2011
DOI: 10.1002/qj.935
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Impact of non‐smooth observation operators on variational and sequential data assimilation for a limited‐area shallow‐water equation model

Abstract: We investigate the issue of variational and sequential data assimilation with nonlinear and non-smooth observation operators using a two-dimensional limitedarea shallow-water equation model and its adjoint. The performance of the four-dimensional variational approach (4D-Var: two dimensions plus time) compared with that of the maximum-likelihood ensemble filter (MLEF), a hybrid ensemble/variational method, is tested in the presence of non-smooth observation operators.Following the work of Lewis & Overton and K… Show more

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Cited by 24 publications
(14 citation statements)
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“…The SWM has been used for a variety of assimilation experiments e.g. Lawless et al (2005Lawless et al ( , 2008; Katz et al (2011);Steward et al (2012). As an idealised system, it allows clearer understanding of the results without the obfuscating complexity of a more realistic system.…”
Section: Shallow Water Modelmentioning
confidence: 99%
“…The SWM has been used for a variety of assimilation experiments e.g. Lawless et al (2005Lawless et al ( , 2008; Katz et al (2011);Steward et al (2012). As an idealised system, it allows clearer understanding of the results without the obfuscating complexity of a more realistic system.…”
Section: Shallow Water Modelmentioning
confidence: 99%
“…Examples discussed here include so-called variational methods, but there is much more to explore, like iterative Tikhonov regularisation. Of specific mention is are variants that can handle non-smooth problems, see, e.g., Steward et al (2012) for a geophysical example. All these methods can be part of the proposal densities in the Bayesian framework, and this seems to be the natural way to combine the Bayesian and the inverse problems fields, and indeed their communities.…”
Section: Discussionmentioning
confidence: 99%
“…For general nonlinear or even non-smooth radiative transfer operators (Steward et al, 2012), the utility of higher-order elements in a Taylor expansion may be questionable. Also, the development of the second-order term may be time consuming and difficult in the case of complex observation operators, especially when the observation operators cannot be localized.…”
Section: G Wu Et Al: Improving the Etkf Using Second-order Informationmentioning
confidence: 99%