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01518nam a2200313Ia 4500 |
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10.1553-etna_vol55s391 |
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|a 10689613 (ISSN)
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|a MODULUS-BASED CIRCULANT AND SKEW-CIRCULANT SPLITTING ITERATION METHOD FOR THE LINEAR COMPLEMENTARITY PROBLEM WITH A TOEPLITZ MATRIX
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|b Kent State University
|c 2021
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|z View Fulltext in Publisher
|u https://doi.org/10.1553/etna_vol55s391
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|a By reformulating the linear complementarity problem involving a positive definite Toeplitz matrix as an equivalent fixed-point system, we construct a modulus-based circulant and skew-circulant splitting (MCSCS) iteration method. We also analyze the convergence of the method and show that the new method is effective by providing some numerical results. © 2021 Kent State University. All rights reserved.
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|a Circulants
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|a Convergence of numerical methods
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|a Fixed point system
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|a Iterative methods
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|a linear complementarity problem
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|a Linear complementarity problems
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|a Matrix algebra
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|a modulus-based circulant and skew-circulant splitting
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|a Modulus-based circulant and skew-circulant splitting
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|a Numerical results
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|a Positive definite
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|a Splitting iteration method
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|a Splittings
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|a Toeplitz matrices
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|a Toeplitz matrix
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|a Li, C.
|e author
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|a Wu, M.
|e author
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