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The optimised Schwarz method and the two-Lagrange multiplier method for heterogeneous problems in general domains with two general subdomains
David Neil Greer,
Sébastien Loisel
School of Mathematical & Computer Sciences
Mathematics
Research output
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Contribution to journal
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Article
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peer-review
5
Citations (Scopus)
138
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Dive into the research topics of 'The optimised Schwarz method and the two-Lagrange multiplier method for heterogeneous problems in general domains with two general subdomains'. Together they form a unique fingerprint.
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Mathematics
Lagrange Multiplier Method
100%
Approximates
66%
Field Of Values
66%
System Matrix
66%
PDE
33%
Unit Disk
33%
Boundary Value Problems
33%
Decomposition Method
33%
Global Solution
33%
Linear System
33%
Domain Decomposition
33%
Conformal Map
33%
Numerical Experiment
33%
Lagrange Multiplier
33%
Convergence Rate
33%
Speed Convergence
33%
INIS
convergence
100%
approximations
50%
values
50%
solutions
50%
matrices
50%
size
25%
units
25%
speed
25%
diffusion
25%
partial differential equations
25%
interfaces
25%
maps
25%
increasing
25%
boundary-value problems
25%
decomposition
25%
Engineering
Lagrange Multiplier Method
100%
Subdomains
100%
System Matrix
50%
Numerical Experiment
25%
Rate of Convergence
25%
Boundary Value
25%
Subspace Method
25%
Diffusion Coefficient
25%
Mesh Size
25%
Domain Decomposition
25%