A fast algorithm for solving the dirichlet problem on hexagonal templet for the poisson equation in a rectangle

This note deals with the construction of solutions of Dirichlet's problem in a rectangle for separate variable coefficient second-order elliptic equations.

A parallel algorithm for solving the Poisson equation with either Dirichlet or Neumann conditions is presented. The solver follows some of the principles introduced in a previous fast algorithm for evaluating singular integral transforms by Daripa et al. Here we present recursive relations in Fourie

A method for accelerating the convergence of iterative processes on a sequence of grids is proposed, which makes use of the decomposition of the difference solution into powers of the discretization step. Approximation solutions from a number of auxiliary grids are extrapolated to the exact solution

## Abstract Fast solvers for Poisson's equation with boundary conditions at infinity are an important building block for molecular dynamics. One issue that arises when this equation is solved numerically is the infinite size of the domain. This prevents a direct solution so that other concepts have