433000 -0.072548400 0.436952000 -0.508833000 -0.015719500 0.071385900 -0.055666000 0.193206000 0.295126000 0.178867000 0.352744000 pga 4.273910000 -1.578210000 0.108218000 4.827430000 0.0000963923 0.217109000 -0.068256300 0.352976000 -0.293242000 -0.047214500 0.110979000 -0.063763900 0.145783000 0.291566000 0.186662000 0.325981000 0.02 4.339700000 -1.604020000 0.103401000 4.478520000 0.0000263293 0.230422000 -0.066535400 0.363906000 -0.286524000 -0.046923100 0.115063000 -0.068140000 0.154538000 0.290986000 0.188250000 0.329477000 0.04 4.468390000 -1.685360000 0.126703000 4.580630000 0.0000000000 0.205651000 -0.052810200 0.323734000 -0.232462000 -0.045172300 0.114597000 -0.069425000 0.158402000 0.298261000 0.192664000 0.337714000 0.07 4.572400000 -1.638630000 0.123954000 5.120960000 0.0007222300 0.226272000 -0.029801500 0.311109000 -0.195629000 -0.053205000 0.121653000 -0.068447700 0.169775000 0.302117000 0.205229000 0.346552000 0.10 4.552550000 -1.579470000 0.125609000 5.675110000 0.0012390400 0.167382000 -0.050906600 0.348968000 -0.168432000 -0.047039300 0.119021000 -0.071982100 0.165148000 0.310963000 0.212643000 0.352097000 0.15 4.511190000 -1.447100000 0.084609700 4.824800000 0.0016920200 0.194714000 -0.078450700 0.448903000 -0.194539000 -0.036312300 0.102481000 -0.066168600 0.145533000 0.310621000 0.216313000 0.343023000 0.20 4.495710000 -1.370390000 0.038535800 4.569650000 0.0015859300 0.289627000 -0.081549900 0.533244000 -0.270912000 -0.038675400 0.107555000 -0.068879300 0.144701000 0.308845000 0.202040000 0.341063000 0.26 4.492240000 -1.366790000 0.012937400 3.948020000 0.0010587800 0.321065000 -0.104184000 0.596455000 -0.323555000 -0.036577100 0.103236000 -0.066658900 0.156869000 0.313737000 0.199484000 0.350769000 0.30 4.517260000 -1.400780000 0.001979970 4.268160000 0.0005648190 0.336096000 -0.115261000 0.612107000 -0.363199000 -0.038065000 0.104818000 -0.066753200 0.165195000 0.311052000 0.186722000 0.352197000 0.36 4.465590000 -1.409730000 0.000488761 4.399780000 0.0000596605 0.346351000 -0.127114000 0.600314000 -0.430464000 -0.028534300 0.095509300 -0.066974900 0.164907000 0.310509000 0.180734000 0.351583000 0.40 4.468340000 -1.428930000 -0.009095590 4.603900000 0.0000000000 0.353351000 -0.137776000 0.621323000 -0.467397000 -0.026162600 0.097198300 -0.071035500 0.165146000 0.310959000 0.182064000 0.352092000 0.46 4.371500000 -1.406550000 0.001009530 4.602540000 0.0000000000 0.357170000 -0.142768000 0.589127000 -0.531694000 -0.019281900 0.090202000 -0.070919800 0.181401000 0.306033000 0.176797000 0.355756000 0.50 4.341980000 -1.397510000 0.004238030 4.430450000 0.0000000000 0.384532000 -0.140916000 0.543301000 -0.555531000 -0.017579800 0.086012300 -0.068432100 0.189686000 0.304174000 0.178065000 0.358473000 0.60 4.214950000 -1.379190000 0.013733000 3.696150000 0.0000000000 0.408720000 -0.141998000 0.504772000 -0.627036000 0.001156930 0.071288600 -0.070131400 0.200502000 0.306270000 0.189183000 0.366066000 0.70 4.148320000 -1.371690000 0.002264110 3.009780000 0.0000000000 0.466754000 -0.138065000 0.498126000 -0.698998000 0.010002700 0.054387600 -0.064390000 0.201810000 0.308270000 0.264361000 0.368453000 