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GrowBag graphs for keyword ? (Num. hits/coverage)
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Found 423 publication records. Showing 423 according to the selection in the facets
Hits ?▲ |
Authors |
Title |
Venue |
Year |
Link |
Author keywords |
33 | Shin-Jae Lee, Minsoo Jeon, Andrew Sohn, Dongseung Kim |
Partitioned Parallel Radix Sort. |
ISHPC |
2000 |
DBLP DOI BibTeX RDF |
|
28 | Enrique Domingo Fernández-Nieto, Remedios Gladis Narbona-Reina |
Extension of WAF Type Methods to Non-Homogeneous Shallow Water Equations with Pollutant. |
J. Sci. Comput. |
2008 |
DBLP DOI BibTeX RDF |
Well-balanced, Upwinding, Shallow water, Source terms, WAF, HLLC, Finite volume method, Pollutant |
24 | Yulong Xing, Chi-Wang Shu |
High-Order Well-Balanced Finite Difference WENO Schemes for a Class of Hyperbolic Systems with Source Terms. |
J. Sci. Comput. |
2006 |
DBLP DOI BibTeX RDF |
Hyperbolic balance laws, source term, elastic wave equation, chemosensitive movement, nozzle flow, conservation laws, shallow water equation, two phase flow, high-order accuracy, WENO scheme |
24 | Clovis Dongmo Jiogo, Pierre Manneback, Pierre Kuonen |
Well balanced sparse matrix-vector multiplication on a parallel heterogeneous system. |
CLUSTER |
2006 |
DBLP DOI BibTeX RDF |
|
19 | Xiaohong Jiang 0001, Susumu Horiguchi |
Statistical skew modeling for general clock distribution networks in presence of process variations. |
IEEE Trans. Very Large Scale Integr. Syst. |
2001 |
DBLP DOI BibTeX RDF |
|
19 | William A. Greene |
Dynamic Load-Balancing via a Genetic Algorithm. |
ICTAI |
2001 |
DBLP DOI BibTeX RDF |
job shop problem, genetic algorithm, load balancing |
17 | Hasan Karjoun, Abdelaziz Beljadid |
A well-balanced and positivity-preserving numerical model for overland flow under vegetation effects. |
Math. Comput. Simul. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Federico Gatti, Carlo de Falco, Simona Perotto, Luca Formaggia |
A scalable well-balanced numerical scheme for the simulation of fast landslides with efficient time stepping. |
Appl. Math. Comput. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Víctor González Tabernero, Manuel J. Castro, José Antonio García-Rodríguez |
High-order well-balanced numerical schemes for one-dimensional shallow-water systems with Coriolis terms. |
Appl. Math. Comput. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Federico Gatti, Carlo de Falco, Simona Perotto, Luca Formaggia, Manuel Pastor |
A scalable well-balanced numerical scheme for the modeling of two-phase shallow granular landslide consolidation. |
J. Comput. Phys. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Yogiraj Mantri, Philipp Öffner, Mario Ricchiuto |
Fully well-balanced entropy controlled discontinuous Galerkin spectral element method for shallow water flows: Global flux quadrature and cell entropy correction. |
J. Comput. Phys. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Jiahui Zhang, Yinhua Xia, Yan Xu |
Well-balanced path-conservative discontinuous Galerkin methods with equilibrium preserving space for two-layer shallow water equations. |
CoRR |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Mirco Ciallella, Lorenzo Micalizzi, Victor Michel-Dansac, Philipp Öffner, Davide Torlo |
A high-order, fully well-balanced, unconditionally positivity-preserving finite volume framework for flood simulations. |
CoRR |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Petr Knobloch, Dmitri Kuzmin, Abhinav Jha |
Well-balanced convex limiting for finite element discretizations of steady convection-diffusion-reaction equations. |
CoRR |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Jiangfu Wang, Huazhong Tang, Kailiang Wu |
High-order accurate positivity-preserving and well-balanced discontinuous Galerkin schemes for ten-moment Gaussian closure equations with source terms. |
CoRR |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Elena Gaburro, Simone Chiocchetti |
High order Well-Balanced Arbitrary-Lagrangian-Eulerian ADER discontinuous Galerkin schemes on general polygonal moving meshes. |
CoRR |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Claudius Birke, Walter Boscheri, Christian Klingenberg |
A Well-Balanced Semi-implicit IMEX Finite Volume Scheme for Ideal Magnetohydrodynamics at All Mach Numbers. |
J. Sci. Comput. |
2024 |
DBLP DOI BibTeX RDF |
|
17 | Hyungjoon Koo, Soyeon Park, Daejin Choi, Taesoo Kim |
Binary Code Representation With Well-Balanced Instruction Normalization. |
