https://orcid.org/0000-0001-8508-4837
References
- Sánchez-Sesma FJ, Palencia VJ, Luzón F. Estimation of local site effects during earthquakes: an overview. ISET J Earthq Tech. 2002;39(3):167–193.
- Simons DA. Scattering of SH-waves by thin, semi-infinite inclusions. Int J Sol Struct. 1979;16:177–192.
- Kikuchi M. Dispersion and attenuation of elastic waves due to multiple scattering from inclusions. Phys Earth Planet Inter. 1981a;25:159–162.
- Kikuchi M. Dispersion and attenuation of elastic waves due to multiple scattering from cracks. Phys Earth Planet Inter. 1981b;27:100–105.
- Coussy O. Scattering of elastic waves by an inclusion with an interface crack. Wave Motion. 1984;6:223–236.
- Wang YS, Wang D. Scattering of elastic waves by a rigid cylindrical inclusion partially deboned from its surrounding matrix-I. Int J Sol Struct. 1996;33(19):2789–2815.
- Zhao JX, Qi H. Scattering of plane SH-wave from a partially deboned shallow cylindrical elastic inclusion. J Mech. 2009;25(4):411–419.
- Conoir JM, Norris AN. Effective wavenumbers and reflection coefficients for an elastic medium containing random configurations of cylindrical scatterers. Wave Motion. 2010;47:183–197.
- 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. 2011;53(8):617–627.
- Qi H, Yang R, Guo J, et al. Dynamic responses of a plate with multiple inclusions and depressions subjected to SH-waves. Mech Adv Mat Struct. 2020. DOI:https://doi.org/10.1080/15376494.2020.1801915.
- Manoogian ME, Lee VW. Diffraction of SH-waves by subsurface inclusion of arbitrary shape. J Eng Mech. 1996;122(2):123–129.
- Lysmer J, Drake LA. A finite element method for seismology. Meth Comp Phys. 1972;11:181–216.
- Smith WD. The application of finite element analysis to body wave propagation problems. Geophys J Royal Astronom Soc. 1975;42(2):747–768.
- Day SM. (1977). Finite element analysis of seismic scattering problems [Dissertation]. University of California, San Diego.
- Kawase H, Sato T. Simulation analysis of strong motions in the Ashigara valley considering one- and two-dimensional geological structures. J Phys Earth. 1992;40:27–56.
- Zhang J, Katsube N. A hybrid finite element method for heterogeneous materials with randomly dispersed elastic inclusions. FE Analy Desig. 1995;19:45–55.
- 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. 2000;285(1-2):229–238.
- Boore DM. A note on the effect of simple topography on seismic SH-waves. Bull Seism Soc Am. 1972;62:275–284.
- Ohtsuki A, Harumi K. Effects of topography and subsurface inhomogeneities on seismic SV-waves. Earthq Eng Struct Dyn. 1983;11:441–462.
- Moczo P, Bard PY. Wave diffraction, amplification and differential motion near strong lateral discontinuities. Bull Seism Soc Am. 1993;83:85–106.
- Dominguez J, Meise T. On the use of the BEM for wave propagation in infinite domains. Eng Analy BE. 1991;8(3):132–138.
- Panji M, Kamalian M, Asgari-Marnani J, et al. Transient analysis of wave propagation problems by half-plane BEM. Geophys J Int. 2013;194:1849–1865.
- Ahmad S, Banerjee PK. Multi-domain BEM for two-dimensional problems of elastodynamics. Int J Numer Meth Eng. 1988;26(4):891–911.
- Panji M, Asgari-Marnani J, Tavousi-Tafreshi S. Evaluation of effective parameters on the underground tunnel stability using BEM. J Struct Eng and Geotech. 2011;1(2):29–37.
- Panji M, Koohsari H, Adampira M, et al. Stability analysis of shallow tunnels subjected to eccentric loads by a boundary element method. J Rock Mech and Geotech Eng. 2016a;8(4):480–488.
- Hadley PK. (1987). Scattering of waves by inclusions in a nonhomogeneous elastic half-space solved by boundary element method [Dissertation]. Princeton University, Princeton.
- Kamalian M, Jafari MK, Sohrabi-Bidar A, et al. Time-domain two-dimensional site response analysis of non-homogeneous topographic structures by a hybrid FE/BE method. Soil Dyn Earthq Eng. 2006;26(8):753–765.
- Parvanova SL, Dineva PS, Manolis GD, et al. Dynamic response of a solid with multiple inclusions under anti-plane strain conditions by the BEM. Comp Struct. 2014;139:65–83.
- Parvanova SL, Manolis GD, Dineva PS. Wave scattering by nano-heterogeneities embedded in an elastic matrix via BEM. Eng Analy with BE. 2015a;56:57–69.
- Parvanova SL, Vasilev GP, Dineva PS, et al. Dynamic analysis of nano-heterogeneities in a finite-sized solid by boundary and finite element methods. Int J Sol Struct. 2015b;80:1–18.
- 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. 2016b;2(1):17–32.
- Panji M, Ansari B. Modeling pressure pipe embedded in two-layer soil by a half-plane BEM. Comp Geotech. 2017a;81(C):360–367.
- Dong CY, Lo SH, Cheung YK. Numerical solution for elastic half-plane inclusion problems by different integral equation approaches. Eng Analy BE. 2004;28:123–130.
- Dravinski M. Ground motion amplification due to elastic inclusion in a half-space. Earthq Eng Struct Dyn. 1983;11:313–335.
- Niwa Y, Hirose S. Application of the boundary integral equation (BIE) method to transient response analysis of inclusions in half space. Wave Motion. 1986;8:77–91.