0.80 4.092460000 -1.377360000 0.008956000 3.157270000 0.0000000000 0.510102000 -0.132630000 0.437529000 -0.757522000 0.015018400 0.045864700 -0.060882800 0.211664000 0.308550000 0.208994000 0.374172000 0.90 4.083240000 -1.386490000 -0.004531510 3.453700000 0.0000000000 0.567727000 -0.127244000 0.458110000 -0.786632000 0.016380200 0.044223600 -0.060603500 0.225279000 0.313873000 0.225906000 0.386351000 1.00 4.072070000 -1.387350000 -0.018545800 3.316300000 0.0000000000 0.631338000 -0.121241000 0.474982000 -0.791438000 0.026395700 0.041136600 -0.067531900 0.238973000 0.318631000 0.246861000 0.398289000 1.30 3.779540000 -1.273430000 -0.013766200 3.049760000 0.0000000000 0.650829000 -0.129005000 0.488244000 -0.803656000 0.024922000 0.038329000 -0.063250700 0.212162000 0.324083000 0.245588000 0.387354000 1.50 3.694470000 -1.264770000 -0.003373340 3.654820000 0.0000000000 0.674600000 -0.119081000 0.461122000 -0.780198000 0.019123100 0.038696600 -0.057819500 0.208441000 0.334250000 0.244150000 0.393917000 1.80 3.454080000 -1.273640000 0.083746000 4.599880000 0.0000000000 0.563304000 -0.117803000 0.184126000 -0.749008000 0.011675900 0.029249000 -0.040924700 0.203238000 0.342873000 0.256308000 0.398582000 2.00 3.389010000 -1.282830000 0.086724000 4.952850000 0.0000000000 0.548353000 -0.129571000 0.171017000 -0.744073000 0.004992770 0.033587300 -0.038579800 0.205751000 0.347114000 0.261830000 0.403511000 2.60 3.066010000 -1.234270000 0.150146000 4.455110000 0.0000000000 0.541750000 -0.103699000 0.009302580 -0.744468000 0.006026810 0.030508100 -0.036534700 0.190711000 0.339373000 0.242015000 0.389288000 3.00 2.893910000 -1.164610000 0.162354000 4.623210000 0.0000000000 0.590765000 -0.085328600 0.034058400 -0.693999000 0.018621100 -0.018982400 0.000361328 0.183363000 0.326297000 0.228650000 0.374289000 """)
[docs]class BindiEtAl2014RhypEC8(BindiEtAl2014RjbEC8): """ Implements the Bindi et al (2014) GMPE for the case in which hypocentral distance is preferred, style-of-faulting is specfied and site amplification is characterised according to the Eurocode 8 site class """ #: Required distance measure is Rhypo REQUIRES_DISTANCES = set(('rhypo', )) def _get_mean(self, C, rup, dists, sites): """ Returns the mean value of ground motion """ return (self._get_magnitude_scaling_term(C, rup.mag) + self._get_distance_scaling_term(C, dists.rhypo, rup.mag) + self._get_style_of_faulting_term(C, rup) + self._get_site_amplification_term(C, sites.vs30)) #: Coefficients from Table 3 COEFFS = CoeffsTable(sa_damping=5, table=""" imt e1 c1 c2 h c3 b1 b2 b3 eA eB eC eD sofN sofR sofS sofU tau phi phis2s sigma pgv 3.292610000 -1.665480000 0.136478000 6.310130000 0.0000000000 0.436373000 -0.049720200 0.264336000 0.000000000 0.130319000 0.272298000 0.350870000 -0.090869900 0.013282500 -0.067381500 0.000000000 0.241933000 0.284305000 0.231138000 0.373311000 pga 4.366930000 -1.752120000 0.150507000 7.321920000 0.0000000000 0.144291000 -0.066081100 0.284211000 0.000000000 0.143778000 0.231064000 0.187402000 -0.071745100 0.084957800 -0.057096500 0.000000000 0.195249000 0.284622000 0.213455000 0.345155000 0.02 4.420440000 -1.777540000 0.147715000 7.064280000 