Computer methods in applied mechanics and engineering, ISSN 0045-7825, 2020, Volume 358, p. 112645

We develop a stabilized cut finite element method for the stationary convection–diffusion problem on a surface embedded in Rd...

Cut finite element method | Continuous interior penalty | Streamline diffusion | Convection–diffusion–reaction | PDEs on surfaces | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | Convection-diffusion-reaction | ENGINEERING, MULTIDISCIPLINARY | PDES | EQUATIONS | Finite element method | Stiffness matrix | Stabilization | Tetrahedrons | Embedding | Finite element analysis | Nonlinear programming | Diffusion | Convection

Cut finite element method | Continuous interior penalty | Streamline diffusion | Convection–diffusion–reaction | PDEs on surfaces | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | Convection-diffusion-reaction | ENGINEERING, MULTIDISCIPLINARY | PDES | EQUATIONS | Finite element method | Stiffness matrix | Stabilization | Tetrahedrons | Embedding | Finite element analysis | Nonlinear programming | Diffusion | Convection

Journal Article

Computer methods in applied mechanics and engineering, ISSN 0045-7825, 2019, Volume 353, pp. 308 - 327

For convection dominated problems, the streamline upwind Petrov–Galerkin method (SUPG), also named streamline diffusion finite element method...

Optimal convergence rates | a posteriori error estimate | Streamline diffusion finite element method (SDFEM) | Local mesh-refinement | Adaptive algorithm | Streamline Upwind Petrov–Galerkin method (SUPG) | a posteriori error estimate | OPTIMAL CONVERGENCE-RATES | CONVECTION | POSTERIORI ERROR ESTIMATOR | Streamline Upwind Petrov-Galerkin method (SUPG) | FEM | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | ENGINEERING, MULTIDISCIPLINARY | Finite element method | Methods | Algorithms | Asymptotic properties | Mathematical analysis | Adaptive algorithms | Galerkin method | Finite element analysis | Nonlinear programming | Convection | Convergence | Mathematics - Numerical Analysis

Optimal convergence rates | a posteriori error estimate | Streamline diffusion finite element method (SDFEM) | Local mesh-refinement | Adaptive algorithm | Streamline Upwind Petrov–Galerkin method (SUPG) | a posteriori error estimate | OPTIMAL CONVERGENCE-RATES | CONVECTION | POSTERIORI ERROR ESTIMATOR | Streamline Upwind Petrov-Galerkin method (SUPG) | FEM | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | ENGINEERING, MULTIDISCIPLINARY | Finite element method | Methods | Algorithms | Asymptotic properties | Mathematical analysis | Adaptive algorithms | Galerkin method | Finite element analysis | Nonlinear programming | Convection | Convergence | Mathematics - Numerical Analysis

Journal Article

International Journal for Numerical Methods in Engineering, ISSN 0029-5981, 05/2010, Volume 82, Issue 7, pp. 805 - 842

A finite element‐based level set method is implemented for structural optimization...

level set method | finite element | streamline diffusion | structural optimization | Streamline diffusion | Structural optimization | Level set method | Finite element | SENSITIVITY | EQUATIONS | PETROV-GALERKIN FORMULATIONS | SHAPE | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ENGINEERING, MULTIDISCIPLINARY | GROWTH | TOPOLOGY OPTIMIZATION | FLOWS | Mathematical analysis | Boundary conditions | Dirichlet problem | Drift | Mathematical models | Boundaries | Diffusion | Optimization

level set method | finite element | streamline diffusion | structural optimization | Streamline diffusion | Structural optimization | Level set method | Finite element | SENSITIVITY | EQUATIONS | PETROV-GALERKIN FORMULATIONS | SHAPE | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ENGINEERING, MULTIDISCIPLINARY | GROWTH | TOPOLOGY OPTIMIZATION | FLOWS | Mathematical analysis | Boundary conditions | Dirichlet problem | Drift | Mathematical models | Boundaries | Diffusion | Optimization

Journal Article

IMA Journal of Numerical Analysis, ISSN 0272-4979, 02/2014, Volume 35, Issue 4, pp. 1652 - 1671

There is a wide range of stabilized finite element methods for stationary and nonstationary convection-diffusion equations such as streamline diffusion methods, local projection schemes, subgrid-scale...