IEEE Access |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Nguyen Ba Hoai Linh, Dao Huy Cuong |
A well-balanced finite volume scheme based on planar Riemann solutions for 2D shallow water equations with bathymetry. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Ruifang Yan, Wei Tong, Guoxian Chen |
A mass conservative, well balanced and positivity-preserving central scheme for shallow water equations. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Michele Giuliano Carlino, Elena Gaburro |
Well balanced finite volume schemes for shallow water equations on manifolds. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Alina Chertock, Alexander Kurganov, Tong Wu 0005, Jun Yan |
Well-balanced numerical method for atmospheric flow equations with gravity. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | C. Caballero-Cárdenas, Manuel J. Castro, Tomás Morales de Luna, M. L. Muñoz-Ruiz |
Implicit and implicit-explicit Lagrange-projection finite volume schemes exactly well-balanced for 1D shallow water system. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Alessia Del Grosso, Manuel Jesús Castro Díaz, Christophe Chalons, Tomás Morales de Luna |
On well-balanced implicit-explicit Lagrange-projection schemes for two-layer shallow water equations. |
Appl. Math. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Changsheng Yu, Tiegang Liu, Chengliang Feng |
A Well-Balanced Scheme for Euler Equations with Singular Sources. |
SIAM J. Sci. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Mohsen Hadadian Nejad Yousefi, Seyed Hossein Ghoreishi Najafabadi, Emran Tohidi |
A new well-balanced spectral volume method for solving shallow water equations over variable bed topography with wetting and drying. |
Eng. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Zhuang Zhao, Min Zhang |
Well-balanced fifth-order finite difference Hermite WENO scheme for the shallow water equations. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Yupeng Ren, Kailiang Wu, Jianxian Qiu, Yulong Xing |
On high order positivity-preserving well-balanced finite volume methods for the Euler equations with gravitation. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Ernesto Pimentel-García, Lucas O. Müller, Eleuterio F. Toro, Carlos Parés |
High-order fully well-balanced numerical methods for one-dimensional blood flow with discontinuous properties. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Zhihao Zhang, Junming Duan, Huazhong Tang |
High-order accurate well-balanced energy stable adaptive moving mesh finite difference schemes for the shallow water equations with non-flat bottom topography. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Adrián Navas-Montilla, Isabel Echeverribar |
A family of well-balanced WENO and TENO schemes for atmospheric flows. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Alexander Kurganov, Yongle Liu, Ruixiao Xin |
Well-balanced path-conservative central-upwind schemes based on flux globalization. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Jaeyoung Jung, Jin Hwan Hwang |
Path-conservative positivity-preserving well-balanced finite volume WENO method for porous shallow water equations. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Francesco Fambri, E. Zampa, Saray Busto, Laura Río-Martín, Florian Hindenlang, Eric Sonnendrücker, Michael Dumbser |
A well-balanced and exactly divergence-free staggered semi-implicit hybrid finite volume / finite element scheme for the incompressible MHD equations. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Yaguang Gu, Zhen Gao 0002, Guanghui Hu, Peng Li, Qingcheng Fu |
High order well-balanced positivity-preserving scale-invariant AWENO scheme for Euler systems with gravitational field. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Hugo Carrillo, Emanuele Macca, Carlos Parés, Giovanni Russo 0001 |
Well-balanced adaptive compact approximate Taylor methods for systems of balance laws. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Yangyang Cao, Alexander Kurganov, Yongle Liu, Vladimir Zeitlin |
Flux globalization based well-balanced path-conservative central-upwind scheme for two-layer thermal rotating shallow water equations. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Weizhang Huang, Ruo Li, Jianxian Qiu, Min Zhang |
A well-balanced moving mesh discontinuous Galerkin method for the Ripa model on triangular meshes. |
J. Comput. Phys. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Wei Shyang Chang, Muna Mohammed Bazuhair, Farzad Ismail, Hossain Chizari, Muhammad Hafifi Hafiz Ishak |
