An HDG Method for Convection Diffusion Equation

Qiu, Weifeng; Shi, Ke

doi:10.1007/s10915-015-0024-5

Cited by 55 publications

(55 citation statements)

References 13 publications

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“…We emphasize that the HDG method in this work is considered to be a superconvergent method. Specifically, if polynomials of degree k ≥ 0 are used for the numerical traces (global system), then we can obtain k + 2 order for the scalar variables; see, e.g., [22][23][24]. Hence, from the viewpoint of globally coupled degrees of freedom, this method achieves superconvergence for the scalar variable.…”

Section: The Ensemble Hdg Formulationmentioning

confidence: 99%

“…In this paper, we first restore the superconvergence for k = 0 by modifying the stabilization function in [23]. Next, we show that the new ensemble HDG method can obtain a L ∞ (0, T ; L 2 (Ω)) superconvergent rate for all k ≥ 0 on a general polyhedron mesh and without assume the coefficients are independent of time.…”

Section: Introductionmentioning

confidence: 99%

“…This method was proposed by [19] and later analyzed by [21] for a single steady elliptic PDE, they obtained a superconvergent rate for the scalar variable for all k ≥ 0. This HDG method has been extended to study the PDEs with a convection term by [23,24]. However, the superconvergent rate was lost when k = 0.…”

Section: Introductionmentioning

confidence: 99%

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A Superconvergent Ensemble HDG Method for Parameterized Convection Diffusion Equations

Chen¹,

Pi²,

Xu³

et al. 2019

SIAM J. Numer. Anal.

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We devised a first order time stepping ensemble hybridizable discontinuous Galerkin (HDG) method for a group of parameterized convection diffusion PDEs with different initial conditions, body forces, boundary conditions and coefficients in our earlier work [3]. We obtained an optimal convergence rate for the ensemble solutions in L ∞ (0, T ; L 2 (Ω)) on a simplex mesh; and obtained a superconvergent rate for the ensemble solutions in L 2 (0, T ; L 2 (Ω)) after an elementby-element postprocessing if polynomials degree k ≥ 1 and the coefficients of the PDEs are independent of time. In this work, we propose a new second order time stepping ensemble HDG method to revisit the problem. We obtain a superconvergent rate for the ensemble solutions in L ∞ (0, T ; L 2 (Ω)) without an element-by-element postprocessing for all polynomials degree k ≥ 0. Furthermore, our mesh can be any polyhedron, no need to be simplex; and the coefficients of the PDEs can dependent on time. Finally, we present numerical experiments to confirm our theoretical results.

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Section: The Ensemble Hdg Formulationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

A Superconvergent Ensemble HDG Method for Parameterized Convection Diffusion Equations

Chen¹,

Pi²,

Xu³

et al. 2019

SIAM J. Numer. Anal.

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show abstract

“…First, we would like to recall an important inequality which was introduced in [26]. Here we write it in a slightly general way.…”

Section: Preliminary Estimatesmentioning

confidence: 99%

“…For the proof of the above result, we refer the Lemma 3.2 in [26]. In addition, we also need the following basic inequalities:…”

Section: Preliminary Estimatesmentioning

confidence: 99%

A superconvergent HDG method for the incompressible Navier–Stokes equations on general polyhedral meshes

Qiu

Shi

2016

IMA J Numer Anal

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Abstract. We present a superconvergent hybridizable discontinuous Galerkin (HDG) method for the steady-state incompressible Navier-Stokes equations on general polyhedral meshes. For arbitrary conforming polyhedral mesh, we use polynomials of degree k + 1, k, k to approximate the velocity, velocity gradient and pressure, respectively. In contrast, we only use polynomials of degree k to approximate the numerical trace of the velocity on the interfaces. Since the numerical trace of the velocity field is the only globally coupled unknown, this scheme allows a very efficient implementation of the method. For the stationary case, and under the usual smallness condition for the source term, we prove that the method is well defined and that the global L 2 -norm of the error in each of the above-mentioned variables and the discrete H 1 -norm of the error in the velocity converge with the order of k + 1 for k ≥ 0. We also show that for k ≥ 1, the global L 2 -norm of the error in velocity converges with the order of k + 2. From the point of view of degrees of freedom of the globally coupled unknown: numerical trace, this method achieves optimal convergence for all the above-mentioned variables in L 2 -norm for k ≥ 0, superconvergence for the velocity in the discrete H 1 -norm without postprocessing for k ≥ 0, and superconvergence for the velocity in L 2 -norm without postprocessing for k ≥ 1.

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Static Condensation, Hybridization, and the Devising of the HDG Methods

Cockburn

2016

Lecture Notes in Computational Science and Engineering

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An HDG Method for Convection Diffusion Equation

Cited by 55 publications

References 13 publications

A Superconvergent Ensemble HDG Method for Parameterized Convection Diffusion Equations

A Superconvergent Ensemble HDG Method for Parameterized Convection Diffusion Equations

A superconvergent HDG method for the incompressible Navier–Stokes equations on general polyhedral meshes

Static Condensation, Hybridization, and the Devising of the HDG Methods

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