continuous interior penalty methods | stabilized finite element methods | stationary convection-diffusion equations | streamline diffusion methods | robust a posteriori error estimates | subgrid-scale methods | nonstationary convection-diffusion equations | local projection schemes | MATHEMATICS, APPLIED | DIFFUSION PROBLEMS | EDGE STABILIZATION | EQUATIONS | DISCRETIZATIONS | LOCAL PROJECTION STABILIZATION | PENALTY | PRIORI | SUBGRID STABILIZATION | ADVECTION | GALERKIN APPROXIMATIONS

continuous interior penalty methods | stabilized finite element methods | stationary convection-diffusion equations | streamline diffusion methods | robust a posteriori error estimates | subgrid-scale methods | nonstationary convection-diffusion equations | local projection schemes | MATHEMATICS, APPLIED | DIFFUSION PROBLEMS | EDGE STABILIZATION | EQUATIONS | DISCRETIZATIONS | LOCAL PROJECTION STABILIZATION | PENALTY | PRIORI | SUBGRID STABILIZATION | ADVECTION | GALERKIN APPROXIMATIONS

Journal Article

International journal for numerical methods in engineering, ISSN 1097-0207, 2019, Volume 120, Issue 7, pp. 901 - 917

.... The method considered is a combination of well‐known techniques: the surface finite element method, streamline diffusion stabilization, and the gradient recovery–based Zienkiewicz‐Zhu error estimator...

recovery‐based error estimator | surface convection‐diffusion‐reaction equations | surface finite element method | streamline diffusion method | adaptive strategy | Finite element method | Methods | Solid surfaces | Computer simulation | Grid refinement (mathematics) | Finite element analysis | Nonlinear programming | Diffusion | Recovery | Convection

recovery‐based error estimator | surface convection‐diffusion‐reaction equations | surface finite element method | streamline diffusion method | adaptive strategy | Finite element method | Methods | Solid surfaces | Computer simulation | Grid refinement (mathematics) | Finite element analysis | Nonlinear programming | Diffusion | Recovery | Convection

Journal Article

应用数学和力学：英文版, ISSN 0253-4827, 2018, Volume 39, Issue 2, pp. 291 - 304

This paper aims to present a new streamline diffusion method with low order rectangular Bernardi-Raugel elements to solve the generalized Oseen equations...

65N15 | streamline diffusion method | Bernardi-Raugel element | Oseen problem | superconvergent error estimate | Classical Mechanics | Mathematics | Applications of Mathematics | Mathematical Modeling and Industrial Mathematics | O242.21 | 65N30 | LOCAL PROJECTION STABILIZATION | MATHEMATICS, APPLIED | MECHANICS | NAVIER-STOKES EQUATIONS | CONVERGENCE | Usage | Models | Mathematical models | Fluid dynamics | Diffusion | Error analysis (Mathematics)

65N15 | streamline diffusion method | Bernardi-Raugel element | Oseen problem | superconvergent error estimate | Classical Mechanics | Mathematics | Applications of Mathematics | Mathematical Modeling and Industrial Mathematics | O242.21 | 65N30 | LOCAL PROJECTION STABILIZATION | MATHEMATICS, APPLIED | MECHANICS | NAVIER-STOKES EQUATIONS | CONVERGENCE | Usage | Models | Mathematical models | Fluid dynamics | Diffusion | Error analysis (Mathematics)

Journal Article

Calcolo, ISSN 0008-0624, 12/2015, Volume 52, Issue 4, pp. 407 - 424

.... The error analysis is also shown to be applied to nonconforming finite element methods with face penalty and subgrid viscosity...

65N15 | Numerical Analysis | A posteriori error estimates | Mathematics | Theory of Computation | Nonconforming finite element | Streamline-diffusion method | Convection-diffusion problem | 65N30 | MESHES | INTERIOR PENALTY | APPROXIMATIONS | VOLUME | REACTION EQUATIONS | DISCRETIZATIONS | MATHEMATICS | STOKES EQUATIONS | SCHEME | PRIORI | ADVECTION | Finite element method | Analysis | Methods

65N15 | Numerical Analysis | A posteriori error estimates | Mathematics | Theory of Computation | Nonconforming finite element | Streamline-diffusion method | Convection-diffusion problem | 65N30 | MESHES | INTERIOR PENALTY | APPROXIMATIONS | VOLUME | REACTION EQUATIONS | DISCRETIZATIONS | MATHEMATICS | STOKES EQUATIONS | SCHEME | PRIORI | ADVECTION | Finite element method | Analysis | Methods

