Abstract

Keywords

Direct Discontinuous Galerkin Methods, Global Projection, Error Estimates, The Upwind-Biased Fluxes

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1. Introduction

The discontinuous Galerkin (DG) method was first proposed by Reed and Hill [1] to solve the neutron problems in 1973. With the development of DG, the direct discontinuous Galerkin (DDG) method [2] was proposed by Liu to solve the second order partial differential equations. The main idea of DDG is to direct force solve the higher order equation so as to avoid the reduction of the equation.

For the error analysis of DDG, we first got the linear result of the error estimates can reach to order k in [3]. In [4], a series of special precision analyses were made for the numerical solution by using Fourier transform. The error estimates obtained by Liu can reach to order $k+1$ for the linear and nonlinear convection diffusion equations by using the DDG method in [5]. In 2016, Cao [6] discussed the superconvergence of DDG method and obtained that the projection superconvergence at some points can achieve order $k+2$ .

In this article, we use first order numerical fluxes to the diffusion term and use the upwind-biased fluxes to the convective term. The upwind-biased fluxes was first proposed by Meng and Shu, they proved that the optimal error estimates of the linear hyperbolic conservation equations can obtain order $k+1$ in semi-discrete and fully-discrete scheme in 2016 [7]. Meng extended the upwind-biased fluxes to the generalized alternating fluxes in [8].

The main content of this paper: In Section 2, we introduce the semi-discrete scheme of second-order partial differential equation and solve the error estimates problems by using the upwind-biased fluxes and first order numerical fluxes. In Section 3, we use the third-order RK time discretization methods for completing numerical experiments and obtain that the error estimates can reach order $k+1$ .

2. The Method of DDG

This paper considers the following convection diffusion equation

$\begin{array}{l}{u}_t+u_x=u_{xx},(x,t)\in [0,2\pi ]\times (0,T],\hfill \\ u(x,0)=u_0(x),x\in R.\hfill \end{array}$ (1)

For the convenience, we take the periodic boundary condition $u(0,t)=u(2\pi ,t)$ into discussion.

2.1. The Meshes of DDG

Let us denote the computational interval $I=[0,2\pi ]$ , consisting of cells $I_j=(x_{j-1/2},x_{j+1/2})$ , where $0=x_{1/2}<x_{3/2}<\cdots <x_{N+1/2}=2\pi$ .

We define $x_j=(x_{j-1/2}+x_{j+1/2})/2$ and $h=x_{j+1/2}-x_{j-1/2}$ , and then use $x_{j+1/2}^{-}$ and $x_{j+1/2}^{+}$ to denote the left and right limits at the discontinuity point. In what follows, we define $[x]=x^{+}-x^{-}$ and $\left\{x\right\}=(x^{+}+x^{-})/2$ . The following piecewise polynomials space is chosen as the finite element space

$V_h\equiv V_h^k=\{v\in L^2(I):v{\mid }_{I_j}\in P^k(I_j),j=1,\cdots ,N\},$

where $P^k(I_j)$ denotes the polynomials of degree up to $k\ge 0$ defined on cell $I_j$ .

2.2. Function Spaces and Norms

Define the broken Sobolev spaces as

$W^{l,p}(I_h)=\{u\in L^2(I):u{\mid }_{I_j}\in W^{l,p}(I_j),j=1,\cdots ,N\}$

The norms of the broken Sobolev spaces with $p=2,\infty$ are given by: ${\Vert u\Vert }_{W^{l,2}(I_j)}={\Vert u\Vert }_{H^l(I_j)}={({\displaystyle \underset{j=1}{\overset{N}{\sum }}{\Vert u\Vert }_{H^l(I_j)}^2})}^{\frac{1}{2}}$ and ${\Vert u\Vert }_{W^{l,\infty }(I_j)}=\underset{1\le j\le N}{\max }{\Vert u\Vert }_{W^{l,\infty }(I_j)}$ .

In the case $l=0$ , we have ${\Vert u\Vert }_{L^2(I_j)}={\Vert u\Vert }_{H^0\left(I_j\right)}$ .

