| [1] |
Sánchez-Sesma, FJ; Palencia, VJ; Luzón, F., Estimation of local site effects during earthquakes: an overview, ISET J Earthq Tech, 39, 3, 167-193 (2002) |
| [2] |
Simons, DA., Scattering of SH-waves by thin, semi-infinite inclusions, Int J Sol Struct, 16, 177-192 (1979) · Zbl 0421.73031 |
| [3] |
Kikuchi, M., Dispersion and attenuation of elastic waves due to multiple scattering from inclusions, Phys Earth Planet Inter, 25, 159-162 (1981) |
| [4] |
Kikuchi, M., Dispersion and attenuation of elastic waves due to multiple scattering from cracks, Phys Earth Planet Inter, 27, 100-105 (1981) |
| [5] |
Coussy, O., Scattering of elastic waves by an inclusion with an interface crack, Wave Motion, 6, 223-236 (1984) · Zbl 0538.73030 |
| [6] |
Wang, YS; Wang, D., Scattering of elastic waves by a rigid cylindrical inclusion partially deboned from its surrounding matrix-I, Int J Sol Struct, 33, 19, 2789-2815 (1996) · Zbl 0926.74053 |
| [7] |
Zhao, JX; Qi, H., Scattering of plane SH-wave from a partially deboned shallow cylindrical elastic inclusion, J Mech, 25, 4, 411-419 (2009) |
| [8] |
Conoir, JM; Norris, AN., Effective wavenumbers and reflection coefficients for an elastic medium containing random configurations of cylindrical scatterers, Wave Motion, 47, 183-197 (2010) · Zbl 1231.74223 |
| [9] |
Lee, WM; Chen, JT., Scattering of flexural wave in a thin plate with multiple circular inclusions by using the multipole method, Int J Mech Sci, 53, 8, 617-627 (2011) |
| [10] |
Qi, H.; Yang, R.; Guo, J., Dynamic responses of a plate with multiple inclusions and depressions subjected to SH-waves, Mech Adv Mat Struct (2020) · doi:10.1080/15376494.2020.1801915 |
| [11] |
Manoogian, ME; Lee, VW., Diffraction of SH-waves by subsurface inclusion of arbitrary shape, J Eng Mech, 122, 2, 123-129 (1996) |
| [12] |
Lysmer, J.; Drake, LA., A finite element method for seismology, Meth Comp Phys, 11, 181-216 (1972) |
| [13] |
Smith, WD., The application of finite element analysis to body wave propagation problems, Geophys J Royal Astronom Soc, 42, 2, 747-768 (1975) |
| [14] |
Day, SM. (1977). Finite element analysis of seismic scattering problems [Dissertation]. University of California, San Diego. |
| [15] |
Kawase, H.; Sato, T., Simulation analysis of strong motions in the Ashigara valley considering one- and two-dimensional geological structures, J Phys Earth, 40, 27-56 (1992) |
| [16] |
Zhang, J.; Katsube, N., A hybrid finite element method for heterogeneous materials with randomly dispersed elastic inclusions, FE Analy Desig, 19, 45-55 (1995) · Zbl 0875.73294 |
| [17] |
Nakasone, Y.; Nishiyama, H.; Nojiri, T., Numerical equivalent inclusion method: a new computational method for analyzing stress fields in and around inclusions of various shapes, Mat Sci Eng, 285, 1-2, 229-238 (2000) |
| [18] |
Boore, DM., A note on the effect of simple topography on seismic SH-waves, Bull Seism Soc Am, 62, 275-284 (1972) |
| [19] |
Ohtsuki, A.; Harumi, K., Effects of topography and subsurface inhomogeneities on seismic SV-waves, Earthq Eng Struct Dyn, 11, 441-462 (1983) |
| [20] |
Moczo, P.; Bard, PY., Wave diffraction, amplification and differential motion near strong lateral discontinuities, Bull Seism Soc Am, 83, 85-106 (1993) |
