Wave propagation in viscoelastic and poroelastic continua: a boundary element approach M Schanz Springer Science & Business Media, 2012 | 411 | 2012 |
Poroelastodynamics: linear models, analytical solutions, and numerical methods M Schanz | 238 | 2009 |
Recent advances and emerging applications of the boundary element method YJ Liu, S Mukherjee, N Nishimura, M Schanz, W Ye, A Sutradhar, E Pan, ... Applied Mechanics Reviews 64 (3), 030802, 2011 | 234 | 2011 |
Transient wave propagation in a one-dimensional poroelastic column M Schanz, AHD Cheng Acta Mechanica 145, 1-18, 2000 | 188 | 2000 |
Application of ‘operational quadrature methods’ in time domain boundary element methods M Schanz, H Antes Meccanica 32, 179-186, 1997 | 169 | 1997 |
A comparative study of Biot's theory and the linear theory of porous media for wave propagation problems M Schanz, S Diebels Acta mechanica 161 (3), 213-235, 2003 | 144 | 2003 |
A new visco-and elastodynamic time domain boundary element formulation M Schanz, H Antes Computational Mechanics 20 (5), 452-459, 1997 | 136 | 1997 |
A comparative study of three boundary element approaches to calculate the transient response of viscoelastic solids with unbounded domains L Gaul, M Schanz Computer methods in applied mechanics and engineering 179 (1-2), 111-123, 1999 | 132 | 1999 |
Application of 3D time domain boundary element formulation to wave propagation in poroelastic solids M Schanz Engineering Analysis with Boundary Elements 25 (4-5), 363-376, 2001 | 124 | 2001 |
Wave propagation problems treated with convolution quadrature and BEM L Banjai, M Schanz Fast boundary element methods in engineering and industrial applications …, 2012 | 91 | 2012 |
Runge–Kutta convolution quadrature for the boundary element method L Banjai, M Messner, M Schanz Computer methods in applied mechanics and engineering 245, 90-101, 2012 | 89 | 2012 |
A boundary element formulation in time domain for viscoelastic solids M Schanz Communications in Numerical Methods in Engineering 15 (11), 799-809, 1999 | 89 | 1999 |
Fast directional multilevel summation for oscillatory kernels based on Chebyshev interpolation M Messner, M Schanz, E Darve Journal of Computational Physics 231 (4), 1175-1196, 2012 | 85 | 2012 |
Dynamic fundamental solutions for compressible and incompressible modeled poroelastic continua M Schanz, D Pryl International Journal of Solids and Structures 41 (15), 4047-4073, 2004 | 85 | 2004 |
Meshless local Petrov-Galerkin method for continuously nonhomogeneous linear viscoelastic solids J Sladek, V Sladek, C Zhang, M Schanz Computational Mechanics 37, 279-289, 2006 | 72 | 2006 |
Dynamic analyses of plane frames by integral equations for bars and Timoshenko beams H Antes, M Schanz, S Alvermann Journal of sound and vibration 276 (3-5), 807-836, 2004 | 69 | 2004 |
Dynamic analysis of a one-dimensional poroviscoelastic column M Schanz, AHD Cheng J. Appl. Mech. 68 (2), 192-198, 2001 | 61 | 2001 |
Wave propagation in a 1-D partially saturated poroelastic column P Li, M Schanz Geophysical journal international 184 (3), 1341-1353, 2011 | 60 | 2011 |
Convolution quadrature method‐based symmetric Galerkin boundary element method for 3‐d elastodynamics L Kielhorn, M Schanz International journal for numerical methods in engineering 76 (11), 1724-1746, 2008 | 59 | 2008 |
An accelerated symmetric time-domain boundary element formulation for elasticity M Messner, M Schanz Engineering Analysis with Boundary Elements 34 (11), 944-955, 2010 | 55 | 2010 |