2.3. The Semi-Discrete DDG Scheme

The DDG scheme is defined as follows: find both $u_h$ and $v_h$ in $V_h^k$ , by integration by parts and need some interface corrections, the Equations (1) can be written as

$\begin{array}{l}{\displaystyle {\int }_{I_j}{\left(u_h\right)}_t}{v}_{h}dx+{\widehat{u_h}{v}_h|}_{j+\frac{1}{2}}-{\widehat{u_h}{v}_h|}_{j-\frac{1}{2}}-{\displaystyle {\int }_{I_j}{u}_h}{\left(v_h\right)}_{x}dx-{{\left(u_h\right)}_x{v}_h|}_{j+\frac{1}{2}}\hfill \\ +{{\left(u_h\right)}_x{v}_h|}_{j-\frac{1}{2}}+{\displaystyle {\int }_{I_j}{\left(u_h\right)}_x}{\left(v_h\right)}_{x}dx+{\frac{1}{2}\left[u_h\right]{\left(v_x\right)}^{-}|}_{j+\frac{1}{2}}+{\frac{1}{2}\left[u_h\right]{\left(v_x\right)}^{+}|}_{j-\frac{1}{2}}=0,\hfill \\ {\displaystyle {\int }_{I_j}{u}_h}(x,0)v_{h}dx={\displaystyle {\int }_{I_j}{u}_0}{v}_{h}dx,\hfill \end{array}$ (2)

Summing j we have

$\begin{array}{l}{\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{\left(u_h\right)}_t}}{v}_{h}dx+{\displaystyle \underset{j=1}{\overset{N}{\sum }}\left(-{\displaystyle {\int }_{I_j}{u}_h}{\left(v_h\right)}_{x}dx+{\displaystyle {\int }_{I_j}{\left(u_h\right)}_x}{\left(v_h\right)}_{x}dx\right)}\hfill \\ +{\displaystyle \underset{j=1}{\overset{N}{\sum }}((-\widehat{u_h}+\left(\widehat{{u_h)}_x}\right)\left[v_h\right]+{\left({\widehat{v_h)}}_x\left[u_h\right]\right)}_{j+1/2}=0.}\hfill \end{array}$ (3)

Here $\widehat{u_h}$ is the upwind-biased fluxes as: $\widehat{u_h}=u_h^{\theta }=\theta u_h^{-}+(1-\theta )u_h^{+}$ , where $\theta >\frac{1}{2}$ .

Following [2] we take

$\widehat{{(u_h)}_x}=\frac{{\beta }_0}{h}[u_h]+\left\{{(u_h)}_x\right\}+{\beta }_{1}h\left[{(u_h)}_{xx}\right]$ , $\widehat{{(v_h)}_x}=\left\{{(v_h)}_x\right\}$ .

We define two operators

$A(u_h,v_h)={\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{(u_h)}_x}}{(v_h)}_{x}dx+{\displaystyle \underset{j=1}{\overset{N}{\sum }}{\left(\widehat{{(u_h)}_x}[v_h]+[u_h]\left\{{(v_h)}_x\right\}\right)}_{j+\frac{1}{2}}},$ (4)

$F(u_h,v_h)={\displaystyle \underset{j=1}{\overset{N}{\sum }}{u}_h}{(v_h)}_{x}dx+{({\displaystyle \underset{j=1}{\overset{N}{\sum }}\widehat{u_h}}[v_h])}_{j+\frac{1}{2}}.$ (5)

So the Equation (3) can be written as

$\langle {(u_h)}_t,v_h\rangle +A(u_h,v_h)=F(u_h,v_h),\forall v_h\in V_h^k.$ (6)

We define energy norm and introduce a quantity

${\Vert v\Vert }_E^2={\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{\left|v_x\right|}^2}}dx+{\displaystyle \underset{j=1}{\overset{N}{\sum }}\frac{{\beta }_0}{h}}{[v]}_{j+\frac{1}{2}}^2,v\in V_h^k,$ (7)

$\Gamma \left({\beta }_1\right)=\underset{v\in P^{k-1}[-1,1]}{\sup }\frac{{\left(v(1)-2{\beta }_1{\partial }_{\xi }v(1)\right)}^2}{f_{-1}^1{v}^2(\xi )d\xi },$ (8)

where $\xi =2\left(x-x_j\right)/h$ and $\frac{{\displaystyle {\int }_{u^{-}}^{u^{+}}f}(u)du}{[u]}=f_{u^{-}}^{u^{+}}udu$ .

According to [3] there exists $\gamma \in (0,1)$ such that

$A(v,v)\ge \gamma {\Vert v\Vert }_E^2,\forall v\in V_h^k,$ (9)

and ${\beta }_0>\Gamma \left({\beta }_1\right)$ .

