Entropy, Closures and Subgrid Modeling

Frederiksen, Jørgen S.; O’Kane, Terence J.

doi:10.3390/e10040635

Cited by 42 publications

(47 citation statements)

References 163 publications

(267 reference statements)

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“…Frederiksen [4] derived general expressions for the eddy-topographic force, eddy viscosity and stochastic backscatter based on the QDIA closure. O'Kane and Frederiksen [18] and Frederiksen and O'Kane [1] calculated and analysed inhomogeneous subgrid-scale parameterizations for observed atmospheric flows over global topography and compared the strengths of the subgrid-scale eddy-topographic, eddy-mean field, quadratic mean and mean field-topographic terms.…”

Section: [ ]mentioning

confidence: 99%

“…In recent years there have been significant advances in the formulation and applications of subgrid-scale parameterizations to quasigeostrophic (QG) and three-dimensional (3D) turbulence as reviewed by Frederiksen and O'Kane [1]. Statistical dynamical closure theory or stochastic modeling methods form the basis of much of this work.…”

Section: Introductionmentioning

confidence: 99%

“…They also applied the ȕ-plane QDIA closure to the issue of predictability and this was further pursued in a detailed examination of ensemble prediction during blocking regime transitions by O'Kane and Frederiksen [16]. O'Kane and Frederiksen [17] applied the ȕ-plane QDIA closure to data assimilation while O'Kane and Frederiksen [18] and Frederiksen and O'Kane [1] examined the numerical evaluation of the QDIA subgrid model of Frederiksen [4] for equilibrium and non-equilibrium turbulent flows on f-and ȕ-planes.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Statistical Dynamical Closures and Subgrid Modeling for Inhomogeneous QG and 3D Turbulence

Frederiksen

2012

Entropy

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Statistical dynamical closures for inhomogeneous turbulence described by multi-field equations are derived based on renormalized perturbation theory. Generalizations of the computationally tractable quasi-diagonal direct interaction approximation for inhomogeneous barotropic turbulent flows over topography are developed. Statistical closures are also formulated for large eddy simulations including subgrid models that ensure the same large scale statistical behavior as higher resolution closures. The focus is on baroclinic quasigeostrophic and three-dimensional inhomogeneous turbulence although the framework is generally applicable to classical field theories with quadratic nonlinearity.

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Section: [ ]mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Statistical Dynamical Closures and Subgrid Modeling for Inhomogeneous QG and 3D Turbulence

Frederiksen

2012

Entropy

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“…Explicitly, Martyushev & Seleznev (2006) state that 'attempts to derive the maximum entropy principle have so far been unconvincing because they often involve additional hypotheses'. Frederiksen & O'Kane (2008) suggest that this is not surprising, as far-from-equilibrium phenomena are often characterized by multiple stationary states and hysteresis. Martyushev & Seleznev (2006) also explain the apparent paradox that minimum entropy production can be viewed as the maximum possible entropy production rate for a system otherwise strongly constrained to be near equilibrium, for example, heat conduction in a solid.…”

Section: Introductionmentioning

confidence: 96%

Entropy production and self-organized (sub)criticality in earthquake dynamics

Main

Naylor

2010

Phil. Trans. R. Soc. A.

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We derive an analytical expression for entropy production in earthquake populations based on Dewar's formulation, including flux (tectonic forcing) and source (earthquake population) terms, and apply it to the Olami-Feder-Christensen numerical model for earthquake dynamics. Assuming the commonly observed power-law rheology between driving stress and remote strain rate, we test the hypothesis that maximum entropy production (MEP) is a thermodynamic driver for self-organized 'criticality' (SOC) in the model. MEP occurs when the global elastic strain is near-critical, with small relative fluctuations in macroscopic strain energy expressed by a low seismic efficiency, and broad-bandwidth power-law scaling of frequency and rupture area. These phenomena, all as observed in natural earthquake populations, are hallmarks of the broad conceptual definition of SOC (which has, to date, often included self-organizing systems in a near but strictly subcritical state). In the MEP state, the strain field retains some memory of past events, expressed as coherent 'domains', implying a degree of predictability, albeit strongly limited in practice by the proximity to criticality and our inability to map the natural stress field at an equivalent resolution to the numerical model.

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“…Most parametrizations have represented the unresolved processes through heuristic specifications of eddy diffusion (Frederiksen et al 1996), or through arguments based on baroclinic instability (Gent et al 1995) or ideas based on equilibrium statistical mechanics or entropy production hypotheses (Frederiksen & O'Kane 2008). Leith (1971) and Kraichnan (1976) developed a theoretical foundation for subgrid-scale modelling based on closure theory for homogeneous turbulence.…”

Section: Introductionmentioning

confidence: 99%

Stochastic subgrid-scale modelling for non-equilibrium geophysical flows

Zidikheri

Frederiksen

2010

Phil. Trans. R. Soc. A.

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Methods motivated by non-equilibrium statistical mechanics of turbulence are applied to solve an important practical problem in geophysical fluid dynamics, namely the parametrization of subgrid-scale eddies needed in large-eddy simulations (LESs). A direct stochastic modelling scheme that is closely related to techniques based on statistical closure theories, but which is more generally applicable to complex models, is employed. Here, we parametrize the effects of baroclinically unstable subgrid-scale eddies in idealized flows with broad similarities to the Antarctic Circumpolar Current of the Southern Ocean. The subgrid model represents the effects of the unresolved eddies through a generalized Langevin equation. The subgrid dissipation and stochastic forcing covariance matrices as well as the mean subgrid forcing required by the LES model are obtained from the statistics of a high resolution direct numerical simulation (DNS). We show that employing these parametrizations leads to LES in close agreement with DNS.

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Entropy, Closures and Subgrid Modeling

Cited by 42 publications

References 163 publications

Statistical Dynamical Closures and Subgrid Modeling for Inhomogeneous QG and 3D Turbulence

Statistical Dynamical Closures and Subgrid Modeling for Inhomogeneous QG and 3D Turbulence

Entropy production and self-organized (sub)criticality in earthquake dynamics

Stochastic subgrid-scale modelling for non-equilibrium geophysical flows

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