Well-balanced energy-stable residual distribution methods for the shallow water equations with varying bottom topography. |
Comput. Math. Appl. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Rémi Abgrall, Yongle Liu |
A New Approach for Designing Well-Balanced Schemes for the Shallow Water Equations: A Combination of Conservative and Primitive Formulations. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Francesco Fambri, E. Zampa, Saray Busto, Laura Río-Martín, Florian Hindenlang, Eric Sonnendrücker, Michael Dumbser |
A well-balanced and exactly divergence-free staggered semi-implicit hybrid finite volume/finite element scheme for the incompressible MHD equations. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Zhihao Zhang, Junming Duan, Huazhong Tang |
High-order accurate well-balanced energy stable adaptive moving mesh finite difference schemes for the shallow water equations with non-flat bottom topography. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Lorenzo Micalizzi, Mario Ricchiuto, Rémi Abgrall |
Novel well-balanced continuous interior penalty stabilizations. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Aekta Aggarwal, Veerappa Gowda G. D., Sudarshan Kumar K |
A well-balanced second-order finite volume approximation for a coupled system of granular flow. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Mete Demircigil, Benoit Fabrèges |
A paradigm for well-balanced schemes for traveling waves emerging in parabolic biological models. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Emmanuel Franck, Victor Michel-Dansac, Laurent Navoret |
Approximately well-balanced Discontinuous Galerkin methods using bases enriched with Physics-Informed Neural Networks. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Alina Chertock, Alexander Kurganov, Michael Redle, Vladimir Zeitlin |
Divergence-Free Flux Globalization Based Well-Balanced Path-Conservative Central-Upwind Schemes for Rotating Shallow Water Magnetohydrodynamics. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Zhihao Zhang, Huazhong Tang, Junming Duan |
High-order accurate well-balanced energy stable finite difference schemes for multi-layer shallow water equations on fixed and adaptive moving meshes. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Michael Dumbser, Olindo Zanotti, Elena Gaburro, Ilya Peshkov |
A well-balanced discontinuous Galerkin method for the first-order Z4 formulation of the Einstein-Euler system. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Claudius Birke, Walter Boscheri, Christian Klingenberg |
A well-balanced semi-implicit IMEX finite volume scheme for ideal Magnetohydrodynamics at all Mach numbers. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Guanlan Huang, Sebastiano Boscarino, Tao Xiong |
High order asymptotic preserving and well-balanced schemes for the shallow water equations with source terms. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Magnus Svärd, Henrik Kalisch |
A novel energy-bounded Boussinesq model and a well balanced and stable numerical discretisation. |
CoRR |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Xi Chen, Alexander Kurganov, Yongle Liu |
Flux Globalization Based Well-Balanced Central-Upwind Schemes for Hydrodynamic Equations with General Free Energy. |
J. Sci. Comput. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Min Shi, Jialin Shen, Qingming Yi, Jian Weng 0001, Zunkai Huang, Aiwen Luo, Yicong Zhou |
LMFFNet: A Well-Balanced Lightweight Network for Fast and Accurate Semantic Segmentation. |
IEEE Trans. Neural Networks Learn. Syst. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Florian Hörsch, Zoltán Szigeti |
On the complexity of finding well-balanced orientations with upper bounds on the out-degrees. |
J. Comb. Optim. |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Hiroki Fujii, Satoshi Uehara, Takeru Miyazaki, Shunsuke Araki, Yasuyuki Nogami |
Some Properties of Well-Balanced Sequences Obtained from Two Logistic Maps over Integers. |
ICCE-Taiwan |
2023 |
DBLP DOI BibTeX RDF |
|
17 | Miriana Calvano, Federica Caruso, Antonio Curci, Antonio Piccinno, Veronica Rossano |
A Rapid Review on Serious Games for Cybersecurity Education: Are "Serious" and Gaming Aspects Well Balanced? |
IS-EUD Workshops |
2023 |
DBLP BibTeX RDF |
|
17 | Julian Koellermeier, Ernesto Pimentel-García |
Steady states and well-balanced schemes for shallow water moment equations with topography. |
Appl. Math. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Jian Dong, Xu Qian |
