An Overlooked Issue of Variational Data AssimilationSource: Monthly Weather Review:;2015:;volume( 143 ):;issue: 010::page 3925DOI: 10.1175/MWR-D-14-00404.1Publisher: American Meteorological Society
Abstract: he control variable transform (CVT) is a keystone of variational data assimilation. In publications using such a technique, the background term of the transformed cost function is defined as a canonical inner product of the transformed control variable with itself. However, it is shown in this paper that this practical definition of the cost function is not correct if the CVT uses a square root of the background error covariance matrix that is not square. Fortunately, it is then shown that there is a manifold of the control space for which this flaw has no impact, and that most minimizers used in practice precisely work in this manifold. It is also shown that both correct and practical transformed cost functions have the same minimum. This explains more rigorously why the CVT is working in practice. The case of a singular is finally detailed, showing that the practical cost function still reaches the best linear unbiased estimate (BLUE).
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| contributor author | Ménétrier, Benjamin | |
| contributor author | Auligné, Thomas | |
| date accessioned | 2017-06-09T17:32:50Z | |
| date available | 2017-06-09T17:32:50Z | |
| date copyright | 2015/10/01 | |
| date issued | 2015 | |
| identifier issn | 0027-0644 | |
| identifier other | ams-87054.pdf | |
| identifier uri | http://onlinelibrary.yabesh.ir/handle/yetl/4230681 | |
| description abstract | he control variable transform (CVT) is a keystone of variational data assimilation. In publications using such a technique, the background term of the transformed cost function is defined as a canonical inner product of the transformed control variable with itself. However, it is shown in this paper that this practical definition of the cost function is not correct if the CVT uses a square root of the background error covariance matrix that is not square. Fortunately, it is then shown that there is a manifold of the control space for which this flaw has no impact, and that most minimizers used in practice precisely work in this manifold. It is also shown that both correct and practical transformed cost functions have the same minimum. This explains more rigorously why the CVT is working in practice. The case of a singular is finally detailed, showing that the practical cost function still reaches the best linear unbiased estimate (BLUE). | |
| publisher | American Meteorological Society | |
| title | An Overlooked Issue of Variational Data Assimilation | |
| type | Journal Paper | |
| journal volume | 143 | |
| journal issue | 10 | |
| journal title | Monthly Weather Review | |
| identifier doi | 10.1175/MWR-D-14-00404.1 | |
| journal fristpage | 3925 | |
| journal lastpage | 3930 | |
| tree | Monthly Weather Review:;2015:;volume( 143 ):;issue: 010 | |
| contenttype | Fulltext |