| [21] |
Dominguez, J.; Meise, T., On the use of the BEM for wave propagation in infinite domains, Eng Analy BE, 8, 3, 132-138 (1991) |
| [22] |
Panji, M.; Kamalian, M.; Asgari-Marnani, J., Transient analysis of wave propagation problems by half-plane BEM, Geophys J Int, 194, 1849-1865 (2013) |
| [23] |
Ahmad, S.; Banerjee, PK., Multi-domain BEM for two-dimensional problems of elastodynamics, Int J Numer Meth Eng, 26, 4, 891-911 (1988) · Zbl 0631.73067 |
| [24] |
Panji, M.; Asgari-Marnani, J.; Tavousi-Tafreshi, S., Evaluation of effective parameters on the underground tunnel stability using BEM, J Struct Eng and Geotech, 1, 2, 29-37 (2011) |
| [25] |
Panji, M.; Koohsari, H.; Adampira, M., Stability analysis of shallow tunnels subjected to eccentric loads by a boundary element method, J Rock Mech and Geotech Eng, 8, 4, 480-488 (2016) |
| [26] |
Hadley, PK. (1987). Scattering of waves by inclusions in a nonhomogeneous elastic half-space solved by boundary element method [Dissertation]. Princeton University, Princeton. |
| [27] |
Kamalian, M.; Jafari, MK; Sohrabi-Bidar, A., Time-domain two-dimensional site response analysis of non-homogeneous topographic structures by a hybrid FE/BE method, Soil Dyn Earthq Eng, 26, 8, 753-765 (2006) |
| [28] |
Parvanova, SL; Dineva, PS; Manolis, GD, Dynamic response of a solid with multiple inclusions under anti-plane strain conditions by the BEM, Comp Struct, 139, 65-83 (2014) |
| [29] |
Parvanova, SL; Manolis, GD; Dineva, PS., Wave scattering by nano-heterogeneities embedded in an elastic matrix via BEM, Eng Analy with BE, 56, 57-69 (2015) · Zbl 1403.74213 |
| [30] |
Parvanova, SL; Vasilev, GP; Dineva, PS, Dynamic analysis of nano-heterogeneities in a finite-sized solid by boundary and finite element methods, Int J Sol Struct, 80, 1-18 (2015) |
| [31] |
Panji, M.; Ansari, B.; Asgari-Marnani, J., Stress analysis of shallow tunnels in the multi-layered soils using half-plane BEM [In Persian], J Transp Infrast Eng, 2, 1, 17-32 (2016) |
| [32] |
Panji, M.; Ansari, B., Modeling pressure pipe embedded in two-layer soil by a half-plane BEM, Comp Geotech, 81, C, 360-367 (2017) |
| [33] |
Dong, CY; Lo, SH; Cheung, YK., Numerical solution for elastic half-plane inclusion problems by different integral equation approaches, Eng Analy BE, 28, 123-130 (2004) · Zbl 1048.74598 |
| [34] |
Dravinski, M., Ground motion amplification due to elastic inclusion in a half-space, Earthq Eng Struct Dyn, 11, 313-335 (1983) |
| [35] |
Niwa, Y.; Hirose, S., Application of the boundary integral equation (BIE) method to transient response analysis of inclusions in half space, Wave Motion, 8, 77-91 (1986) · Zbl 0572.73029 |
| [36] |
Hadley, PK, Askar, A, Cakmak, AS. (1989). Scattering of waves by inclusions in a nonhomogeneous elastic half space solved by boundary element methods. Technical Report: NCEER-89-0027. |
| [37] |
Benites, R.; Aki, K.; Yomigida, K., Multiple scattering of SH-waves in 2-D media with many cavities, Pure Appl Geophys, 138, 353-390 (1992) |
| [38] |
Benites, R.; Roberts, PM; Yomogida, K., Scattering of elastic waves in 2-D composite media I. theory and test, Phys Earth Planet Int, 104, 161-173 (1997) |
