An efficient and innovative numerical algorithm based on the use of Harmonic Polynomials on each Cell of the computational domain (HPC method) has been recently proposed by Shao and Faltinsen (2014) [1], to solve Boundary Value Problem governed by the Laplace equation. Here, we extend the HPC method for the solution of non-homogeneous elliptic boundary value problems. The homogeneous solution, i.e. the Laplace equation, is represented through a polynomial function with harmonic polynomials while the particular solution of the Poisson equation is provided by a bi-quadratic function. This scheme has been called generalized HPC method. The present algorithm, accurate up to the 4th order, proved to be efficient, i.e. easy to be implemented and ...
In many applications the solution of PDEs in infinite domains with vanishing boundary conditions at ...
Abstract. We describe two ways to use reduced size polynomial approxi-mations for the numerical solu...
This paper presents a high order method for solving the unbounded Poisson equation on a regular mesh...
The computational cost of solving the Navier-Stokes equations numerically is too high for most full-...
AbstractWe describe how to use new reduced size polynomial approximations for the numerical solution...
An efficient method has been developed for the fast solution of the boundary problems of Poisson's e...
We propose a new efficient and accurate numerical method based on harmonic polynomials to solve boun...
summary:The numerical solution of the model fourth-order elliptic boundary value problem in two dime...
It is known that generalized barycentric coordinates (GBCs) can be used to form Bernstein polynomial...
AbstractWe propose an algorithm for solving Poisson's equation on general two-dimensional regions wi...
Abstract. Based on a fast subtractional spectral algorithm for the solution of the Poisson equation,...
A detailed and systematic analysis is performed on the local and global properties of the recently d...
AbstractThis paper presents a high order method for solving the unbounded Poisson equation on a regu...
AbstractThis paper introduces radial basis functions (RBF) into the collocation methods and the comb...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In many applications the solution of PDEs in infinite domains with vanishing boundary conditions at ...
Abstract. We describe two ways to use reduced size polynomial approxi-mations for the numerical solu...
This paper presents a high order method for solving the unbounded Poisson equation on a regular mesh...
The computational cost of solving the Navier-Stokes equations numerically is too high for most full-...
AbstractWe describe how to use new reduced size polynomial approximations for the numerical solution...
An efficient method has been developed for the fast solution of the boundary problems of Poisson's e...
We propose a new efficient and accurate numerical method based on harmonic polynomials to solve boun...
summary:The numerical solution of the model fourth-order elliptic boundary value problem in two dime...
It is known that generalized barycentric coordinates (GBCs) can be used to form Bernstein polynomial...
AbstractWe propose an algorithm for solving Poisson's equation on general two-dimensional regions wi...
Abstract. Based on a fast subtractional spectral algorithm for the solution of the Poisson equation,...
A detailed and systematic analysis is performed on the local and global properties of the recently d...
AbstractThis paper presents a high order method for solving the unbounded Poisson equation on a regu...
AbstractThis paper introduces radial basis functions (RBF) into the collocation methods and the comb...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In many applications the solution of PDEs in infinite domains with vanishing boundary conditions at ...
Abstract. We describe two ways to use reduced size polynomial approxi-mations for the numerical solu...
This paper presents a high order method for solving the unbounded Poisson equation on a regular mesh...