On the efficient computation of closed-form Green's functions in planar stratified media

## Abstract The discrete complex image method is one of the most efficient techniques used to evaluate the Green's functions of multilayered media. The usual extraction of surface waves may limit the validity of this method in the near‐field region. The aim of this work is to handle this problem su

In this article, neural networks are employed for fast and efficient calculation of Green's functions in a layered medium. Radial basis function networks (RBFNs) are effectively trained to estimate the coefficients and the exponents that represent a Green's function in the discrete complex image met

## Abstract An efficient scheme is presented to calculate the periodic structure in planar multilayered media. The slowly converging series for the periodic Green's function is accelerated using the Ewald's method combined with Shank transformation and the computational time is significantly reduce

Recently, Altuncu et al. [1] presented a new method for evaluation of Green's function of rough surfaces by buried object approach. However, article in [1] is exactly same as Appendix I part of authors' previous article in [2] and also same as authors' previous article in [3] added with new author.

Complex boundary integral equations (Fredholm-type regular or Cauchy-type singular or even Hadamard-Mangler-type hypersingular) have been used for the numerical solution of general plane isotropic elasticity problems. The related Muskhelishvili and, particularly, Lauricella-Sherman equations are fam