Lemma 1 For a quadratic entropy flux, it holds that

$F(u_h,u_h)\le 0.$ (10)

Proof

A quadratic entropy flux satisfies [9]

${\displaystyle {\int }_{u^{-}}^{u^{+}}\left(\hat{f}\left(u^{+},u^{-}\right)-f(u)\right)du}=\left(\hat{f}\left(u^{+},u^{-}\right)-\frac{{\displaystyle {\int }_{u^{-}}^{u^{+}}f}(u)du}{[u]}\right)[u]\le 0,$ (11)

Firstly we figure out that ${\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{u}_h{(u_h)}_x}}dx=-{\displaystyle \underset{j=1}{\overset{N}{\sum }}{\left((f_{u^{-}}^{u^{+}}{u}_{h}d{u}_h)[u_h]\right)}_{j+1/2}}$ . Then using Equation (11) we get

$\begin{array}{l}F(u_h,u_h)={\displaystyle \underset{j=1}{\overset{N}{\sum }}{\left(\widehat{u_h}[u_h]\right)}_{j+1/2}}-{\displaystyle \underset{j=1}{\overset{N}{\sum }}{\left((f_{u^{-}}^{u^{+}}{u}_{h}d{u}_h)[u_h]\right)}_{j+1/2}}\\ =-{\displaystyle \underset{j=1}{\overset{N}{\sum }}\left(\widehat{u_h}-\frac{{\displaystyle {\int }_{u^{-}}^{u^{+}}{u}_h}d{u}_h}{[u_h]}\right){[u_h]}_{j+1/2}}\le 0.\end{array}$

2.4. The Stability of DDG

Theorem 1 Consider the semi-discrete of DDG, it satisfies the following properties:

1) Conservation of mass: ${\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{u}_h}}(t,x)dx={\displaystyle {\int }_I{u}_0}(x)dx,\forall t>0$ .

2) There exists $\gamma \in (0,1)$ such that

$\frac{d}{dt}{\Vert u_h\Vert }^2\le -2\gamma {\Vert u_h\Vert }_E^2\le 0$ (12)

3) The scheme is $L^2$ stable: ${\Vert u_h\Vert }^2\le {\displaystyle {\int }_I{u}_0^2}dx,\forall t>0$ .

Proof

1) Taking $v_h=1$ into Equation (6) we have $\frac{d}{dt}{\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{u}_h}}dx=0$ . Combining with Equation (2) with $v_h=1$ leads to the mass conservation.

2) Taking $v_h=u_h$ into Equation (6), we obtain

$\frac{1}{2}\frac{d}{dt}{\Vert u_h\Vert }^2+A(u_h,u_h)=F(u_h,u_h).$

According Equation (9) and combining with Lemma 1 together prove the Equation (12).

3) It follows from Equations (12) and (2) that

${\Vert u_h\Vert }^2\le {\Vert u_h(x,0)\Vert }^2={\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{u}_h^2}}(x,0)dx\le {\displaystyle \underset{j=1}{\overset{N}{\sum }}{\displaystyle {\int }_{I_j}{u}_0^2}}dx$ .

2.5. The Global Projections

For the DDG method using the upwind-biased fluxes, we need to construct a globally projection P. For $u\in H^1(I)$ , the projection P is defined as

(13)

with.

We quote the lemma as follows [5]

Lemma 2 For and, the projection P holds that

(14)

where C is independent of h and depends on.

2.6. The Error Estimates of DDG

Theorem 1 Assume that u are the exact solutions, we take the upwind-baised fluxes and the finite element space, there hold the following error estimates

(15)

where C is independent of h and depends on.

Proof

Firstly we set

Since both the exact and numerical solutions satisfy the weak solution form, we have

(16)

For the left side we use to obtain

(17)

And for the right side using the definition of projection we have

(18)

Thus, we get

(19)

Summing and to obtain

(20)

According Equation (13) the highest order is. We have. And by the properties of projection we obtain

.

So the right side of Equation (16) can be written as

. (21)

Combining Equation (17), Equation (21) and Lemma 2, we have

(22)

Finally by using the Gronwall inequality, we obtain Theorem 1.

3. Numerical Experiments

We present numerical experiments to validate the error estimates of DDG method based on upwind-biased fluxes. We adopt elements on the uniform mesh, with. In order to reduce time errors, we use the third order Runge-Kutta method and compute until.

For time discretization, we use TVD type third-order Runge-Kutta method [10]

Consider the equation

The exact solution of the equation is.

Table 1 shows that the error estimates of the convection diffusion equation by using the DDG method and the upwind-biased fluxes can reach to the order, With the coefficients changes, the results change together, so we can choose the best error results.

4. Conclusion

Based on the idea of DDG method and the upwind-biased fluxes, this paper proves the stability of numerical solutions and the error estimates of convection diffusion equation can reach to the order. Numerical experiments show that the scheme is stability and the error estimates is accurate.

Conflicts of Interest

The authors declare no conflicts of interest regarding the publication of this paper.

References