A generalization of the schwarz alternating method to an arbitrary number of subdomains |
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Authors: | Lori Badea |
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Affiliation: | (1) Institute for Power Studies and Designs, Bucharest, Romania |
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Abstract: | Summary We give a generalization of the Schwarz alternating method to an arbitrary number of subdomains. As applications, we prove that the method converges for the main second-order boundary value problems, as well as for the system of linear elasticity.For the Dirichlet problems it is proved that the method converges geometrically and some numerical examples are given. |
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Keywords: | AMS(MOS): 65N30 or 65J10 CR: G1.8 |
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