Well-Balanced and Positivity-Preserving Surface Reconstruction Schemes Solving Ripa Systems With Nonflat Bottom Topography. |
SIAM J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Christophe Berthon, Solène Bulteau, Françoise Foucher, Meissa M'Baye, Victor Michel-Dansac |
A Very Easy High-Order Well-Balanced Reconstruction for Hyperbolic Systems with Source Terms. |
SIAM J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Alexander Kurganov, Yongle Liu, Mária Lukácová-Medvidová |
A Well-Balanced Asymptotic Preserving Scheme for the Two-Dimensional Rotating Shallow Water Equations with Nonflat Bottom Topography. |
SIAM J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Max D. Gunzburger, Buyang Li, Jilu Wang, Zongze Yang |
A mass conservative, well balanced, tangency preserving and energy decaying method for the shallow water equations on a sphere. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Mingyang Cheng, Lingyan Tang, Yaming Chen, Songhe Song |
A well-balanced weighted compact nonlinear scheme for shallow water equations on curvilinear grids. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Robert L. Higdon |
An automatically well-balanced formulation of pressure forcing for discontinuous Galerkin methods for the shallow water equations. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Dihan Dai, Yekaterina Epshteyn, Akil Narayan 0001 |
Hyperbolicity-preserving and well-balanced stochastic Galerkin method for two-dimensional shallow water equations. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Haili Jiang, Huazhong Tang, Kailiang Wu |
Positivity-preserving well-balanced central discontinuous Galerkin schemes for the Euler equations under gravitational fields. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Guanlan Huang, Yulong Xing, Tao Xiong |
High order well-balanced asymptotic preserving finite difference WENO schemes for the shallow water equations in all Froude numbers. |
J. Comput. Phys. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Maojun Li, Rushuang Mu, Haiyun Dong |
A well-balanced discontinuous Galerkin method for the shallow water flows on erodible bottom. |
Comput. Math. Appl. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Ziming Chen, Yingjuan Zhang, Gang Li 0022, Shouguo Qian |
A well-balanced Runge-Kutta discontinuous Galerkin method for the Euler equations in isothermal hydrostatic state under gravitational field. |
Comput. Math. Appl. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Yogiraj Mantri, Philipp Öffner, Mario Ricchiuto |
Fully well balanced entropy controlled DGSEM for shallow water flows: global flux quadrature and cell entropy correction. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Changsheng Yu, Tiegang Liu, Chengliang Feng |
A well-balanced scheme for Euler equations with singular sources. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Zhuang Zhao, Min Zhang |
Well-balanced fifth-order finite difference Hermite WENO scheme for the shallow water equations. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Weizhang Huang, Ruo Li, Jianxian Qiu, Min Zhang |
A well-balanced moving mesh discontinuous Galerkin method for the Ripa model on triangular meshes. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Rémi Bourgeois, Pascal Tremblin, Samuel Kokh, Thomas Padioleau |
An all-regime, well-balanced, positive and entropy satisfying one-step finite volume scheme for the Euler's equations of gas dynamics with gravity. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Wasilij Barsukow, Jonas P. Berberich |
A well-balanced Active Flux method for the shallow water equations with wetting and drying. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Weijie Zhang, Yulong Xing, Eirik Endeve |
Energy conserving and well-balanced discontinuous Galerkin methods for the Euler-Poisson equations in spherical symmetry. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Haili Jiang, Huazhong Tang, Kailiang Wu |
Positivity-Preserving Well-Balanced Central Discontinuous Galerkin Schemes for the Euler Equations under Gravitational Fields. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Michele Giuliano Carlino, Elena Gaburro |
Well balanced finite volume schemes for shallow water equations on manifolds. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Irene Gómez-Bueno, Sebastiano Boscarino, Manuel Jesús Castro Díaz, Carlos Parés, Giovanni Russo 0001 |
Implicit and semi-implicit well-balanced finite-volume methods for systems of balance laws. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Hugo Carrillo, Emanuele Macca, Carlos Parés, Giovanni Russo 0001 |
