When the obstacle problem of clamped Kirchhoff plates is discretized by a partition of unity method, the resulting discrete variational inequalities can be solved by a primal-dual active set algorithm. In this paper we develop and analyze additive Schwarz preconditioners for the systems that appear in each iteration of the primal-dual active set algorithm. Numerical results that corroborate the theoretical estimates are also presented
A two-level additive Schwarz preconditioner is developed for the systems resulting from the discreti...
We propose a nonlinear additive Schwarz method for solving nonlinear optimization problems with boun...
Abstract. Low order finite element discretizations of the linear elasticity system suffer increasing...
When the obstacle problem of clamped Kirchhoff plates is discretized by a partition of unity method,...
A partition of unity method for the displacement obstacle problem of clamped Kirchhoff plates is con...
The minimization problem (2) is discretized in [4] by a partition of unity method (PUM). The goal of...
We study a Morley finite element method for the displacement obstacle problem of clamped Kirchhoff p...
We discuss various additive Schwarz preconditioners for a fully-discrete and symmetric boundary el...
We develop an a posteriori analysis of C interior penalty methods for the displacement obstacle prob...
We consider a partition of unity method (PUM) for the displacement obstacle problem of simply suppor...
In this work we study finite element methods for fourth order variational inequalities. We begin wit...
The authors consider the discretization of obstacle problems for second-order elliptic differential ...
Lower bounds for the condition numbers of the preconditioned systems are obtained for two-level addi...
We investigate a two-level additive Schwarz domain decomposition preconditioner for a flat-top parti...
The theory behind Nitsche’s method for approximating the obstacle problem of clamped Kirchhoff plate...
A two-level additive Schwarz preconditioner is developed for the systems resulting from the discreti...
We propose a nonlinear additive Schwarz method for solving nonlinear optimization problems with boun...
Abstract. Low order finite element discretizations of the linear elasticity system suffer increasing...
When the obstacle problem of clamped Kirchhoff plates is discretized by a partition of unity method,...
A partition of unity method for the displacement obstacle problem of clamped Kirchhoff plates is con...
The minimization problem (2) is discretized in [4] by a partition of unity method (PUM). The goal of...
We study a Morley finite element method for the displacement obstacle problem of clamped Kirchhoff p...
We discuss various additive Schwarz preconditioners for a fully-discrete and symmetric boundary el...
We develop an a posteriori analysis of C interior penalty methods for the displacement obstacle prob...
We consider a partition of unity method (PUM) for the displacement obstacle problem of simply suppor...
In this work we study finite element methods for fourth order variational inequalities. We begin wit...
The authors consider the discretization of obstacle problems for second-order elliptic differential ...
Lower bounds for the condition numbers of the preconditioned systems are obtained for two-level addi...
We investigate a two-level additive Schwarz domain decomposition preconditioner for a flat-top parti...
The theory behind Nitsche’s method for approximating the obstacle problem of clamped Kirchhoff plate...
A two-level additive Schwarz preconditioner is developed for the systems resulting from the discreti...
We propose a nonlinear additive Schwarz method for solving nonlinear optimization problems with boun...
Abstract. Low order finite element discretizations of the linear elasticity system suffer increasing...