A new least-squares finite element method is developed for the curl-div magnetostatic problem in Lipschitz and multiply connected domains filled with anisotropic nonhomogeneous materials. In order to deal with possibly low regularity of the solution, local L2 projectors are introduced to standard least-squares formulation and applied to both curl and div operators. Coercivity is established by adding suitable mesh-dependent bilinear terms. As a result, any continuous finite elements (lower-order elements are enriched with suitable bubbles) can be employed. A desirable error bound is obtained: ||u-uh||0 = C ||u-˜u||0, where uh and ˜u are the finite element approximation and the finite element interpolant of the exact solution u, respectively...
Abstract. In this paper, an efficient method is developed for computing the magnetostatic field for ...
The results of the application of three well-known 3-D magnetic vector potential (MVP)-based finite-...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
A new least-squares finite element method is developed for the curl-div magnetostatic problem in Lip...
Abstract. In this paper, we describe an approximation technique for div-curl systems based in (L 2 (...
In this thesis, we develop and apply finite element methods to problems of div-curl type, mainly fro...
Abstract. We develop and analyze least-squares finite element methods for two complementary div-curl...
We extend the mimetic finite difference (MFD) method to the numerical treatment of magnetostatic fie...
In this paper, we study some techniques for solving numerically magnetostatic systems. In particular...
In this paper, we consider the div-curl problem posed on nonconvex polyhedral domains. We propose a ...
AbstractWe establish interpolation error estimates for the hp-extension of Nédélec's curl- and diver...
An element-local L2-projected C0 finite element method is presented to approximate the nonsmooth sol...
Previously, a successive approximations procedure was developed to compute by means of the finite el...
none1noInexact Newton solvers can offer many attractive features for the solution of non linear prob...
An enhanced version of a mixed field-based formulation for magnetostatics developed in previous pape...
Abstract. In this paper, an efficient method is developed for computing the magnetostatic field for ...
The results of the application of three well-known 3-D magnetic vector potential (MVP)-based finite-...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
A new least-squares finite element method is developed for the curl-div magnetostatic problem in Lip...
Abstract. In this paper, we describe an approximation technique for div-curl systems based in (L 2 (...
In this thesis, we develop and apply finite element methods to problems of div-curl type, mainly fro...
Abstract. We develop and analyze least-squares finite element methods for two complementary div-curl...
We extend the mimetic finite difference (MFD) method to the numerical treatment of magnetostatic fie...
In this paper, we study some techniques for solving numerically magnetostatic systems. In particular...
In this paper, we consider the div-curl problem posed on nonconvex polyhedral domains. We propose a ...
AbstractWe establish interpolation error estimates for the hp-extension of Nédélec's curl- and diver...
An element-local L2-projected C0 finite element method is presented to approximate the nonsmooth sol...
Previously, a successive approximations procedure was developed to compute by means of the finite el...
none1noInexact Newton solvers can offer many attractive features for the solution of non linear prob...
An enhanced version of a mixed field-based formulation for magnetostatics developed in previous pape...
Abstract. In this paper, an efficient method is developed for computing the magnetostatic field for ...
The results of the application of three well-known 3-D magnetic vector potential (MVP)-based finite-...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...