An adaptive choice for primal spaces based on parallel sums is developed for BDDC deluxe methods and elliptic problems in three dimensions. The primal space, which forms the global, coarse part of the domain decomposition algorithm and which is always required for any competitive algorithm, is defined in terms of generalized eigenvalue problems related to subdomain edges and faces; selected eigenvectors associated to the smallest eigenvalues are used to enhance the primal spaces. This selection can be made automatic by using tolerance parameters specified for the subdomain faces and edges. Numerical results verify the results and provide a comparison with primal spaces commonly used. They include results for cubic subdomains as well as subd...
Domain decomposition methods are robust and parallel scalable, preconditioned iterative algorithms f...
In FETI-DP (Finite Element Tearing and Interconnecting) and BDDC (Balancing Domain Decomposition by ...
Numerical methods are often well-suited for the solution of (elliptic) partial differential equation...
There has recently been a considerable activity in developing adaptive methods for the selection of ...
Iterative substructuring methods are well suited for the parallel iterative solution of elliptic par...
BDDC (Balancing Domain Decomposition by Constraints) and FETI-DP (Dual-Primal Finite Element Tearing...
The convergence rate of domain decomposition methods is generally determined by the eigenvalues of t...
Isogeometric analysis has been introduced as an alternative to finite element methods in order to si...
Balancing Domain Decomposition by Constraints (BDDC) belongs to the class of primal substructuring D...
summary:We describe a parallel implementation of the Balancing Domain Decomposition by Constraints (...
We describe a parallel implementation of the Balancing Domain Decomposition by Constraints (BDDC) me...
The convergence rate of domain decomposition methods is generally determined by the eigenvalues of t...
Adaptive coarse spaces for domain decomposition methods are an active area of research to make itera...
This is the published version, also available here: http://dx.doi.org/10.1137/050629902.Balancing do...
Adaptive coarse spaces yield a robust convergence behavior for FETI-DP (Finite Element Tearing and I...
Domain decomposition methods are robust and parallel scalable, preconditioned iterative algorithms f...
In FETI-DP (Finite Element Tearing and Interconnecting) and BDDC (Balancing Domain Decomposition by ...
Numerical methods are often well-suited for the solution of (elliptic) partial differential equation...
There has recently been a considerable activity in developing adaptive methods for the selection of ...
Iterative substructuring methods are well suited for the parallel iterative solution of elliptic par...
BDDC (Balancing Domain Decomposition by Constraints) and FETI-DP (Dual-Primal Finite Element Tearing...
The convergence rate of domain decomposition methods is generally determined by the eigenvalues of t...
Isogeometric analysis has been introduced as an alternative to finite element methods in order to si...
Balancing Domain Decomposition by Constraints (BDDC) belongs to the class of primal substructuring D...
summary:We describe a parallel implementation of the Balancing Domain Decomposition by Constraints (...
We describe a parallel implementation of the Balancing Domain Decomposition by Constraints (BDDC) me...
The convergence rate of domain decomposition methods is generally determined by the eigenvalues of t...
Adaptive coarse spaces for domain decomposition methods are an active area of research to make itera...
This is the published version, also available here: http://dx.doi.org/10.1137/050629902.Balancing do...
Adaptive coarse spaces yield a robust convergence behavior for FETI-DP (Finite Element Tearing and I...
Domain decomposition methods are robust and parallel scalable, preconditioned iterative algorithms f...
In FETI-DP (Finite Element Tearing and Interconnecting) and BDDC (Balancing Domain Decomposition by ...
Numerical methods are often well-suited for the solution of (elliptic) partial differential equation...