Solving the Poisson equation has numerous important applications. On a Riemannian 2-manifold, the task is most often formulated in terms of finite elements and two challenges commonly arise: discretizing the space of functions and solving the resulting system of equations. In this work, we describe a finite elements system that simultaneously addresses both aspects. The idea is to define a space of functions in 3D and then restrict the 3D functions to the mesh. Unlike traditional approaches, our method is tessellation-independent and has a direct control over system complexity. More importantly, the resulting function space comes with a multi-resolution structure supporting an efficient multigrid solver, and the regularity of the function s...
. This paper is concerned with the implementation and investigation of integral equation based solve...
We present an algorithm that solves the three-dimensional Poisson equation on a cylindrical grid. Th...
AbstractThe Laplace–Beltrami system of nonlinear, elliptic, partial differential equations has utili...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
This paper presents a strategy to accelerate virtually any Poisson solver by taking advantage of s s...
A method is presented to include irregular domain boundaries in a geometric multigrid solver. Dirich...
2011 Summer.Includes bibliographical references.The solution of partial differential equations on no...
Adaptive discretizations are important in many multiscale problems, where it is critical to reduce t...
Journal ArticleThe inhomogeneous Laplace (Poisson) equation with internal Dirichlet boundary conditi...
We solve Poisson's equation using new multigrid algorithms that converge rapidly. The feature of th...
We present a hybrid geometric-algebraic multigrid approach for solving Poisson's equation on domai...
© 2017 Elsevier Inc. We present a fast and accurate algorithm to solve Poisson problems in complex g...
We present a block-structured adaptive mesh refinement (AMR) method for computing solutions to Poiss...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
. This paper is concerned with the implementation and investigation of integral equation based solve...
We present an algorithm that solves the three-dimensional Poisson equation on a cylindrical grid. Th...
AbstractThe Laplace–Beltrami system of nonlinear, elliptic, partial differential equations has utili...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
This paper presents a strategy to accelerate virtually any Poisson solver by taking advantage of s s...
A method is presented to include irregular domain boundaries in a geometric multigrid solver. Dirich...
2011 Summer.Includes bibliographical references.The solution of partial differential equations on no...
Adaptive discretizations are important in many multiscale problems, where it is critical to reduce t...
Journal ArticleThe inhomogeneous Laplace (Poisson) equation with internal Dirichlet boundary conditi...
We solve Poisson's equation using new multigrid algorithms that converge rapidly. The feature of th...
We present a hybrid geometric-algebraic multigrid approach for solving Poisson's equation on domai...
© 2017 Elsevier Inc. We present a fast and accurate algorithm to solve Poisson problems in complex g...
We present a block-structured adaptive mesh refinement (AMR) method for computing solutions to Poiss...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
. This paper is concerned with the implementation and investigation of integral equation based solve...
We present an algorithm that solves the three-dimensional Poisson equation on a cylindrical grid. Th...
AbstractThe Laplace–Beltrami system of nonlinear, elliptic, partial differential equations has utili...