High-order well-balanced finite volume WENO schemes for shallow water equation with moving water

Well-balanced discontinuous Galerkin scheme for \(2 \times 2\) hyperbolic balance law, A staggered semi-implicit hybrid finite volume / finite element scheme for the shallow water equations at all Froude numbers, A steady-state-preserving scheme for shallow water flows in channels, Well-balanced finite volume schemes for nearly steady adiabatic flows, Well-balanced high-order finite difference methods for systems of balance laws, A Newton multigrid method for steady-state shallow water equations with topography and dry areas, A new well-balanced Hermite weighted essentially non-oscillatory scheme for shallow water equations, High-order accurate entropy stable finite difference schemes for the shallow water magnetohydrodynamics, A well-balanced finite volume scheme for a mixed hyperbolic/parabolic system to model chemotaxis, \textit{A posteriori} finite-volume local subcell correction of high-order discontinuous Galerkin schemes for the nonlinear shallow-water equations, A mass conservative, well balanced, tangency preserving and energy decaying method for the shallow water equations on a sphere, Multiwavelet-based grid adaptation with discontinuous Galerkin schemes for shallow water equations, A comparison of two entropy stable discontinuous Galerkin spectral element approximations for the shallow water equations with non-constant topography, Godunov-type numerical methods for a model of granular flow, Asymptotically and exactly energy balanced augmented flux-ADER schemes with application to hyperbolic conservation laws with geometric source terms, FullSWOF Paral: Comparison of two parallelization strategies (MPI and SKELGIS) on a software designed for hydrology applications, High-order well-balanced schemes and applications to non-equilibrium flow, Multiwavelet discontinuous Galerkin \(h\)-adaptive shallow water model, Multiple-grid finite element solution of the shallow water equations: water hammer phenomenon, High-order well-balanced central WENO scheme for pre-balanced shallow water equations, Rankine-Hugoniot-Riemann solver for steady multidimensional conservation laws with source terms, Recent advances on the discontinuous Galerkin method for shallow water equations with topography source terms, A shallow water with variable pressure model for blood flow simulation, A well-balanced positivity-preserving central-upwind scheme for shallow water equations on unstructured quadrilateral grids, An efficient splitting technique for two-layer shallow-water model, Well-balanced finite difference WENO schemes for the ripa model, The MOOD method for the non-conservative shallow-water system, A well-balanced path conservative SPH scheme for nonconservative hyperbolic systems with applications to shallow water and multi-phase flows, Well-balanced methods for the shallow water equations in spherical coordinates, High order exactly well-balanced numerical methods for shallow water systems, High order well-balanced CDG-FE methods for shallow water waves by a Green-Naghdi model, Exactly well-balanced discontinuous Galerkin methods for the shallow water equations with moving water equilibrium, Well-balanced schemes for the Euler equations with gravitation, Flux globalization based well-balanced path-conservative central-upwind schemes for shallow water models, A unified surface-gradient and hydrostatic reconstruction scheme for the shallow water equations, An explicit residual based approach for shallow water flows, Energy balanced numerical schemes with very high order. The augmented Roe flux ADER scheme. Application to the shallow water equations, High-order well-balanced methods for systems of balance laws: a control-based approach, A well-balanced ADER discontinuous Galerkin method based on differential transformation procedure for shallow water equations, Well-balanced discontinuous Galerkin methods for the one-dimensional blood flow through arteries model with man-at-eternal-rest and living-man equilibria, High order well-balanced asymptotic preserving finite difference WENO schemes for the shallow water equations in all Froude numbers, Well-balanced discontinuous Galerkin methods with hydrostatic reconstruction for the Euler equations with gravitation, An oscillation-free discontinuous Galerkin method for shallow water equations, The use of proper orthogonal decomposition (POD) meshless RBF-FD technique to simulate the shallow water equations, A well-balanced scheme for the shallow-water equations with topography or Manning friction, Central-upwind schemes for the system of shallow water equations with horizontal temperature gradients, Overcoming numerical shockwave anomalies using energy balanced numerical schemes. Application to the shallow water equations with discontinuous topography, Well balancing of the SWE schemes for moving-water steady flows, A hybrid algorithm for the Baer-Nunziato model using the Riemann invariants, A family of second-order dissipative finite volume schemes for hyperbolic systems of conservation laws, A hybrid method to solve shallow water flows with horizontal density gradients, Analysis of a new Kolgan-type scheme motivated by the shallow water equations, Well-balanced fifth-order finite difference Hermite WENO scheme for the shallow water equations, Well-balanced unstaggered central schemes for one and two-dimensional shallow water equation systems, A simple two-phase method for the simulation of complex free surface flows, A