A perfectly matched layer absorbing boundary condition for the second-order seismic wave equation

A new absorbing boundary condition using an absorbing layer is presented for application to finite-difference time-domain (FDTD) calculation of the wave equation. This algorithm is by construction a hybrid between the Berenger perfectly matched layer (PML) algorithm and the one-way Sommerfeld algori

The terms on the right sides of (5) 1 and (5) 2 are mutually exclusive. Whereas A គ ( x គ , ) and ( x គ , ) are some fields that are not necessarily electromagnetic, the six scalars ␣ Ϯ (), and so on, are uniform in the respective regions and may be considered as constitutive scalars. A blind appli

## Abstract The need for numerical schemes for wave problems in large and unbounded domains appears in various applications, including modeling of pressure waves in arteries and other problems in biomedical engineering. Two powerful methods to handle such problems via domain truncation are the use

we mtroduce a fourth-order energy for the three-chmenslonal wave equation m rectangular domams with second-order absorbmg boundary condltlons A decay rate of the energy m the domam with respect to time IS estimated m terms of the boundary integral Absorbmg boundary conchtlons considered m tins paper