- 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.
- Benites R, Aki K, Yomigida K. Multiple scattering of SH-waves in 2-D media with many cavities. Pure Appl Geophys. 1992;138:353–390.
- Benites R, Roberts PM, Yomogida K, et al. Scattering of elastic waves in 2-D composite media I. theory and test. Phys Earth Planet Int. 1997;104:161–173.
- Yomogida K, Benites R, Roberts PM, et al. Scattering of elastic waves in 2-D composite media II. Waveforms and spectra. Phys Earth Planet Inter. 1997;104:175–192.
- Yao Z, Kong F, Wang H, et al. 2D Simulation of composite materials using BEM. Eng Analy BE. 2004;28:927–935.
- Rus G, Gallego R. Boundary integral equation for inclusion and cavity shape sensitivity in harmonic elastodynamics. Eng Analy BE. 2005;29:77–91.
- Mogilevskaya S, Crouch S, Stolarski H. Multiple interacting circular nano-inhomogeneities with surface/interface effects. J Mech Phys Solids. 2008;56:2298–2327.
- Chen K, Chen JT, Kao J. Regularized meshless method for antiplane shear problems with multiple inclusions. Int J Numer Meth Eng. 2008;73(9):1251–1273.
- Yu CW, Dravinski M. Scattering of plane harmonic SH-wave by a completely embedded corrugated scatterer. Int J Numer Meth Eng. 2009;78:196–214.
- Yu CW, Dravinski M. Scattering of plane harmonic P, SV and Rayleigh-waves by a completely embedded corrugated elastic inclusion. Wave Motion. 2010;47:156–167.
- Parvanova SL, Dineva PS, Manolis GD. Dynamic behavior of a finite-sized elastic solid with multiple cavities and inclusions using BIEM. Acta Mech. 2013;224:597–618.
- Dravinski M, Sheikhhassani R. Scattering of a plane harmonic SH-wave by a rough multilayered inclusion of arbitrary shape. Wave Motion. 2013;50:836–851.
- Peters F, Barra LP. An inverse geometric problem: position and shape identification of inclusions in a conductor domain. Eng Analy BE. 2013;37:1392–1400.
- Lee Y, Chen JT. Null-field approach for the antiplane problem with elliptical holes and/or inclusions. Compos Part B: Eng. 2013;44(1):283–294.
- Chen JT, Kao SK, Hsu YH, et al. Scattering problems of the SH-wave by using the null-field boundary integral equation method. J Earthq Eng. 2017;22(5):1–35.
- Sheikhhassani R, Dravinski M. Scattering of a plane harmonic SH-wave by multiple layered inclusions. Wave Motion. 2014;51(3):517–532.
- Sheikhhassani R, Dravinski M. Dynamic stress concentration for multiple multilayered inclusions embedded in an elastic half-space subjected to SH-waves. Wave Motion. 2016;62:20–40.
- 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. 2016;205(3):1382–1405.
- Jobin TM, Ramji M, Khaderi SN. Numerical evaluation of the interaction of rigid line inclusions using strain intensity factors. Int J Mech Sci. 2019;153-154:10–20.
- 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. 2003;19:25–36.
- Kamalian M, Gatmiri B, Sohrabi-Bidar A. On time-domain two-dimensional site response analysis of topographic structures by BEM. J Seism Earthq Eng. 2003;5(2):35–45.
- Mykhaskiv V. Transient response of a plane rigid inclusion to an incident wave in an elastic solid. Wave Motion. 2005;41:133–144.
- 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. 2005;29:725–737.
- Lei J, Wang YS, Huang Y, et al. Dynamic crack propagation in matrix involving inclusions by a time-domain BEM. Eng Analy BE. 2012;36(5):651–657.
- Panji M, Ansari B. Transient SH-wave scattering by the lined tunnels embedded in an elastic half-plane. Eng Analy BE. 2017b;84:220–230.
- Panji M, Mojtabazadeh-Hasanlouei S. Time-history responses on the surface by regularly distributed enormous embedded cavities: incident SH-waves. Earthq Sci. 2018;31:1–17.
- 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:https://doi.org/10.22075/jtie.2019.16056.1342
- Huang L, Liu Z, Wu C, et al. The scattering of plane P, SV waves by twin lining tunnels with imperfect interfaces embedded in an elastic half-space. Tunn Underg Space Tech. 2019;85:319–330.
- Panji M, Mojtabazadeh-Hasanlouei S, Yasemi F. A half-plane time-domain BEM for SH-wave scattering by a subsurface inclusion. Comp Geosci. 2020;134; DOI:https://doi.org/10.1016/j.cageo.2019.104342.
- 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:https://doi.org/10.1142/S1793431120500050
- Ricker N. The form and laws of propagation of seismic wavelet. Geophys. 1953;18(1):10–40.
- 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. 1993;12(8):457–468.
- Brebbia CA, Dominguez J. Boundary elements, an introductory course. Boston: Comp Mech Pub; 1989.
- Dominguez J. Boundary elements in dynamics. Boston: Comp Mech Pub; 1993.
- 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. 1988;78(4):1415–1437.
- MATLAB. The language of technical computing. V. 9.7. (R2019b). Natick: The MathWorks Inc; 2019.
- Dravinski M, Yu MC. Scattering of plane harmonic SH-waves by multiple inclusions. Geophys J Int. 2011;186:1331–1346.
- Keller JB. Geometrical theory of diffraction. J Opt Soc Am. 1962;52(2):116–130.
- Trifunac MD. Scattering of plane SH-waves by a semi cylindrical canyon. Earthq Eng Struct Dyn. 1973;3(1):267–281.