0.0000000000 0.147874000 -0.066205600 0.297090000 0.000000000 0.141110000 0.225339000 0.187033000 -0.065306900 0.091731900 -0.056125500 0.000000000 0.197407000 0.287767000 0.216309000 0.348969000 0.04 4.549920000 -1.854600000 0.165968000 6.982270000 0.0000000000 0.124402000 -0.056602000 0.260601000 0.000000000 0.140350000 0.217010000 0.146507000 -0.065379200 0.088098100 -0.057670900 0.000000000 0.204345000 0.297881000 0.222929000 0.361234000 0.07 4.732850000 -1.878220000 0.157048000 8.133700000 0.0000000000 0.138028000 -0.040786500 0.276090000 0.000000000 0.145543000 0.206101000 0.115846000 -0.051289600 0.113143000 -0.037623000 0.000000000 0.208843000 0.304438000 0.242821000 0.369185000 0.10 4.675030000 -1.799170000 0.151808000 8.380980000 0.0005478660 0.098832300 -0.056937000 0.322027000 0.000000000 0.158622000 0.208849000 0.125428000 -0.037486800 0.120065000 -0.036904000 0.000000000 0.195390000 0.313320000 0.251339000 0.369252000 0.15 4.569650000 -1.614050000 0.105601000 7.496250000 0.0011834100 0.125747000 -0.083500900 0.464456000 0.000000000 0.162534000 0.197589000 0.158161000 -0.047089600 0.098045600 -0.050605600 0.000000000 0.193856000 0.310861000 0.247987000 0.366353000 0.20 4.450170000 -1.465010000 0.056754500 6.272220000 0.0014308100 0.236642000 -0.083463900 0.542025000 0.000000000 0.143446000 0.213637000 0.170195000 -0.021448300 0.139454000 -0.012459600 0.000000000 0.191231000 0.306652000 0.226544000 0.361392000 0.26 4.455930000 -1.443420000 0.032061300 5.480400000 0.0009816830 0.313239000 -0.089717600 0.555789000 0.000000000 0.133443000 0.244854000 0.202162000 -0.030488000 0.132769000 -0.015155100 0.000000000 0.192222000 0.308241000 0.214042000 0.363266000 0.30 4.471710000 -1.460160000 0.025927200 5.503160000 0.0005543760 0.332549000 -0.097217900 0.551296000 0.000000000 0.121637000 0.254554000 0.226009000 -0.042269100 0.119803000 -0.019226600 0.000000000 0.199096000 0.304125000 0.207111000 0.363499000 0.36 4.387990000 -1.418420000 0.022150300 4.769520000 0.0002687480 0.355357000 -0.106041000 0.543724000 0.000000000 0.118062000 0.268087000 0.258058000 -0.056669000 0.092863000 -0.034960300 0.000000000 0.199491000 0.304728000 0.201784000 0.364220000 0.40 4.376090000 -1.428430000 0.016902400 4.819740000 0.0000000000 0.368987000 -0.111955000 0.547881000 0.000000000 0.119481000 0.275041000 0.275672000 -0.053267600 0.091980000 -0.032188300 0.000000000 0.207716000 0.302796000 0.194828000 0.367194000 0.46 4.333720000 -1.425030000 0.025903300 5.109610000 0.0000000000 0.379142000 -0.115152000 0.511833000 0.000000000 0.117659000 0.291964000 0.321124000 -0.062509500 0.073772300 -0.039294000 0.000000000 0.216313000 0.301380000 0.197633000 0.370974000 0.50 4.293590000 -1.414650000 0.028367500 4.955190000 0.0000000000 0.389410000 -0.118151000 0.495459000 0.000000000 0.118871000 0.298870000 0.344584000 -0.064737900 0.069448700 -0.037414200 0.000000000 0.225415000 0.300553000 0.198934000 0.375691000 0.60 4.239150000 -1.406030000 0.026979900 4.635970000 0.0000000000 0.430341000 -0.119284000 0.475308000 0.000000000 0.117717000 0.314097000 0.412316000 -0.076075300 0.045870600 -0.054880500 0.000000000 0.234484000 0.299514000 