Journal Article

Numerical Mathematics: Theory, Methods and Applications, ISSN 1004-8979, 02/2017, Volume 10, Issue 1, pp. 44 - 64

In this paper, a bilinear Streamline-Diffusion finite element method on Bakhvalov-Shishkin mesh for singularly perturbed convection...

error estimate | singularly perturbed problem | Streamline-Diffusion finite element method | Bakhvalov-Shishkin mesh | MATHEMATICS | MATHEMATICS, APPLIED | SDFEM | LAYER

error estimate | singularly perturbed problem | Streamline-Diffusion finite element method | Bakhvalov-Shishkin mesh | MATHEMATICS | MATHEMATICS, APPLIED | SDFEM | LAYER

Journal Article

Journal of Scientific Computing, ISSN 0885-7474, 4/2010, Volume 43, Issue 1, pp. 24 - 43

In this paper, we study the stability and accuracy of adaptive finite element methods for the convection-dominated convection-diffusion-reaction problem in the two-dimension space...

Computational Mathematics and Numerical Analysis | Streamline diffusion finite element | Anisotropic adaptive mesh | Algorithms | Theoretical, Mathematical and Computational Physics | Multilevel homotopic adaptive finite element method | Appl.Mathematics/Computational Methods of Engineering | Layer-adapted Shishkin grids | Mathematics | Convection-dominated convection-diffusion-reaction problem | MATHEMATICS, APPLIED | DIFFUSION EQUATIONS | RESIDUAL-FREE BUBBLES | ALGORITHM | SPURIOUS OSCILLATIONS | PART II | SCHEME | POSTERIORI ERROR ESTIMATORS | DIMINISHING SOLD METHODS | SHISHKIN MESHES | Finite element method | Anisotropy | Analysis | Methods | Accuracy | Approximation | Mathematical analysis | Mathematical models | Diffusion | Diffusion coefficient | Two dimensional

Computational Mathematics and Numerical Analysis | Streamline diffusion finite element | Anisotropic adaptive mesh | Algorithms | Theoretical, Mathematical and Computational Physics | Multilevel homotopic adaptive finite element method | Appl.Mathematics/Computational Methods of Engineering | Layer-adapted Shishkin grids | Mathematics | Convection-dominated convection-diffusion-reaction problem | MATHEMATICS, APPLIED | DIFFUSION EQUATIONS | RESIDUAL-FREE BUBBLES | ALGORITHM | SPURIOUS OSCILLATIONS | PART II | SCHEME | POSTERIORI ERROR ESTIMATORS | DIMINISHING SOLD METHODS | SHISHKIN MESHES | Finite element method | Anisotropy | Analysis | Methods | Accuracy | Approximation | Mathematical analysis | Mathematical models | Diffusion | Diffusion coefficient | Two dimensional

Journal Article

应用数学学报：英文版, ISSN 0168-9673, 2015, Volume 31, Issue 2, pp. 427 - 434

The streamline-diffusion method of the lowest order nonconforming rectangular finite element is proposed for convection-diffusion problem...

非协调 | 低阶 | 对流扩散问题 | 矩形元 | 用户选择 | 流线扩散法 | 双线性形式 | 有限元空间 | error estimate | 65N15 | Theoretical, Mathematical and Computational Physics | nonconforming rectangular finite element | Mathematics | Applications of Mathematics | Math Applications in Computer Science | convection-diffusion problem | streamline-diffusion method | 65N30 | MATHEMATICS, APPLIED | NAVIER-STOKES EQUATIONS | SUPERCONVERGENCE

非协调 | 低阶 | 对流扩散问题 | 矩形元 | 用户选择 | 流线扩散法 | 双线性形式 | 有限元空间 | error estimate | 65N15 | Theoretical, Mathematical and Computational Physics | nonconforming rectangular finite element | Mathematics | Applications of Mathematics | Math Applications in Computer Science | convection-diffusion problem | streamline-diffusion method | 65N30 | MATHEMATICS, APPLIED | NAVIER-STOKES EQUATIONS | SUPERCONVERGENCE

Journal Article

Journal of Scientific Computing, ISSN 0885-7474, 5/2013, Volume 55, Issue 2, pp. 455 - 470

... (the cellular flows and the cat’s eye flows). The computation is based on adaptive streamline diffusion methods for the advection-diffusion type principal eigenvalue problem associated with the KPP front speeds...

