Advanced search
Publication Cover
Tellus A: Dynamic Meteorology and Oceanography Volume 69, 2017 - Issue 1
Journal homepage
2,394
Views
42
CrossRef citations to date
0
Altmetric
Research Article

Four-dimensional ensemble variational data assimilation and the unstable subspace

Marc BocquetCEREA, joint laboratory École des Ponts ParisTech and EDF R&D, Université Paris-Est, Champs-sur-Marne, France.Correspondence[email protected]
&
Alberto CarrassiNansen Environmental and Remote Sensing Center, Bergen, Norway.
Article: 1304504 | Received 09 Nov 2016, Accepted 01 Mar 2017, Published online: 30 Mar 2017

References

  • Anderson, B. D. O. and Moore, J. B. 1979. Optimal Filtering. Prentice-Hall Inc, Englewood Cliffs, NJ.
  • Bishop, C. H., Etherton, B. J. and Majumdar, S. J. 2001. Adaptive sampling with the ensemble transform Kalman filter. Part I: Theoretical aspects. Mon. Wea. Rev. 129, 420–436.
  • Björck, Å. and Golub, G. H. 1973. Numerical methods for computing angles between linear subspaces. Math. Comput. 27, 579–594.
  • Bocquet, M. 2011. Ensemble Kalman filtering without the intrinsic need for inflation. Nonlinear Processes Geophys. 18, 735–750.
  • Bocquet, M. 2016. Localization and the iterative ensemble Kalman smoother. Q. J. R. Meteorol. Soc. 142, 1075–1089.
  • Bocquet, M., Gurumoorthy, K. S., Apte, A., Carrassi, A., Grudzien, C. and co-authors. 2017. Degenerate Kalman filter error covariances and their convergence onto the unstable subspace. SIAM/ASA J. Uncertainty Quantification. Accepted for publication; arXiv preprint arXiv:1604.02578.
  • Bocquet, M., Raanes, P. N. and Hannart, A. 2015. Expanding the validity of the ensemble Kalman filter without the intrinsic need for inflation. Nonlinear Processes Geophys. 22, 645–662.
  • Bocquet, M. and Sakov, P. 2012. Combining inflation-free and iterative ensemble Kalman filters for strongly nonlinear systems. Nonlinear Processes Geophys. 19, 383–399.
  • Bocquet, M. and Sakov, P. 2013. Joint state and parameter estimation with an iterative ensemble Kalman smoother. Nonlinear Processes Geophys. 20, 803–818.
  • Bocquet, M. and Sakov, P. 2014. An iterative ensemble Kalman smoother. Q. J. R. Meteorol. Soc. 140, 1521–1535.
  • Carrassi, A., Ghil, M., Trevisan, A. and Uboldi, F. 2008a. Data assimilation as a nonlinear dynamical systems problem: Stability and convergence of the prediction-assimilation system. Chaos 18, 023112.
  • Carrassi, A., Trevisan, A., Descamps, L., Talagrand, O. and Uboldi, F. 2008b. Controlling instabilities along a 3DVar analysis cycle by assimilating in the unstable subspace: A comparison with the EnKF. Nonlinear Processes Geophys. 15, 503–521.
  • Carrassi, A., Trevisan, A. and Uboldi, F. 2007. Adaptive observations and assimilation in the unstable subspace by breeding on the data-assimilation system. Tellus A 59, 101–113.
  • Carrassi, A., Vannitsem, S., Zupanski, D. and Zupanski, M. 2009. The maximum likelihood ensemble filter performances in chaotic systems. Tellus A 61, 587–600.
  • Cohn, S. E., Sivakumaran, N. S. and Todling, R. 1994. A fixed-lag Kalman smoother for retrospective data assimilation. Mon. Wea. Rev. 122, 2838–2867.
  • Cosme, E., Verron, J., Brasseur, P., Blum, J. and Auroux, D. 2012. Smoothing problems in a Bayesian framework and their linear Gaussian solutions. Mon. Wea. Rev. 140, 683–695.
  • Eckmann, J.-P. and Ruelle, D. 1985. Ergodic theory of chaos and strange attractors. Rev. Mod. Phys. 57, 617–656.
  • Evensen, G. 2009. Data Assimilation: The Ensemble Kalman Filter, 2nd ed. Springer-Verlag, Berlin.
  • Ginelli, F., Chaté, H., Livi, R. and Politi, A. 2013. Covariant Lyapunov vectors. J. Phys. A: Math. Theor. 46, 254005.
  • Gurumoorthy, K. S., Grudzien, C., Apte, A., Carrassi, A. and Jones, C. K. R. T. 2017. Rank deficiency of Kalman error covariance matrices in linear time-varying system with deterministic evolution. SIAM J. Control Optim. Accepted for publication, arXiv preprint arXiv:1503.05029.
