Methods of variational data assimilation with application to problems of hydrothermodynamics of marine water areas
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Valery I. Agoshkov
,
Tatiana O. Sheloput
Abstract
A series of problems related to the class of inverse problems of ocean hydrothermodynamics and problems of variational data assimilation are formulated in the present paper. We propose methods for solving the problems studied here and present results of numerical experiments.
Funding: The work was supported by the Russian Science Foundation (project No. 20-11-20057, Sections 1–3), by the Russian Foundation for Basic Research (project No. 18-01-00267), and by the Moscow Center for Fundamental and Applied Mathematics (agreement with the Ministry of Education and Science of the Russian Federation, No. 075–15–2019–1624).
References
[1] V. I. Agoshkov, Poincaré–Steklov’s operators and domain decomposition methods in finite-dimensional spaces. SIAM Proc. First Int. Symp. on Domain Decomposition Methods, 1987.Search in Google Scholar
[2] V. I. Agoshkov, Methods of Optimal Control and Adjoint Equations in Problems of Mathematical Physics. INM RAS, Moscow, 2003 (in Russian).Search in Google Scholar
[3] V. I. Agoshkov, A. V. Gusev, N. A. Diansky, and R. V. Oleinikov, An algorithm for the solution of the ocean hydrothermodynamics problem with variational assimilation of the sea level function data. Russ. J. Numer. Anal. Math. Modelling22 (2007), No. 2, 133–161.10.1515/RJNAMM.2007.007Search in Google Scholar
[4] V. I. Agoshkov, E. I. Parmuzin, and V. P. Shutyaev, Numerical algorithm for variational assimilation of sea surface temperature data. Comput. Math. Math. Phys. 48 (2008), No. 8, 1293–1312.10.1134/S0965542508080046Search in Google Scholar
[5] V. I. Agoshkov, V. M. Ipatova, V. B. Zalesny, E. I. Parmuzin, and V. P. Shutyaev, Problems of variational assimilation of observational data for ocean general circulation models and methods for their solution. Izv., Atmos. Ocean. Phys. 46 (2010), No. 6, 677–712.10.1134/S0001433810060034Search in Google Scholar
[6] V. I. Agoshkov, Methods for Solving Inverse Problems and Variational Assimilation Problems of Observational Data in the Problems of Large-Scale Dynamics of Oceans and Seas. INM RAS, Moscow, 2016 (in Russian).Search in Google Scholar
[7] V. I. Agoshkov, New technique to formulation of domain decomposition algorithms. Comput. Math. Math. Phys. 60 (2020), No. 3, 353–369.10.1134/S0965542520030021Search in Google Scholar
[8] V. I. Agoshkov and T. O. Sheloput, The study and numerical solution of some inverse problems in simulation of hydrophysical fields in water areas with ‘liquid’ boundaries. Russ. J. Numer. Anal. Math. Modelling32 (2017), No. 3, 147–164.10.1515/rnam-2017-0013Search in Google Scholar
[9] V. I. Agoshkov, E. I. Parmuzin, N. B. Zakharova, and V. P. Shutyaev, Variational assimilation with covariance matrices of observation data errors for the model of the Baltic Sea dynamics. Russ. J. Numer. Anal. Math. Modelling33 (2018), No. 3, 149–160.10.1515/rnam-2018-0013Search in Google Scholar
[10] M. Asch, M. Bocquet, and M. Nodet, Data Assimilation: Methods, Algorithms, and Applications. SIAM, Philadelphia, 2016.10.1137/1.9781611974546Search in Google Scholar
[11] A. Carrassi, M. Bocquet, L. Bertino, and G. Evensen, Data assimilation in the geosciences: An overview of methods, issues, and perspectives. WIREs Clim. Change, 9 (2018), No. 5, e535.10.1002/wcc.535Search in Google Scholar
[12] S. J. Fletcher, Data Assimilation for the Geosciences: from Theory to Application. Elsevier, Amsterdam, 2017.10.1016/B978-0-12-804444-5.00023-4Search in Google Scholar
[13] V. E. Gmurman, Fundamentals of Probability Theory and Mathematical Statistics. Elsevier, London, 2003.Search in Google Scholar