well-balanced and positivity-preserving numerical model for shallow water flows in channels with wet-dry fronts, A diffuse interface method for complex three-dimensional free surface flows, Energy-stable staggered schemes for the shallow water equations, High-order entropy stable discontinuous Galerkin methods for the shallow water equations: curved triangular meshes and GPU acceleration, A well balanced and entropy conservative discontinuous Galerkin spectral element method for the shallow water equations, A HLLC scheme for Ripa model, Well-balanced central finite volume methods for the Ripa system, Moving-Water Equilibria Preserving Partial Relaxation Scheme for the Saint-Venant System, Why many theories of shock waves are necessary: convergence error in formally path-consistent schemes, Well-balanced schemes for the shallow water equations with Coriolis forces, A fully well-balanced and asymptotic preserving scheme for the shallow-water equations with a generalized Manning friction source term, Low-Shapiro hydrostatic reconstruction technique for blood flow simulation in large arteries with varying geometrical and mechanical properties, High order well-balanced finite volume methods for multi-dimensional systems of hyperbolic balance laws, A two-dimensional high-order well-balanced scheme for the shallow water equations with topography and Manning friction, A well-balanced scheme for the shallow-water equations with topography, 2D well-balanced augmented ADER schemes for the shallow water equations with bed elevation and extension to the rotating frame, An entropy stable discontinuous Galerkin method for the shallow water equations on curvilinear meshes with wet/dry fronts accelerated by GPUs, High order well-balanced scheme for river flow modeling, Well-balanced and energy stable schemes for the shallow water equations with discontinuous topography, Hydrodynamic instabilities in well-balanced finite volume schemes for frictional shallow water equations. The kinematic wave case, Shallow water flows in channels, A well-balanced path-integral f-wave method for hyperbolic problems with source terms, On the C-property and generalized C-property of residual distribution for the shallow water equations, On the advantage of well-balanced schemes for moving-water equilibria of the shallow water equations, Reprint of: ``Well-balanced methods for the shallow water equations in spherical coordinates, A fully well-balanced, positive and entropy-satisfying Godunov-type method for the shallow-water equations, A high-order well-balanced positivity-preserving moving mesh DG method for the shallow water equations with non-flat bottom topography, Well-balanced central schemes for systems of shallow water equations with wet and dry states, High order still-water and moving-water equilibria preserving discontinuous Galerkin methods for the Ripa model, A comparison between bottom-discontinuity numerical treatments in the DG framework, Positivity-preserving well-balanced arbitrary Lagrangian-Eulerian discontinuous Galerkin methods for the shallow water equations, Well-balanced high-order finite volume methods for systems of balance laws, Well-balanced scheme for gas-flow in pipeline networks, Well-balanced central schemes for two-dimensional systems of shallow water equations with wet and dry states, Well-Balanced Unstaggered Central Schemes for the Euler Equations with Gravitation, Centered-Potential Regularization for the Advection Upstream Splitting Method, Central unstaggered finite volume schemes for hyperbolic systems: Applications to unsteady shallow water equations, A new approach for designing moving-water equilibria preserving schemes for the shallow water equations, A unified asymptotic preserving and well-balanced scheme for the Euler system with multiscale relaxation, An arbitrary high order and positivity preserving method for the shallow water equations, A well-balanced element-free Galerkin method for the nonlinear shallow water equations, Well balanced finite volume schemes for shallow water equations on manifolds, Implicit and semi-implicit well-balanced finite-volume methods for systems of balance laws, Structure-preserving finite volume arbitrary Lagrangian-Eulerian WENO schemes for the shallow water equations, Well-balanced central schemes on overlapping cells with constant subtraction techniques for the Saint-Venant shallow water system, Essentially non-oscillatory and weighted essentially non-oscillatory schemes, Hyperbolic Balance Laws: Residual Distribution, Local and Global Fluxes, A Fully Well-Balanced Lagrange--Projection-Type Scheme for the Shallow-Water Equations, Well-Balanced Second-Order Finite Element Approximation of the Shallow Water Equations with Friction, A Very Easy High-Order Well-Balanced Reconstruction for Hyperbolic Systems with Source Terms, A New Hydrostatic Reconstruction Scheme Based on Subcell Reconstructions, Adaptive physical-constraints-preserving unstaggered central schemes for shallow water equations on quadrilateral meshes, High-order accurate well-balanced energy stable adaptive moving mesh finite difference schemes for the shallow water equations with non-flat bottom topography, High Order Continuous Local-Conserving Fluxes and Finite-Volume-Like Finite Element Solutions for Elliptic Equations, Hybrid fifth-order unequal-sized weighted essentially non-oscillatory scheme for shallow water equations, Unnamed Item, WELL-BALANCED NUMERICAL SCHEMES BASED ON A GENERALIZED HYDROSTATIC RECONSTRUCTION TECHNIQUE, A