| [39] |
Yomogida, K.; Benites, R.; Roberts, PM, Scattering of elastic waves in 2-D composite media II. Waveforms and spectra, Phys Earth Planet Inter, 104, 175-192 (1997) |
| [40] |
Yao, Z.; Kong, F.; Wang, H., 2D Simulation of composite materials using BEM, Eng Analy BE, 28, 927-935 (2004) · Zbl 1130.74476 |
| [41] |
Rus, G.; Gallego, R., Boundary integral equation for inclusion and cavity shape sensitivity in harmonic elastodynamics, Eng Analy BE, 29, 77-91 (2005) · Zbl 1100.74061 |
| [42] |
Mogilevskaya, S.; Crouch, S.; Stolarski, H., Multiple interacting circular nano-inhomogeneities with surface/interface effects, J Mech Phys Solids, 56, 2298-2327 (2008) · Zbl 1171.74398 |
| [43] |
Chen, K.; Chen, JT; Kao, J., Regularized meshless method for antiplane shear problems with multiple inclusions, Int J Numer Meth Eng, 73, 9, 1251-1273 (2008) · Zbl 1169.74054 |
| [44] |
Yu, CW; Dravinski, M., Scattering of plane harmonic SH-wave by a completely embedded corrugated scatterer, Int J Numer Meth Eng, 78, 196-214 (2009) · Zbl 1183.74124 |
| [45] |
Yu, CW; Dravinski, M., Scattering of plane harmonic P, SV and Rayleigh-waves by a completely embedded corrugated elastic inclusion, Wave Motion, 47, 156-167 (2010) · Zbl 1231.74118 |
| [46] |
Parvanova, SL; Dineva, PS; Manolis, GD., Dynamic behavior of a finite-sized elastic solid with multiple cavities and inclusions using BIEM, Acta Mech, 224, 597-618 (2013) · Zbl 1401.74284 |
| [47] |
Dravinski, M.; Sheikhhassani, R., Scattering of a plane harmonic SH-wave by a rough multilayered inclusion of arbitrary shape, Wave Motion, 50, 836-851 (2013) · Zbl 1454.74085 |
| [48] |
Peters, F.; Barra, LP., An inverse geometric problem: position and shape identification of inclusions in a conductor domain, Eng Analy BE, 37, 1392-1400 (2013) · Zbl 1287.78015 |
| [49] |
Lee, Y.; Chen, JT., Null-field approach for the antiplane problem with elliptical holes and/or inclusions, Compos Part B: Eng, 44, 1, 283-294 (2013) |
| [50] |
Chen, JT; Kao, SK; Hsu, YH, Scattering problems of the SH-wave by using the null-field boundary integral equation method, J Earthq Eng, 22, 5, 1-35 (2017) |
| [51] |
Sheikhhassani, R.; Dravinski, M., Scattering of a plane harmonic SH-wave by multiple layered inclusions, Wave Motion, 51, 3, 517-532 (2014) · Zbl 1456.74092 |
| [52] |
Sheikhhassani, R.; Dravinski, M., Dynamic stress concentration for multiple multilayered inclusions embedded in an elastic half-space subjected to SH-waves, Wave Motion, 62, 20-40 (2016) · Zbl 1469.74052 |
| [53] |
Ba, Z.; Yin, X., Wave scattering of complex local site in a layered half-space by using a multidomain IBEM: incident plane SH-waves, Geophys J Int, 205, 3, 1382-1405 (2016) |
| [54] |
Jobin, TM; Ramji, M.; Khaderi, SN., Numerical evaluation of the interaction of rigid line inclusions using strain intensity factors, Int J Mech Sci, 153-154, 10-20 (2019) |
| [55] |
Feng, YD; Wang, YS; Zhang, ZM., Transient scattering of SH-waves from an inclusion with a unilateral frictional interface, a 2D time domain boundary element analysis, Comm Numer Meth Eng, 19, 25-36 (2003) · Zbl 1058.65135 |
| [56] |