[14] V. I. Lebedev and V. I. Agoshkov, Poincaré–Steklov’s Operators and Their Applications in Analysis. DNM AS USSR, Moscow, 1983 (in Russian).Search in Google Scholar
[15] J. L. Lions, Contrôle Optimal des Systèmes Gouvernés par des Équations aux Dérivées Partielles. Dunod, Paris, 1968.Search in Google Scholar
[16] G. I. Marchuk and V. B. Zalesny, A numerical technique for geophysical data assimilation problem using Pontryagin’s principle and splitting-up method. Russ. J. Numer. Anal. Math. Modelling8 (1993), 311–326.10.1515/rnam.1993.8.4.311Search in Google Scholar
[17] G. I. Marchuk, Adjoint Equations and Analysis of Complex Systems. Springer, Dordrecht, 1995.10.1007/978-94-017-0621-6Search in Google Scholar
[18] G. I. Marchuk, V. P. Dymnikov, and V. B. Zalesny, Mathematical Models in Geophysical Hydrodynamics and Numerical Methods of their Implementation. Gidrometeoizdat, Leningrad, 1987 (in Russian).Search in Google Scholar
[19] G. I. Marchuk, Methods of Numerical Mathematics. Springer, New York, 1982.10.1007/978-1-4613-8150-1Search in Google Scholar
[20] G. I. Marchuk, V. I. Agoshkov, and V. P. Shutyaev, Adjoint Equations and Perturbation Algorithms in Nonlinear Problems. CRC Press, New York, 2018.10.1201/9781315136707Search in Google Scholar
[21] K. Mogensen, M. A. Balmaseda, A. T. Weaver, M. Martin, and A. Vidard, NEMOVAR: a variational data assimilation system for the NEMO ocean model. ECMWF Technical Memorandum, 2009, No. 120.Search in Google Scholar
[22] A. A. Samarskii, Theory of Finite-Difference Schemes. Nauka, Moscow, 1977 (in Russian).Search in Google Scholar
[23] N. B. Zakharova, V. I. Agoshkov, and E. I. Parmuzin, A new interpolation method for observation data obtained from ARGO buoys system. Russ. J. Numer. Anal. Math. Modelling28 (2013), No. 1, 67–84.10.1515/rnam-2013-0005Search in Google Scholar
[24] N. B. Zakharova, Verification of the sea surface temperature observation data. Sovremennye Problemy Distantsionnogo Zondirovaniya Zemli iz Kosmosa13 (2016), No. 3, 106–113 (in Russian).10.21046/2070-7401-2016-13-3-106-113Search in Google Scholar
[25] V. B. Zalesny, V. I. Agoshkov, V. P. Shutyaev, F. Le Dimet, and V. O. Ivchenko, Numerical modelling of ocean hydrodynamics with variational assimilation of observational data. Izv., Atmos. Ocean. Phys. 52 (2016), No. 4, 431–442.10.1134/S0001433816040137Search in Google Scholar
[26] V. B. Zalesny, N. B. Zakharova, and A. V. Gusev, Four-dimensional problem of variational initialization of hydrophysical fields of the World Ocean. Russ. J. Numer. Anal. Math. Modelling26 (2011), No. 2, 209–229.10.1515/rjnamm.2011.012Search in Google Scholar
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Articles in the same Issue
- Frontmatter
- Preface
- Methods of variational data assimilation with application to problems of hydrothermodynamics of marine water areas
- Mathematical immunology: from phenomenological to multiphysics modelling
- Iterative solution methods for elliptic boundary value problems
- Multi-physics flux coupling for hydraulic fracturing modelling within INMOST platform
- Tensor decompositions and rank increment conjecture
- Global optimization based on TT-decomposition
Articles in the same Issue
- Frontmatter
- Preface
- Methods of variational data assimilation with application to problems of hydrothermodynamics of marine water areas
- Mathematical immunology: from phenomenological to multiphysics modelling
- Iterative solution methods for elliptic boundary value problems
- Multi-physics flux coupling for hydraulic fracturing modelling within INMOST platform
- Tensor decompositions and rank increment conjecture
- Global optimization based on TT-decomposition
