Title:
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On the convergence theory of double $K$-weak splittings of type II (English) |
Author:
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Shekhar, Vaibhav |
Author:
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Mishra, Nachiketa |
Author:
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Mishra, Debasisha |
Language:
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English |
Journal:
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Applications of Mathematics |
ISSN:
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0862-7940 (print) |
ISSN:
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1572-9109 (online) |
Volume:
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67 |
Issue:
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3 |
Year:
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2022 |
Pages:
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341-369 |
Summary lang:
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English |
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Category:
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math |
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Summary:
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Recently, Wang (2017) has introduced the $K$-nonnegative double splitting using the notion of matrices that leave a cone $K\subseteq \mathbb {R}^{n}$ invariant and studied its convergence theory by generalizing the corresponding results for the nonnegative double splitting by Song and Song (2011). However, the convergence theory for $K$-weak regular and $K$-nonnegative double splittings of type II is not yet studied. In this article, we first introduce this class of splittings and then discuss the convergence theory for these sub-classes of matrices. We then obtain the comparison results for two double splittings of a $K$-monotone matrix. Most of these results are completely new even for $K= \mathbb {R}^{n}_+$. The convergence behavior is discussed by performing numerical experiments for different matrices derived from the discretized Poisson equation. (English) |
Keyword:
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linear system |
Keyword:
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iterative method |
Keyword:
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$K$-nonnegativity |
Keyword:
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double splitting |
Keyword:
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convergence theorem |
Keyword:
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comparison theorem |
MSC:
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15A06 |
MSC:
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15A09 |
MSC:
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15B48 |
MSC:
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65F10 |
idZBL:
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Zbl 07547199 |
idMR:
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MR4409310 |
DOI:
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10.21136/AM.2021.0270-20 |
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Date available:
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2022-04-14T13:36:52Z |
Last updated:
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2024-07-01 |
Stable URL:
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http://hdl.handle.net/10338.dmlcz/150319 |
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Reference:
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