0.208675000 0.380383000 0.70 4.196960000 -1.412970000 0.020875700 4.293770000 0.0000000000 0.470648000 -0.118095000 0.460014000 0.000000000 0.115734000 0.325887000 0.477053000 -0.074956400 0.028574500 -0.055644400 0.000000000 0.246498000 0.301897000 0.212696000 0.389747000 0.80 4.114530000 -1.404290000 0.038146400 4.010590000 0.0000000000 0.481962000 -0.116743000 0.393948000 0.000000000 0.110981000 0.334461000 0.517530000 -0.081627800 0.008428810 -0.063434400 0.000000000 0.249844000 0.305995000 0.224068000 0.395038000 0.90 4.032490000 -1.389770000 0.037093500 3.978120000 0.0000000000 0.504043000 -0.116645000 0.400442000 0.000000000 0.103765000 0.334934000 0.559004000 -0.064291400 0.019498400 -0.045615800 0.000000000 0.261433000 0.307220000 0.240384000 0.403399000 1.00 4.011400000 -1.395430000 0.034061400 4.096680000 0.0000000000 0.550001000 -0.110860000 0.386023000 0.000000000 0.103026000 0.336196000 0.566463000 -0.057167500 0.014892500 -0.051388400 0.000000000 0.274446000 0.309616000 0.244465000 0.413742000 1.30 3.684020000 -1.302310000 0.069534500 3.732900000 0.0000000000 0.544404000 -0.113618000 0.282169000 0.000000000 0.108865000 0.337519000 0.592894000 -0.034663900 0.029823500 -0.025078900 0.000000000 0.265310000 0.311777000 0.244067000 0.409383000 1.50 3.535870000 -1.273510000 0.082245800 4.074080000 0.0000000000 0.570581000 -0.103758000 0.249760000 0.000000000 0.119032000 0.333110000 0.626267000 -0.010667700 0.060266600 0.007385850 0.000000000 0.269363000 0.316539000 0.236824000 0.415637000 1.80 3.465880000 -1.361020000 0.137018000 6.097100000 0.0000000000 0.524014000 -0.101089000 0.046975200 0.000000000 0.123814000 0.323505000 0.600530000 -0.002974540 0.058459200 0.039470900 0.000000000 0.275390000 0.323622000 0.257636000 0.424936000 2.00 3.469100000 -1.381110000 0.137878000 6.539170000 0.0000000000 0.551312000 -0.098766100 0.000000000 0.000000000 0.115091000 0.320404000 0.586654000 -0.023796000 0.034963600 0.025270300 0.000000000 0.277179000 0.325724000 0.259839000 0.427696000 2.60 3.283840000 -1.389770000 0.188643000 7.040110000 0.0000000000 0.547984000 -0.084231400 0.000000000 0.000000000 0.124833000 0.306133000 0.548523000 -0.050663600 0.003435150 0.007395600 0.000000000 0.278908000 0.327756000 0.263531000 0.430364000 3.00 3.264700000 -1.399740000 0.216533000 8.339210000 0.0000000000 0.552993000 -0.071343600 0.000000000 0.000000000 0.143969000 0.315187000 0.559213000 -0.146666000 -0.128655000 -0.067567300 0.000000000 0.283885000 0.320266000 0.267078000 0.427973000 """)
[docs]class BindiEtAl2014RhypEC8NoSOF(BindiEtAl2014RhypEC8): """ Implements the Bindi et al. (2014) GMPE for the case in which hypocentral distance is preferred, Eurocode 8 site amplification is used and style-of-faulting is unspecfied. """ #: Required rupture parameters are magnitude REQUIRES_RUPTURE_PARAMETERS = set(('mag',)) def _get_mean(self, C, rup, dists, sites): """ Returns the mean value of ground motion - noting that in this case the style-of-faulting term is neglected """ return (self._get_magnitude_scaling_term(C, rup.mag) + self._get_distance_scaling_term(C, dists.rhypo, rup.mag) + self._get_site_amplification_term(C, sites.vs30))