Well-balanced adaptive compact approximate Taylor methods for systems of balance laws. |
CoRR |
2022 |
DBLP BibTeX RDF |
|
17 | Guosheng Fu |
A high-order velocity-based discontinuous Galerkin scheme for the shallow water equations: local conservation, entropy stability, well-balanced property, and positivity preservation. |
CoRR |
2022 |
DBLP BibTeX RDF |
|
17 | Florian Hörsch, Zoltán Szigeti |
On the complexity of finding well-balanced orientations with upper bounds on the out-degrees. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Guanlan Huang, Yulong Xing, Tao Xiong |
High order asymptotic preserving well-balanced finite difference WENO schemes for all Mach full Euler equations with gravity. |
CoRR |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Guosheng Fu |
A High-Order Velocity-Based Discontinuous Galerkin Scheme for the Shallow Water Equations: Local Conservation, Entropy Stability, Well-Balanced Property, and Positivity Preservation. |
J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Ernesto Guerrero Fernández, Manuel Jesús Castro Díaz, Michael Dumbser, Tomás Morales de Luna |
An Arbitrary High Order Well-Balanced ADER-DG Numerical Scheme for the Multilayer Shallow-Water Model with Variable Density. |
J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Xu Qian, Jian Dong, Songhe Song |
Positivity-Preserving and Well-Balanced Adaptive Surface Reconstruction Schemes for Shallow Water Equations with Wet-Dry Fronts. |
J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Yangyang Cao, Alexander Kurganov, Yongle Liu, Ruixiao Xin |
Flux Globalization Based Well-Balanced Path-Conservative Central-Upwind Schemes for Shallow Water Models. |
J. Sci. Comput. |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Tianbai Xiao |
A Well-Balanced Unified Gas-Kinetic Scheme for Multicomponent Flows under External Force Field. |
Entropy |
2022 |
DBLP DOI BibTeX RDF |
|
17 | Rony Touma, M. A. Saleh |
Well-balanced central schemes for pollutants transport in shallow water equations. |
Math. Comput. Simul. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Irene Gómez-Bueno, Manuel J. Castro, Carlos Parés |
High-order well-balanced methods for systems of balance laws: a control-based approach. |
Appl. Math. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Cipriano Escalante, Manuel J. Castro, Matteo Semplice |
Very high order well-balanced schemes for non-prismatic one-dimensional channels with arbitrary shape. |
Appl. Math. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Gang Li 0022, Jiaojiao Li, Shouguo Qian, Jinmei Gao |
A well-balanced ADER discontinuous Galerkin method based on differential transformation procedure for shallow water equations. |
Appl. Math. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | José A. Carrillo 0001, Manuel J. Castro, Serafim Kalliadasis, Sergio P. Perez |
High-Order Well-Balanced Finite-Volume Schemes for Hydrodynamic Equations With Nonlocal Free Energy. |
SIAM J. Sci. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Elena Gaburro, Manuel J. Castro, Michael Dumbser |
A Well Balanced Finite Volume Scheme for General Relativity. |
SIAM J. Sci. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Dihan Dai, Yekaterina Epshteyn, Akil Narayan 0001 |
Hyperbolicity-Preserving and Well-Balanced Stochastic Galerkin Method for Shallow Water Equations. |
SIAM J. Sci. Comput. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Peng Li, Zhen Gao 0002 |
Simple high order well-balanced finite difference WENO schemes for the Euler equations under gravitational fields. |
J. Comput. Phys. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Xin Liu 0029 |
A new well-balanced finite-volume scheme on unstructured triangular grids for two-dimensional two-layer shallow water flows with wet-dry fronts. |
J. Comput. Phys. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Ruize Yang, Yang Yang 0014, Yulong Xing |
High order sign-preserving and well-balanced exponential Runge-Kutta discontinuous Galerkin methods for the shallow water equations with friction. |
J. Comput. Phys. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Carlos Parés, Carlos Parés-Pulido |
Well-balanced high-order finite difference methods for systems of balance laws. |
J. Comput. Phys. |
2021 |
DBLP DOI BibTeX RDF |
|
17 | Yogiraj Mantri, Sebastian Noelle |
Well-balanced discontinuous Galerkin scheme for 2 × 2 hyperbolic balance law. |
J. Comput. Phys. |
2021 |
DBLP DOI BibTeX RDF |
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