Abstract. We present a method for generating higher-order finite volume discretizations for Poisson’s equation on Cartesian cut cell grids in two and three dimensions. The discretization is in flux-divergence form, and stencils for the flux are computed by solving small weighted least-squares linear systems. Weights are the key in generating a stable discretization. We apply the method to solve Poisson’s equation on a variety of geometries, and we demonstrate that the method can achieve second and fourth order accuracy in both truncation and solution error for these examples. We also show that the Laplacian operator has only stable eigenvalues for each of these examples
© 2017 Elsevier Inc. We present a fast and accurate algorithm to solve Poisson problems in complex g...
We consider the standard five-point finite difference method for solving the Poisson equation with t...
We present a second-order accurate algorithm for solving the free-space Poisson’s equation on a loca...
Efficient higher-order accurate finite volume schemes are developed for the threedimensional Poisson...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In this paper, we present a fourth-order algorithm to solve Poisson's equation in two and three dime...
We present a finite volume method for the solution of the two-dimensional elliptic equation @?.(@b(x...
We present a hybrid geometric-algebraic multigrid approach for solving Poisson's equation on domai...
We present an algorithm for solving Poisson’s equation and the heat equation on irregular domains in...
In this work, the three dimensional Poisson’s equation in Cartesian coordinates with the Dirichlet’s...
We present a block-structured adaptive mesh refinement (AMR) method for computing solutions to Poiss...
We construct and analyze a finite volume scheme for numerical solution of a three-dimensional Poisso...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
We present an algorithm for solving Poisson's equation and the heat equation on irregular domains in...
We present a novel multigrid scheme based on a cut-cell formulation on regular staggered grids which...
© 2017 Elsevier Inc. We present a fast and accurate algorithm to solve Poisson problems in complex g...
We consider the standard five-point finite difference method for solving the Poisson equation with t...
We present a second-order accurate algorithm for solving the free-space Poisson’s equation on a loca...
Efficient higher-order accurate finite volume schemes are developed for the threedimensional Poisson...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In this paper, we present a fourth-order algorithm to solve Poisson's equation in two and three dime...
We present a finite volume method for the solution of the two-dimensional elliptic equation @?.(@b(x...
We present a hybrid geometric-algebraic multigrid approach for solving Poisson's equation on domai...
We present an algorithm for solving Poisson’s equation and the heat equation on irregular domains in...
In this work, the three dimensional Poisson’s equation in Cartesian coordinates with the Dirichlet’s...
We present a block-structured adaptive mesh refinement (AMR) method for computing solutions to Poiss...
We construct and analyze a finite volume scheme for numerical solution of a three-dimensional Poisso...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
We present an algorithm for solving Poisson's equation and the heat equation on irregular domains in...
We present a novel multigrid scheme based on a cut-cell formulation on regular staggered grids which...
© 2017 Elsevier Inc. We present a fast and accurate algorithm to solve Poisson problems in complex g...
We consider the standard five-point finite difference method for solving the Poisson equation with t...
We present a second-order accurate algorithm for solving the free-space Poisson’s equation on a loca...