P 1-Nonconforming Quadrilateral Finite Volume Methods for the Semilinear Elliptic Equations

Abstract: In this paper we use P 1 -nonconforming quadrilateral finite volume methods with interpolated coefficients to solve the semilinear elliptic problems. Two types of control volumes are applied. Optimal error estimates in H 1 -norm on the quadrilateral mesh and superconvergence of derivative on the rectangular mesh are derived by using the continuity argument, respectively. In addition, numerical experiments are presented adequately to confirm the theoretical analysis and optimal error estimates in L 2 -norm is a… Show more

“…. (27) It should be noted that for the lake at rest with , we have and , and the designed quadratures (26) and (27) satisfy (23).…”

“…Consider the proposed central-upwind scheme (8), (9), (22), (26) and (27) for the system (3)- (7). Assume that the forward Euler method is used for solving the system of ODEs (8) while for all at time .…”

“…In order to show the importance of well-balanced property of the scheme, we apply a non-wellbalanced version of our scheme to the initial-boundary value problem with . To obtain the non-well-balanced scheme, the proposed well-balanced quadratures (26) and (27) are replaced with a straightforward midpoint rule discretization:…”

“…In this paper we consider the two-dimensional (2D) shallow water equations (SWEs): (1) The main goal of this paper is to develop a second-order well-balanced positivity preserving central-upwind scheme for (1) on unstructured quadrilateral grids. Such grids have been widely used in finite volume methods for various applications, in particular, for numerically solving incompressible Navier-Stokes, diffusion equations, semilinear elliptic and elliptic systems, see, e.g., [25][26][27][28] and references therein. In particular, quadrilateral grids have been used to develop finite volume methods for the 2D SWEs, see, e.g., [29][30][31][32][33][34].…”

A well-balanced positivity-preserving central-upwind scheme for shallow water equations on unstructured quadrilateral grids

“…. (27) It should be noted that for the lake at rest with , we have and , and the designed quadratures (26) and (27) satisfy (23).…”

“…Consider the proposed central-upwind scheme (8), (9), (22), (26) and (27) for the system (3)- (7). Assume that the forward Euler method is used for solving the system of ODEs (8) while for all at time .…”

“…In order to show the importance of well-balanced property of the scheme, we apply a non-wellbalanced version of our scheme to the initial-boundary value problem with . To obtain the non-well-balanced scheme, the proposed well-balanced quadratures (26) and (27) are replaced with a straightforward midpoint rule discretization:…”

“…In this paper we consider the two-dimensional (2D) shallow water equations (SWEs): (1) The main goal of this paper is to develop a second-order well-balanced positivity preserving central-upwind scheme for (1) on unstructured quadrilateral grids. Such grids have been widely used in finite volume methods for various applications, in particular, for numerically solving incompressible Navier-Stokes, diffusion equations, semilinear elliptic and elliptic systems, see, e.g., [25][26][27][28] and references therein. In particular, quadrilateral grids have been used to develop finite volume methods for the 2D SWEs, see, e.g., [29][30][31][32][33][34].…”

A well-balanced positivity-preserving central-upwind scheme for shallow water equations on unstructured quadrilateral grids

“…Note that we can also use the interpolation finite element method to deal with the nonlinear term ν(θ h ), κ(θ h ) and β(θ h ) respectively. For further details, readers can refer to [18].…”

Implicit–explicit schemes of finite element method for the non-stationary thermal convection problems with temperature-dependent coefficients

A vertex‐centered linearity‐preserving discretization of diffusion problems on polygonal meshes