Two-Dimensional Evaluation of ATHAM-Fluidity, a Nonhydrostatic Atmospheric Model Using Mixed Continuous/Discontinuous Finite Elements and Anisotropic Grid Optimization

Savre, Julien; Percival, James; Herzog, Michael; Pain, Christopher C.

doi:10.1175/mwr-d-15-0398.1

Cited by 7 publications

(8 citation statements)

References 62 publications

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“…The inaccuracies and noise for this problem, as seen for some non-Galerkin treatments, are absent; o2o3 is able to advect a structure along a straight line without generating noise. This result is consistent with that for the first-order Galerkin approach and with that obtained by Savre et al (2016), who reported fewer numerical boundary-related errors for the classic Galerkin method. These results indicate that cut cells may be applicable with polynomial representations higher than one.…”

Section: Fig 10supporting

confidence: 92%

“…Nevertheless, existing atmospheric Galerkin models often do not take advantage of such suitability for good surface approximations, because grids that are not horizontally aligned are typically used. A notable exception is the atmospheric model called Active Tracer High-resolution Atmospheric Model-Fluidity (ATHAM-Fluidity) that uses horizontally aligned cells and achieves good results in the generation of mountain-induced waves (Savre et al 2016).…”

Section: Introductionmentioning

confidence: 99%

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微分可能な流束表現を用いたo2o3局所ガラーキン法

Steppeler

Fang

et al. 2022

Journal of the Meteorological Society of Japan

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The spectral element (SE) and local Galerkin (LG) methods may be regarded as variants and generalizations of the classic Galerkin approach. In this study, the second-order spectral element (SE2) method is compared with the alternative LG scheme referred to as o2o3 that combines a secondorder field representation (o2) with a third-order representation of the flux (o3). The full name of o2o3 is o2o3C 0 C 1 , where the continuous basis functions in C 0 -space are used for the field representation and the piecewise third-order differentiable basis functions in C 1 -space are used for the flux approximation. The flux in o2o3 is approximated by a piecewise polynomial function that is both continuous and differentiable, in contrast to many Galerkin and LG schemes that use either continuous or discontinuous basis functions for flux approximations. We show that o2o3 not only has some

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Section: Fig 10supporting

confidence: 92%

Section: Introductionmentioning

confidence: 99%

微分可能な流束表現を用いたo2o3局所ガラーキン法

Steppeler

Fang

et al. 2022

Journal of the Meteorological Society of Japan

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“…Marras 4 / 40 et al (2016) pointed out that element-based Galerkin methods might perform well in next-generation atmospheric and climate models competing with finite difference and spectral transform methods. Savre et al (2016) first introduced the anisotropic adaptive mesh technique into atmospheric modeling in both horizontal and vertical directions and evaluated it with 2D idealized test cases.…”

Section: Introductionmentioning

confidence: 99%

“…In this study, we develop a new 3D dynamically adaptive atmospheric model (Fluidity-Atmosphere) based on the dynamic framework of Fluidity, a computational fluid dynamic (CFD) model developed by the Applied Modeling and Computation Group (AMCG), Imperial College London (ICL) (Pain et al 2001(Pain et al , 2005Piggott et al 2009). Its accuracy and conservation properties have been validated by a series of idealized simulations using a uniform mesh, and the computational cost has been decreased by mesh adaptivity in rising bubble, density current and interacting warm and cold bubble tests (Pain et al 2001(Pain et al , 2005Piggott et al 2009;Savre et al 2016;Zheng et al 2015;2020). Fluidity-Atmosphere applies dynamically tetrahedral adaptive meshes in 3D space and time so that regions of steep topography, high dynamic activity or specific interest can be modeled with high horizontal and vertical resolutions.…”

Section: Introductionmentioning

confidence: 99%

“…The performance of Fluidity, including the approximation accuracy, numerical stability, mesh convergence and conservation properties, has been demonstrated by Pain et al (2001Pain et al ( ), (2005; Farrell et al (2009); Piggott et al (2009); Savre et al (2016); Li et al (2018); and Zheng et al (2015Zheng et al ( ), (2020. One important unanswered question is whether Fluidity-Atmosphere can accurately represent the underlying terrain and simulate mountain waves, which have a dominant effect on atmospheric motions as the horizontal resolution approaches or exceeds O(10 1 ) km (Gallus and Klemp 2000).…”

Section: Introductionmentioning

confidence: 99%

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Demonstration of a three-dimensional dynamically adaptive atmospheric dynamic framework for the simulation of mountain waves

Fang

Steppeler

et al. 2021

Meteorol Atmos Phys

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In this paper, Fluidity-Atmosphere, representative of a three-dimensional (3D) nonhydrostatic Galerkin compressible atmospheric dynamic framework, is generated to resolve large-scale and small-scale phenomena simultaneously. This achievement is facilitated by the use of nonhydrostatic equations and the adoption of a flexible 3D dynamically adaptive mesh where the mesh is denser in areas with higher gradients of variable solutions and relatively sparser in the rest of the domain while maintaining promising accuracy and reducing computational resource requirements. The dynamic core is formulated based on anisotropic tetrahedral meshes in both the horizontal and vertical directions. The performance of the adaptive mesh techniques in Fluidity-Atmosphere is evaluated by simulating the formation and propagation of a nonhydrostatic mountain wave. The 2D anisotropic adaptive mesh shows that the numerical solution is in good agreement with the analytic solution. The variation in the horizontal and vertical resolutions has a strong impact on the smoothness of the results and maintains convergence even at high resolutions. When the simulation is extended to 3D, Fluidity-Atmosphere shows stable and symmetric results in the benchmark test cases. The flows over a bell-shaped mountain are resolved quite smoothly. For steep mountains, Fluidity-Atmosphere performs very well, which shows the potential of using 3D adaptive meshes in atmospheric modeling. Finally, as an alternative cut-cell mesh in Fluidity-Atmosphere, the anisotropic adaptive mesh coupled with the Galerkin method provides an alternative accurate representation of terrain-induced flow.

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Summary and Outlook

Steppeler

2022

Springer Atmospheric Sciences

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Two-Dimensional Evaluation of ATHAM-Fluidity, a Nonhydrostatic Atmospheric Model Using Mixed Continuous/Discontinuous Finite Elements and Anisotropic Grid Optimization

Cited by 7 publications

References 62 publications

微分可能な流束表現を用いたo2o3局所ガラーキン法

微分可能な流束表現を用いたo2o3局所ガラーキン法

Demonstration of a three-dimensional dynamically adaptive atmospheric dynamic framework for the simulation of mountain waves

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