  • Hunt, B. R., Kalnay, E., Kostelich, E. J., Ott, E., Patil, D. J. and co-authors. 2004. Four-dimensional ensemble Kalman filtering. Tellus A 56, 273–277.
  • Hunt, B. R., Kostelich, E. J. and Szunyogh, I. 2007. Efficient data assimilation for spatiotemporal chaos: A local ensemble transform Kalman filter. Physica D 230, 112–126.
  • Jazwinski, A. H. 1970. Stochastic Processes and Filtering Theory Academic Press, New York.
  • Kalman, R. E. 1960. A new approach to linear filtering and prediction problems. J. Fluids Eng. 82, 35–45.
  • Kalnay, E. 2002. Atmospheric Modeling, Data Assimilation and Predictability. Cambridge University Press, New York.
  • Kuptsov, P. V. and Parlitz, U. 2012. Theory and computation of covariant Lyapunov vectors. J. Nonlinear Sci. 22, 727–762.
  • Legras, B. and Vautard, R. 1996. A guide to lyapunov vectors. In: ECMWF Workshop on Predictability, ECMWF, Reading, UK, 135–146.
  • Liu, C., Xiao, Q. and Wang, B. 2008. An ensemble-based four-dimensional variational data assimilation scheme. Part I: Technical formulation and preliminary test. Mon. Wea. Rev. 136, 3363–3373.
  • Lorenz, E. N. and Emanuel, K. A. 1998. Optimal sites for supplementary weather observations: Simulation with a small model. J. Atmos. Sci. 55, 399–414.
  • Ng, G.-H. C., McLaughlin, D., Entekhabi, D. and Ahanin, A. 2011. The role of model dynamics in ensemble Kalman filter performance for chaotic systems. Tellus A 63, 958–977.
  • Palatella, L., Carrassi, A. and Trevisan, A. 2013. Lyapunov vectors and assimilation in the unstable subspace: Theory and applications. J. Phys. A: Math. Theor. 46, 254020.
  • Palatella, L. and Trevisan, A. 2015. Interaction of Lyapunov vectors in the formulation of the nonlinear extension of the Kalman filter. Phys. Rev. E 91, 042905.
  • Sakov, P. and Oke, P. R. 2008. Implications of the form of the ensemble transformation in the ensemble square root filters. Mon. Wea. Rev. 136, 1042–1053.
  • Sakov, P., Oliver, D. S. and Bertino, L. 2012. An iterative EnKF for strongly nonlinear systems. Mon. Wea. Rev. 140, 1988–2004.
  • Tippett, M. K., Anderson, J. L., Bishop, C. H., Hamill, T. M. and Whitaker, J. S. 2003. Ensemble square root filters. Mon. Wea. Rev. 131, 1485–1490.
  • Trevisan, A., D’Isidoro, M. and Talagrand, O. 2010. Four-dimensional variational assimilation in the unstable subspace and the optimal subspace dimension. Q. J. R. Meteorol. Soc. 136, 487–496.
  • Trevisan, A. and Palatella, L. 2011. On the Kalman filter error covariance collapse into the unstable subspace. Nonlinear Processes Geophys. 18, 243–250.
  • Trevisan, A. and Pancotti, F. 1998. Periodic orbits, Lyapunov vectors, and singular vectors in the Lorenz system. J. Atmos. Sci. 55, 390–398.
  • Trevisan, A. and Uboldi, F. 2004. Assimilation of standard and targeted observations within the unstable subspace of the observation-analysis-forecast cycle. J. Atmos. Sci. 61, 103–113.
  • Uboldi, F. and Trevisan, A. 2006. Detecting unstable structures and controlling error growth by assimilation of standard and adaptive observations in a primitive equation ocean model. Nonlinear Processes Geophys. 16, 67–81.
  • Vannitsem, S. and Lucarini, V. 2016. Statistical and dynamical properties of covariant Lyapunov vectors in a coupled atmosphere-ocean model-multiscale effects, geometric degeneracy, and error dynamics. J. Phys. A: Math. Theor. 49, 224001.
  • Wolfe, C. L. and Samelson, R. M. 2007. An efficient method for recovering Lyapunov vectors from singular vectors. Tellus A 59, 355–366.
  • Zupanski, M. 2005. Maximum likelihood ensemble filter: Theoretical aspects. Mon. Wea. Rev. 133, 1710–1726.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.