Numerical Treatment of Wet/Dry Fronts in Shallow Flows With a Modified Roe Scheme

Castro, Manuel J.; González‐Vida, J. M.; Parés, Carlos

doi:10.1142/s021820250600139x

Cited by 61 publications

(72 citation statements)

References 24 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…It has been thoroughly tested, and in particular has passed not only all tests by Synolakis et al (2008), but also other laboratory tests and proposed benchmark problems. Some of them can be found in the studies by Castro et al (2005Castro et al ( , 2006, Gallardo et al (2007), de la , and NTHMP (2016).…”

Section: The Tsunami-hysea Modelmentioning

confidence: 99%

Performance Benchmarking of Tsunami-HySEA Model for NTHMP’s Inundation Mapping Activities

Macías

Castro

Ortega

et al. 2017

Pure Appl. Geophys.

Self Cite

View full text Add to dashboard Cite

Abstract-The Tsunami-HySEA model is used to perform some of the numerical benchmark problems proposed and documented in the ''Proceedings and results of the 2011 NTHMP Model Benchmarking Workshop''. The final aim is to obtain the approval for Tsunami-HySEA to be used in projects funded by the National Tsunami Hazard Mitigation Program (NTHMP). Therefore, this work contains the numerical results and comparisons for the five benchmark problems (1, 4, 6, 7, and 9) required for such aim. This set of benchmarks considers analytical, laboratory, and field data test cases. In particular, the analytical solution of a solitary wave runup on a simple beach, and its laboratory counterpart, two more laboratory tests: the runup of a solitary wave on a conically shaped island and the runup onto a complex 3D beach (Monai Valley) and, finally, a field data benchmark based on data from the 1993 Hokkaido Nansei-Oki tsunami.

show abstract

Section: The Tsunami-hysea Modelmentioning

confidence: 99%

Performance Benchmarking of Tsunami-HySEA Model for NTHMP’s Inundation Mapping Activities

Macías

Castro

Ortega

et al. 2017

Pure Appl. Geophys.

Self Cite

View full text Add to dashboard Cite

show abstract

“…Note also that we have checked that the entropy fix correction implemented in our relaxation solver does not intervene in the computation of this particular experiment, where in fact there are no problems of entropy violating solutions associated to transonic rarefactions. Let us also mention that in [25] the test problem presented here is solved by a modified Roe method [24,25], called MRoe, which is not rigorously positivity preserving. The authors need to reduce the CFL number to 0.8 in order to avoid the appearance of negative values of the water height.…”

Section: Dry Bed Formationmentioning

confidence: 99%

“…Other approximate solvers able to treat efficiently vacuum states have been developed by means of relaxation strategies, such as Suliciu's solver [18][19][20], and the recent method of Berthon-Marche [21]. Among other methods, let us mention the augmented four-wave Riemann solver of George [22], which is related to the class of relaxation solvers of LeVeque and Pelanti [23], and the modified Roe method (MRoe) of Castro, Parés and co-workers [24,25]. This MRoe method however is not rigorously positivity preserving, and it may need a restriction on the CFL number to avoid negative water depths.…”

Section: Introductionmentioning

confidence: 99%

A Riemann solver for single-phase and two-phase shallow flow models based on relaxation. Relations with Roe and VFRoe solvers

Pelanti

Bouchut

Mangeney

2011

Journal of Computational Physics

View full text Add to dashboard Cite

a b s t r a c tWe present a Riemann solver derived by a relaxation technique for classical single-phase shallow flow equations and for a two-phase shallow flow model describing a mixture of solid granular material and fluid. Our primary interest is the numerical approximation of this two-phase solid/fluid model, whose complexity poses numerical difficulties that cannot be efficiently addressed by existing solvers. In particular, we are concerned with ensuring a robust treatment of dry bed states. The relaxation system used by the proposed solver is formulated by introducing auxiliary variables that replace the momenta in the spatial gradients of the original model systems. The resulting relaxation solver is related to Roe solver in that its Riemann solution for the flow height and relaxation variables is formally computed as Roe's Riemann solution. The relaxation solver has the advantage of a certain degree of freedom in the specification of the wave structure through the choice of the relaxation parameters. This flexibility can be exploited to handle robustly vacuum states, which is a well known difficulty of standard Roe's method, while maintaining Roe's low diffusivity. For the single-phase model positivity of flow height is rigorously preserved. For the two-phase model positivity of volume fractions in general is not ensured, and a suitable restriction on the CFL number might be needed. Nonetheless, numerical experiments suggest that the proposed two-phase flow solver efficiently models wet/dry fronts and vacuum formation for a large range of flow conditions.As a corollary of our study, we show that for single-phase shallow flow equations the relaxation solver is formally equivalent to the VFRoe solver with conservative variables of Gallouët and Masella [T. Gallouët, J.-M. Masella, Un schéma de Godunov approché C.R. Acad. Sci. Paris, Série I, 323 (1996) 77-84]. The relaxation interpretation allows establishing positivity conditions for this VFRoe method.

show abstract

“…Indeed, they may produce nonphysical negative values of the thickness of the water layer near the wet/dry front. Some ways to modify Roe's method to fix these problems have been proposed in [11,10].…”

Section: Introductionmentioning

confidence: 99%

Efficient numerical schemes for viscoplastic avalanches. Part 2: The 2D case

Fernández-Nieto

Gallardo

Vigneaux

2018

Journal of Computational Physics

View full text Add to dashboard Cite

This paper deals with the numerical resolution of a shallow water viscoplastic flow model. Viscoplastic materials are characterized by the existence of a yield stress: below a certain critical threshold in the imposed stress, there is no deformation and the material behaves like a rigid solid, but when that yield value is exceeded, the material flows like a fluid. In the context of avalanches, it means that after going down a slope, the material can stop and its free surface has a non trivial shape, as opposed to the case of water (Newtonian fluid). The model involves variational inequalities associated to the yield threshold: finite-volume schemes are used together with duality methods (namely Augmented Lagrangian and Bermúdez-Moreno) to discretize the problem. To be able to accurately simulate the stopping behaviour of the avalanche, new schemes need to be designed, involving the classical notion of wellbalancing. In the present context, it needs to be extended to take into account the viscoplastic nature of the material as well as general bottoms with wet/dry fronts which are encountered in geophysical geometries. We derived such schemes and numerical experiments are presented to show their performances.

show abstract

Numerical Treatment of Wet/Dry Fronts in Shallow Flows With a Modified Roe Scheme

Cited by 61 publications

References 24 publications

Performance Benchmarking of Tsunami-HySEA Model for NTHMP’s Inundation Mapping Activities

Performance Benchmarking of Tsunami-HySEA Model for NTHMP’s Inundation Mapping Activities

A Riemann solver for single-phase and two-phase shallow flow models based on relaxation. Relations with Roe and VFRoe solvers

Efficient numerical schemes for viscoplastic avalanches. Part 2: The 2D case

Contact Info

Product

Resources

About