Kamalian, M.; Gatmiri, B.; Sohrabi-Bidar, A., On time-domain two-dimensional site response analysis of topographic structures by BEM, J Seism Earthq Eng, 5, 2, 35-45 (2003) |
| [57] |
Mykhaskiv, V., Transient response of a plane rigid inclusion to an incident wave in an elastic solid, Wave Motion, 41, 133-144 (2005) · Zbl 1189.74066 |
| [58] |
Huang, Y.; Crouch, SL; Mogilevskaya, SG., A time domain direct boundary integral method for a viscoelastic plane with circular holes and elastic inclusions, Eng Analy BE, 29, 725-737 (2005) · Zbl 1182.74220 |
| [59] |
Lei, J.; Wang, YS; Huang, Y., Dynamic crack propagation in matrix involving inclusions by a time-domain BEM, Eng Analy BE, 36, 5, 651-657 (2012) · Zbl 1351.74116 |
| [60] |
Panji, M.; Ansari, B., Transient SH-wave scattering by the lined tunnels embedded in an elastic half-plane, Eng Analy BE, 84, 220-230 (2017) · Zbl 1403.74211 |
| [61] |
Panji, M.; Mojtabazadeh-Hasanlouei, S., Time-history responses on the surface by regularly distributed enormous embedded cavities: incident SH-waves, Earthq Sci, 31, 1-17 (2018) |
| [62] |
Panji, M.; Mojtabazadeh-Hasanlouei, S., Seismic amplification pattern of the ground surface in presence of twin unlined circular tunnels subjected to SH-waves [In Persian], J Transp Infrast Eng (2019) · doi:10.22075/jtie.2019.16056.1342 |
| [63] |
Huang, L.; Liu, Z.; Wu, C., The scattering of plane P, SV waves by twin lining tunnels with imperfect interfaces embedded in an elastic half-space, Tunn Underg Space Tech, 85, 319-330 (2019) |
| [64] |
Panji, M.; Mojtabazadeh-Hasanlouei, S.; Yasemi, F., A half-plane time-domain BEM for SH-wave scattering by a subsurface inclusion, Comp Geosci, 134 (2020) · doi:10.1016/j.cageo.2019.104342 |
| [65] |
Panji, M.; Mojtabazadeh-Hasanlouei, S., Transient response of irregular surface by periodically distributed semi-sine shaped valleys: incident SH-waves, J Earthq Tsu (2020) · doi:10.1142/S1793431120500050 |
| [66] |
Ricker, N., The form and laws of propagation of seismic wavelet, Geophys, 18, 1, 10-40 (1953) |
| [67] |
Reinoso, E.; Wrobel, LC; Power, H., Preliminary results of the modeling of the Mexico City valley with a two-dimensional boundary element method for the scattering of SH-waves, Soil Dyn Earthq Eng, 12, 8, 457-468 (1993) |
| [68] |
Brebbia, CA; Dominguez, J., Boundary elements, an introductory course (1989), Boston: Comp Mech Pub, Boston · Zbl 0691.73033 |
| [69] |
Dominguez, J., Boundary elements in dynamics (1993), Boston: Comp Mech Pub, Boston · Zbl 0790.73003 |
| [70] |
Kawase, H., Time-domain response of a semi-circular canyon for incident SV, P and Rayleigh-waves calculated by the discrete wave-number boundary element method, Bull Seism Soc Am, 78, 4, 1415-1437 (1988) |
| [71] |
Matlab, The language of technical computing. V. 9.7. (R2019b) (2019), Natick: The MathWorks Inc, Natick |
| [72] |
Dravinski, M.; Yu, MC., Scattering of plane harmonic SH-waves by multiple inclusions, Geophys J Int, 186, 1331-1346 (2011) |
| [73] |
Keller, JB., Geometrical theory of diffraction, J Opt Soc Am, 52, 2, 116-130 (1962) |
| [74] |
Trifunac, MD., Scattering of plane SH-waves by a semi cylindrical canyon, Earthq Eng Struct Dyn, 3, 1, 267-281 (1973) |
