Some numerical techniques for solving elliptic interface problems

## Abstract A second‐order finite difference scheme for mixed boundary value problems is presented. This scheme does not require the tangential derivative of the Neumann datum. It is designed for applications in which the Neumann condition is available only in discretized form. The second‐order con

A domain decomposition method is developed for solving thin "lm elliptic interface problems with variable coe$cients. In this study, the elliptic equation with variable coe$cients is discretized using second-order "nite di!erences while a discrete interface equation is obtained using the immersed in

We present some new a priori estimates of the solutions to the second-order elliptic and parabolic interface problems. The novelty of these estimates lies in the explicit appearance of the discontinuous coefficients and the jumps of coefficients across the interface.