Computational Mathematics and Numerical Analysis | Algorithms | Theoretical, Mathematical and Computational Physics | Eigenvalue problems | Appl.Mathematics/Computational Methods of Engineering | Mathematics | KPP front speeds | Cellular and cat’s eye flows | Adaptive streamline diffusion finite element method | Cellular and cat's eye flows | VELOCITY | MATHEMATICS, APPLIED | REACTION-DIFFUSION | ENHANCEMENT | PROPAGATION | Cats

Computational Mathematics and Numerical Analysis | Algorithms | Theoretical, Mathematical and Computational Physics | Eigenvalue problems | Appl.Mathematics/Computational Methods of Engineering | Mathematics | KPP front speeds | Cellular and cat’s eye flows | Adaptive streamline diffusion finite element method | Cellular and cat's eye flows | VELOCITY | MATHEMATICS, APPLIED | REACTION-DIFFUSION | ENHANCEMENT | PROPAGATION | Cats

Journal Article

Applied Numerical Mathematics, ISSN 0168-9274, 2012, Volume 62, Issue 3, pp. 166 - 184

We show that existing quadrilateral nonconforming finite elements of higher order exhibit a reduction in the order of approximation if the sequence of meshes is still shape-regular but consists...

Error estimates | Incompressible Navier–Stokes equations | Bubble functions | Multigrid | Nonconforming FEM | Incompressible Navier-Stokes equations | INCOMPRESSIBLE-FLOW | MATHEMATICS, APPLIED | SUPERCONVERGENCE | STATIONARY STOKES | ARBITRARY ORDER | POSTERIORI ERROR ESTIMATION | FEM | ESTIMATORS | MULTIGRID METHOD | DISCRETISATIONS | STREAMLINE-DIFFUSION METHOD | Finite element method | Analysis | Errors | Order reduction | Approximation | Asymptotic properties | Mathematical analysis | Mathematical models | Navier-Stokes equations

Error estimates | Incompressible Navier–Stokes equations | Bubble functions | Multigrid | Nonconforming FEM | Incompressible Navier-Stokes equations | INCOMPRESSIBLE-FLOW | MATHEMATICS, APPLIED | SUPERCONVERGENCE | STATIONARY STOKES | ARBITRARY ORDER | POSTERIORI ERROR ESTIMATION | FEM | ESTIMATORS | MULTIGRID METHOD | DISCRETISATIONS | STREAMLINE-DIFFUSION METHOD | Finite element method | Analysis | Errors | Order reduction | Approximation | Asymptotic properties | Mathematical analysis | Mathematical models | Navier-Stokes equations

Journal Article

Applied Numerical Mathematics, ISSN 0168-9274, 04/2019, Volume 138, pp. 19 - 29

In this paper, the streamline-diffusion finite element method is applied to a two-dimensional convection...

Singularly perturbed problem | Streamline-diffusion finite element method | Graded meshes | Higher order | Error estimate | MATHEMATICS, APPLIED | SDFEM | LAYER

Singularly perturbed problem | Streamline-diffusion finite element method | Graded meshes | Higher order | Error estimate | MATHEMATICS, APPLIED | SDFEM | LAYER

Journal Article

Advances in Computational Mathematics, ISSN 1019-7168, 8/2015, Volume 41, Issue 4, pp. 833 - 852

... (BE) approximation in time combined with a mixed finite element method for a discretization of the Poisson equation in the spatial domain and a discontinuous Galerkin (DG...

65M15 | Visualization | Computational Mathematics and Numerical Analysis | Stability | Mathematical and Computational Biology | 82D10 | 35L80 | Mathematics | Computational Science and Engineering | Vlasov-Poisson | Backward-Euler | Discontinuous galerkin | Convergence | 65M60 | Mathematical Modeling and Industrial Mathematics | Mixed finite element | 65M12 | Brezzi-Douglas-Marini elements | MATHEMATICS, APPLIED | FOKKER-PLANCK SYSTEM | SUPERCONVERGENCE | MAXIMUM NORM | FINITE-ELEMENT METHODS | EQUATIONS | STREAMLINE DIFFUSION | SCHEME | ORDER ELLIPTIC PROBLEMS | Finite element method | Convergence (Mathematics) | Approximation theory | Analysis | Poisson processes | Matematik

