中心格式在Saint-Venant方程组上的应用研究

数学物理学报 ›› 2019, Vol. 39 ›› Issue (2): 372-385.

中心格式在Saint-Venant方程组上的应用研究

董建()

武汉大学数学与统计学院武汉 430072

收稿日期:2017-09-14 出版日期:2019-04-26 发布日期:2019-05-05
作者简介:董建, E-mail:j.dong@whu.edu.cn
基金资助:
国家自然科学基金(11001211);国家自然科学基金(11371023);国家重大研发计划(2016YFC0402207)

Research on the Application of Central Scheme in Saint-Venant System

Jian Dong()

School of Mathematics and Statistics, Wuhan University, Wuhan 430072

Received:2017-09-14 Online:2019-04-26 Published:2019-05-05
Supported by:
国家自然科学基金(11001211);国家自然科学基金(11371023);国家重大研发计划(2016YFC0402207)

摘要/Abstract

摘要：

浅水波方程组对于其数值格式有较高的要求.在实际应用中作者更关心在稳态解附近的行为，特别是当计算区域出现干湿界面的时候，不但要求格式具有和谐性，而且需要保持水深恒为非负，同时又要求数值格式具有较高的精度.设计同时满足这些性质的数值格式具有一定的难度.论文的核心是总结研究了受关注的求解浅水波方程组的中心格式：KP格式，BCKN格式和T格式的各自优势以及不足之处.该文通过求解一维问题来展示各自格式在一些算例上的应用.

关键词: Saint-Venant方程组, 有限体积法, 和谐性, 保正性

Abstract:

Shallow water wave equations have high requirements for their numerical schemes. In practical applications, we are more concerned with the behavior in the vicinity of the steady-state solution, especially when the dry and wet fronts occur in the computation area. In this case, not only the scheme is required to be well-balanced, but also the water depth needs to be kept non-negative, at the same time, the scheme is required with high resolution. Therefore, it is difficult to design a numerical scheme that is both well-balanced and positivity preserving. The core of the dissertation is to summarize and study the central schemes of the concerned shallow water wave equations:the KP scheme, the BCKN scheme and the T scheme. We investigate their advantages and disadvantages. We use the one-dimensional shallow water wave equations to show the applications of the each scheme to some examples.

Key words: Saint-Venant equations, Finite volume method, Well-Balanced, Positivity preserving

中图分类号:

O241.82

董建. 中心格式在Saint-Venant方程组上的应用研究[J]. 数学物理学报, 2019, 39(2): 372-385.

Jian Dong. Research on the Application of Central Scheme in Saint-Venant System[J]. Acta mathematica scientia,Series A, 2019, 39(2): 372-385.

图/表 15

图 2.1

图 3.1

图 3.2

图 4.1

图 4.2

图 5.1

图 5.2

图 5.3

图 5.4

图 5.5

图 5.6

图 5.7

图 5.8

图 5.9

图 5.10

参考文献 12

1	Kurganov A , Petrova G . A second-order well-balanced positivity preserving central-upwind scheme for the saint-venant system. Communications in Mathematical Sciences, 2007, 5 (1): 133- 160 doi: 10.4310/CMS.2007.v5.n1.a6
2	Bollermann A , Chen G , Kurganov A , Noelle S . A well-balanced reconstruction of wet/dry fronts for the shallow water equations. Journal of Scientific Computing, 2013, 56 (2): 267- 290 doi: 10.1007/s10915-012-9677-5
3	Touma R . Well-balanced central schemes for systems of shallow water equations with wet and dry states. Applied Mathematical Modelling, 2016, 40 (4): 2929- 2945 doi: 10.1016/j.apm.2015.09.073
4	Saint-Venant De . Théorie du mouvement non permanent des eaux, avec application auxcrues des riviéres et à l'introduction des marées dans leur lit. Comptes Rendus Hebdomadaires Des Séances De Lacadémie Des Sciences, 1871, 73 (99): 148- 154
5	Gallardo J M , Castro M , Parés C , González-Vida J M . On a well-balanced high-order finite volume scheme for the shallow water equations with bottom topography and dry areas. Journal of Computational Physics, 2007, 227 (1): 574- 601
6	Shi J . A Steady-State Capturing Method for Hyperbolic Systems with Geometrical Source Terms. New York: Springer, 2004
7	Bollermann A , Noelle S . Finite volume evolution galerkin methods for the shallow water equations with dry beds. Communications in Computational Physics, 2011, 10 (2): 371- 404 doi: 10.4208/cicp.220210.020710a
8	Kurganov A , Levy D . Central-upwind schemes for the saint-venant system. Esaim Mathematical Modelling Numerical Analysis, 2010, 36 (3): 397- 425
9	Perthame B , Simeoni C . A kinetic scheme for the saint-venant system with a source term. Calcolo, 2001, 38 (4): 201- 231
10	Mario Ricchiuto , Bollermann A . Stabilized residual distribution for shallow water simulations. Journal of Computational Physics, 2009, 228 (4): 1071- 1115 doi: 10.1016/j.jcp.2008.10.020
11	Noelle S , Pankratz N , Puppo G , Natvig J R . Well-balanced finite volume schemes of arbitrary order of accuracy for shallow water flows. Journal of Computational Physics, 2006, 213 (2): 474- 499
12	Xing Y , Shu C W . High order finite difference weno schemes with the exact conservation property for the shallow water equations. Journal of Computational Physics, 2005, 208 (1): 206- 227