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On the convergence of the non-overlapping Schwartz subdomain alternating method
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A. M. MATSOKIN
Published/Copyright:
November 19, 2009
Published Online: 2009-11-19
Published in Print: 1989
Walter de Gruyter
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Articles in the same Issue
- Preface
- Block relaxation methods in subspaces, their optimization and application
- On partial solution of systems of linear algebraic equations
- On one method for solving systems of mesh equations
- Fictitious components method and the modified difference counterpart of the Schwartz method
- On the convergence of the non-overlapping Schwartz subdomain alternating method
- On using the bordering method for solving systems of mesh equations
- On the application of the bordering method to the mixed boundary value problem for elliptic equations and on mesh norms in W21/2(S)
- Formulation of the iterative process on subdomains for transport theory problems in odd P2N+1-approximation
- Subdomain iteration principle in transport equation problems
Articles in the same Issue
- Preface
- Block relaxation methods in subspaces, their optimization and application
- On partial solution of systems of linear algebraic equations
- On one method for solving systems of mesh equations
- Fictitious components method and the modified difference counterpart of the Schwartz method
- On the convergence of the non-overlapping Schwartz subdomain alternating method
- On using the bordering method for solving systems of mesh equations
- On the application of the bordering method to the mixed boundary value problem for elliptic equations and on mesh norms in W21/2(S)
- Formulation of the iterative process on subdomains for transport theory problems in odd P2N+1-approximation
- Subdomain iteration principle in transport equation problems