well-balanced and exactly divergence-free staggered semi-implicit hybrid finite volume / finite element scheme for the incompressible MHD equations, Moving water equilibria preserving discontinuous Galerkin method for the shallow water equations, Numerical approximation of living-man steady state solutions for blood flow in arteries using a well-balanced discontinuous Galerkin scheme, A Well-Balanced Partial Relaxation Scheme for the Two-Dimensional Saint-Venant System, Arbitrary high order WENO finite volume scheme with flux globalization for moving equilibria preservation, A scalable well-balanced numerical scheme for the modeling of two-phase shallow granular landslide consolidation, Moving water equilibria preserving nonstaggered central scheme for open‐channel flows, Flux Globalization Based Well-Balanced Path-Conservative Central-Upwind Scheme for the Thermal Rotating Shallow Water Equations, The entropy fix in augmented Riemann solvers in presence of source terms: application to the shallow water equations, Flux globalization based well-balanced central-upwind schemes for hydrodynamic equations with general free energy, Well-Balanced Finite-Volume Schemes for Hydrodynamic Equations with General Free Energy, Well-Balanced Unstaggered Central Scheme Based on the Continuous Approximation of the Bottom Topography, Path-conservative positivity-preserving well-balanced finite volume WENO method for porous shallow water equations, Fully well-balanced entropy controlled discontinuous Galerkin spectral element method for shallow water flows: global flux quadrature and cell entropy correction, A New Well-Balanced Finite Volume CWENO Scheme for Shallow Water Equations over Bottom Topography, Well-Balanced Second-Order Approximation of the Shallow Water Equation with Continuous Finite Elements, Recasting an operator splitting solver into a standard finite volume flux-based algorithm. The case of a Lagrange-projection-type method for gas dynamics, Unnamed Item, Congested shallow water model: roof modeling in free surface flow, Convergence of a Second-order Energy-decaying Method for the Viscous Rotating Shallow Water Equation, Numerical approximation of viscous terms in finite volume models for shallow waters, Second Order Finite Volume Scheme for Euler Equations with Gravity which is Well-Balanced for General Equations of State and Grid Systems, Competition between kinematic and dynamic waves in floods on steep slopes, High Order Discretely Well-Balanced Methods for Arbitrary Hydrostatic Atmospheres, An Adaptive Artificial Viscosity Method for the Saint-Venant System, Kinetic entropy inequality and hydrostatic reconstruction scheme for the Saint-Venant system, On some fast well-balanced first order solvers for nonconservative systems, High order finite volume WENO schemes for the shallow water flows through channels with irregular geometry, A central scheme for shallow water flows along channels with irregular geometry, Finite-volume schemes for shallow-water equations, High-Order Well-Balanced Finite-Volume Schemes for Hydrodynamic Equations With Nonlocal Free Energy

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• Well balanced finite volume methods for nearly hydrostatic flows
• ENO and WENO schemes with the exact conservation property for one-dimensional shallow water equations
• A steady state capturing and preserving method for computing hyperbolic systems with geometrical source terms having concentrations
• Well-balanced finite volume evolution Galerkin methods for the shallow water equations
• Efficient implementation of essentially nonoscillatory shock-capturing schemes
• Improved treatment of source terms in upwind schemes for the shallow water equations in channels with irregular geometry
• Weighted essentially non-oscillatory schemes
• A well-balanced flux-vector splitting scheme designed for hyperbolic systems of conservation laws with source terms
• Definition and weak stability of nonconservative products
• Efficient implementation of weighted ENO schemes
• High order finite difference WENO schemes with the exact conservation property for the shallow water equations
• High order well-balanced finite volume WENO schemes and discontinuous Galerkin methods for a class of hyperbolic systems with source terms
• Well-balanced finite volume schemes of arbitrary order of accuracy for shallow water flows
• High-order well-balanced finite difference WENO schemes for a class of hyperbolic systems with source terms
• A steady-state capturing method for hyperbolic systems with geometrical source terms
• TVB Uniformly High-Order Schemes for Conservation Laws
• Central-Upwind Schemes for the Saint-Venant System
• A Fast and Stable Well-Balanced Scheme with Hydrostatic Reconstruction for Shallow Water Flows
• A Wave Propagation Method for Conservation Laws and Balance Laws with Spatially Varying Flux Functions
• A Well-Balanced Scheme for the Numerical Processing of Source Terms in Hyperbolic Equations
• On the well-balance property of Roe's method for nonconservative hyperbolic systems. applications to shallow-water systems
• High order finite volume schemes based on reconstruction of states for solving hyperbolic systems with nonconservative products. Applications to shallow-water systems
• Numerical methods for nonconservative hyperbolic systems: a theoretical framework.
• Two Interface-Type Numerical Methods for Computing Hyperbolic Systems with Geometrical Source Terms Having Concentrations
• A technique of treating negative weights in WENO schemes