65M15 | Visualization | Computational Mathematics and Numerical Analysis | Stability | Mathematical and Computational Biology | 82D10 | 35L80 | Mathematics | Computational Science and Engineering | Vlasov-Poisson | Backward-Euler | Discontinuous galerkin | Convergence | 65M60 | Mathematical Modeling and Industrial Mathematics | Mixed finite element | 65M12 | Brezzi-Douglas-Marini elements | MATHEMATICS, APPLIED | FOKKER-PLANCK SYSTEM | SUPERCONVERGENCE | MAXIMUM NORM | FINITE-ELEMENT METHODS | EQUATIONS | STREAMLINE DIFFUSION | SCHEME | ORDER ELLIPTIC PROBLEMS | Finite element method | Convergence (Mathematics) | Approximation theory | Analysis | Poisson processes | Matematik

Journal Article

Journal of Computational and Applied Mathematics, ISSN 0377-0427, 10/2008, Volume 220, Issue 1-2, pp. 712 - 724

.... Let V be the linear finite element space on a suitable grid T . A variant of streamline diffusion finite element method is proved to be almost uniform stable...

Singularly perturbed problem | Streamline diffusion finite element method | Boundary turning point | singularly perturbed problem | MATHEMATICS, APPLIED | RESIDUAL-FREE BUBBLES | SUPERCONVERGENCE | MULTIGRID METHODS | MAXIMUM NORM CONVERGENCE | ERROR ANALYSIS | BOUNDARY-VALUE-PROBLEMS | streamline diffusion finite element method | boundary turning point | Finite element method | Methods

Singularly perturbed problem | Streamline diffusion finite element method | Boundary turning point | singularly perturbed problem | MATHEMATICS, APPLIED | RESIDUAL-FREE BUBBLES | SUPERCONVERGENCE | MULTIGRID METHODS | MAXIMUM NORM CONVERGENCE | ERROR ANALYSIS | BOUNDARY-VALUE-PROBLEMS | streamline diffusion finite element method | boundary turning point | Finite element method | Methods

Journal Article

Journal of computational and applied mathematics, ISSN 0377-0427, 2017, Volume 310, Issue C, pp. 19 - 31

... (edge average finite element) one, are investigated in terms of stability and error analysis...

Convection–diffusion problems | Finite-element method | Space–time formulation | Streamline-diffusion | Exponential fitting | MATHEMATICS, APPLIED | Convection-diffusion problems | EQUATIONS | Space-time formulation | MIXED FINITE-ELEMENTS | ELEMENT EXTERIOR CALCULUS | Time dependence | Error analysis | Stability | Discretization | Singularities | Mathematical analysis | Feasibility | Mathematical models

Convection–diffusion problems | Finite-element method | Space–time formulation | Streamline-diffusion | Exponential fitting | MATHEMATICS, APPLIED | Convection-diffusion problems | EQUATIONS | Space-time formulation | MIXED FINITE-ELEMENTS | ELEMENT EXTERIOR CALCULUS | Time dependence | Error analysis | Stability | Discretization | Singularities | Mathematical analysis | Feasibility | Mathematical models

Journal Article

应用数学和力学：英文版, ISSN 0253-4827, 2013, Volume 34, Issue 9, pp. 1083 - 1096

This paper proposes a new nonconforming finite difference streamline diffusion method to solve incompressible time-dependent Navier-Stokes equations with a high Reynolds number...

时间依赖 | 扩散法 | 空间 | 粘度系数 | 误差估计 | 不可压缩Navier-Stokes方程 | 差分线 | 高雷诺数 | high Reynolds number | Ladyzhenskaya-Babuška-Brezzi (LBB) condition | finite difference streamline diffusion method | Mechanics | discrete Gronwall’s inequality | Mathematics | 65M60 | Applications of Mathematics | Mathematical Modeling and Industrial Mathematics | Navier-Stokes equation | O242.21 | discrete Gronwall's inequality | Ladyzhenskaya-Babuška- Brezzi (LBB) condition | MATHEMATICS, APPLIED | MECHANICS | ELEMENT-METHOD | APPROXIMATIONS | Ladyzhenskaya-Babuska-Brezzi (LBB) condition | Finite element method | Space and time | Research | Navier-Stokes equations

