This article presents a staggered grid time-domain finite-difference (FD) program for the simulation of sH-wave propagation in a viscoelastic heteroge¬neous medium. The incorporation of realistic damping in FD program is based on a rheological model widely known as generalized maxwell body (gmB-EK). The accuracy of implementation of realistic damping is validated by comparing the numerically computed frequency dependent quality factors and phase velocity with the same computed using gmB-EK rheological model and the Futterman’s relationship. The accuracy was also validated by comparing the numerically com¬puted soil amplification at resonance frequency for different damping with the analytical solutions. The stability and grid dispersion are...
We have developed a two-dimensional viscoelastic finite-difference modeling method for highly comple...
We have developed a time-domain staggered-grid finite-difference code for modeling non-linear respon...
It is difficult to predict stability properties of a finite difference scheme. It has to be investig...
Simulation of elastic wave propagation is an important method for oil and gas exploration. Accuracy...
International audienceWe investigate an optimal fourth-order staggered-grid finite-difference scheme...
A numerical algorithm is presented that simulates large deformations of heterogeneous, viscoelastic ...
Earthquake waves propagate mainly in rock mass from hypocenter to the bedrock directly underneath a ...
Real Earth media are not perfectly elastic. Instead, they attenuate propagating mechanical waves. Th...
A recursive algorithm to incorporate attenuation into a time-domain finite-difference calculation i...
Real Earth media are anelastic, which affects both the kinematics and dynamics of propagating waves:...
Real earth media disperse and attenuate propagating waves. This anelastic behavior can be well descr...
Abstract We address the basic theoretical and algorithmic aspects of memory-efficient implementation...
We apply the method of Support Operators (SOM) to solve the three dimensional, viscoelastic equation...
Numerical pore-scale simulation of elastic wave propagation is an emerging tool in the analysis of s...
We apply the method of support operators (SOM) to solve the 3-D, viscoelastic equations of motion fo...
We have developed a two-dimensional viscoelastic finite-difference modeling method for highly comple...
We have developed a time-domain staggered-grid finite-difference code for modeling non-linear respon...
It is difficult to predict stability properties of a finite difference scheme. It has to be investig...
Simulation of elastic wave propagation is an important method for oil and gas exploration. Accuracy...
International audienceWe investigate an optimal fourth-order staggered-grid finite-difference scheme...
A numerical algorithm is presented that simulates large deformations of heterogeneous, viscoelastic ...
Earthquake waves propagate mainly in rock mass from hypocenter to the bedrock directly underneath a ...
Real Earth media are not perfectly elastic. Instead, they attenuate propagating mechanical waves. Th...
A recursive algorithm to incorporate attenuation into a time-domain finite-difference calculation i...
Real Earth media are anelastic, which affects both the kinematics and dynamics of propagating waves:...
Real earth media disperse and attenuate propagating waves. This anelastic behavior can be well descr...
Abstract We address the basic theoretical and algorithmic aspects of memory-efficient implementation...
We apply the method of Support Operators (SOM) to solve the three dimensional, viscoelastic equation...
Numerical pore-scale simulation of elastic wave propagation is an emerging tool in the analysis of s...
We apply the method of support operators (SOM) to solve the 3-D, viscoelastic equations of motion fo...
We have developed a two-dimensional viscoelastic finite-difference modeling method for highly comple...
We have developed a time-domain staggered-grid finite-difference code for modeling non-linear respon...
It is difficult to predict stability properties of a finite difference scheme. It has to be investig...