Higham, Nicholas J. and Mary, Theo (2019) Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. [MIMS Preprint] (Submitted)
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| Item Type: | MIMS Preprint |
|---|---|
| Subjects: | MSC 2010, the AMS's Mathematics Subject Classification > 65 Numerical analysis |
| Depositing User: | Dr Theo Mary |
| Date Deposited: | 05 Jan 2021 10:52 |
| Last Modified: | 05 Jan 2021 10:52 |
| URI: | https://eprints.maths.manchester.ac.uk/id/eprint/2798 |
Available Versions of this Item
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 04 Sep 2019 10:59)
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 09 Sep 2019 13:17)
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 02 Mar 2020 15:41)
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 07 Aug 2020 17:33)
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 07 Sep 2020 13:36)
- Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 05 Jan 2021 10:52) [Currently Displayed]
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Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 07 Sep 2020 13:36)
-
Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 07 Aug 2020 17:33)
-
Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 02 Mar 2020 15:41)
-
Solving Block Low-Rank Linear Systems by LU Factorization is Numerically Stable. (deposited 09 Sep 2019 13:17)
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