时间依赖 | 扩散法 | 空间 | 粘度系数 | 误差估计 | 不可压缩Navier-Stokes方程 | 差分线 | 高雷诺数 | high Reynolds number | Ladyzhenskaya-Babuška-Brezzi (LBB) condition | finite difference streamline diffusion method | Mechanics | discrete Gronwall’s inequality | Mathematics | 65M60 | Applications of Mathematics | Mathematical Modeling and Industrial Mathematics | Navier-Stokes equation | O242.21 | discrete Gronwall's inequality | Ladyzhenskaya-Babuška- Brezzi (LBB) condition | MATHEMATICS, APPLIED | MECHANICS | ELEMENT-METHOD | APPROXIMATIONS | Ladyzhenskaya-Babuska-Brezzi (LBB) condition | Finite element method | Space and time | Research | Navier-Stokes equations

Journal Article

应用数学和力学：英文版, ISSN 0253-4827, 2010, Volume 31, Issue 7, pp. 861 - 874

A nonconforming finite element method of finite difference streamline diffusion type is proposed to solve the time-dependent linearized Navier-Stokes equations...

时间依赖 | Stokes方程 | 线性化 | 流线扩散 | 有限元逼近 | 有限元方法 | 有限元法 | 依赖型 | Streamline diffusion method | Time-dependent linearized Navier-Stokes equations | Nonconforming finite element method | Error estimate | Finite difference method | error estimate | MATHEMATICS, APPLIED | streamline diffusion method | MECHANICS | nonconforming finite element method | finite difference method | time-dependent linearized Navier-Stokes equations | Finite element method | Research | Diffusion | Streamflow | Navier-Stokes equations | Mathematical analysis

时间依赖 | Stokes方程 | 线性化 | 流线扩散 | 有限元逼近 | 有限元方法 | 有限元法 | 依赖型 | Streamline diffusion method | Time-dependent linearized Navier-Stokes equations | Nonconforming finite element method | Error estimate | Finite difference method | error estimate | MATHEMATICS, APPLIED | streamline diffusion method | MECHANICS | nonconforming finite element method | finite difference method | time-dependent linearized Navier-Stokes equations | Finite element method | Research | Diffusion | Streamflow | Navier-Stokes equations | Mathematical analysis

Journal Article

Kinetic and Related Models, ISSN 1937-5093, 02/2019, Volume 12, Issue 1, pp. 105 - 131

We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche's schemes for the three dimensional, relativistic...

Nitsche scheme | Discontinuous Galerkin | Vlasov-Maxwell system | Streamline diffusion | Hp-method | MATHEMATICS, APPLIED | CONVERGENCE ANALYSIS | FOKKER-PLANCK SYSTEM | hp-method | EQUATIONS | 1ST-ORDER HYPERBOLIC PROBLEMS | POISSON SYSTEM | FINITE ELEMENT METHODS | MATHEMATICS | DISCONTINUOUS GALERKIN METHODS | discontinuous Galerkin | EULER

Nitsche scheme | Discontinuous Galerkin | Vlasov-Maxwell system | Streamline diffusion | Hp-method | MATHEMATICS, APPLIED | CONVERGENCE ANALYSIS | FOKKER-PLANCK SYSTEM | hp-method | EQUATIONS | 1ST-ORDER HYPERBOLIC PROBLEMS | POISSON SYSTEM | FINITE ELEMENT METHODS | MATHEMATICS | DISCONTINUOUS GALERKIN METHODS | discontinuous Galerkin | EULER

Journal Article

Mathematical Modelling of Natural Phenomena, ISSN 0973-5348, 2013, Volume 8, Issue 3, pp. 60 - 77

.... An adaptive streamline diffusion finite element method is used in the advection dominated regime...

KPP fronts | 3D Cellular and ABC Flows | Eigenvalue problems | Adaptive streamline diffusion finite element method | VELOCITY | MATHEMATICS, APPLIED | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | adaptive streamline diffusion finite element method | REACTION-DIFFUSION | ENHANCEMENT | MATHEMATICAL & COMPUTATIONAL BIOLOGY | eigenvalue problems | KIPP fronts | PROPAGATION | Mathematical models | Finite element analysis | Propagation | Eigen values

KPP fronts | 3D Cellular and ABC Flows | Eigenvalue problems | Adaptive streamline diffusion finite element method | VELOCITY | MATHEMATICS, APPLIED | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | adaptive streamline diffusion finite element method | REACTION-DIFFUSION | ENHANCEMENT | MATHEMATICAL & COMPUTATIONAL BIOLOGY | eigenvalue problems | KIPP fronts | PROPAGATION | Mathematical models | Finite element analysis | Propagation | Eigen values

Journal Article