圣维南与布西奈克的通信。1:浅水方程的诞生

IF 1 4区 工程技术 Q4 MECHANICS Comptes Rendus Mecanique Pub Date : 2019-09-01 DOI:10.1016/j.crme.2019.08.004
Willi H. Hager , Oscar Castro-Orgaz , Kolumban Hutter
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引用次数: 8

摘要

浅水方程(SWEs),也被称为de Saint-Venant方程,构成了目前控制自由地表水流的数学工具。这些包括,例如,河流和城市地区的洪水流量,通过水坝或废水设施等水利结构的流量,环境领域、冰川学或气象学的流量。尽管有这样的吸引力,两个偏微分方程的系统只有一个精确的数学解的数量有限的实际相关的问题。这项关于swe的历史研究是基于19世纪两位科学家——德·圣维南和布西内克之间的通信。因此,从他们的理论发展的角度来评论他们的著名论文;两位科学家的作品证明了他们的投入,他们相互之间的评论导致了众所周知的SWEs。考虑到两人年龄相差45岁,经验丰富的工程师圣维南和数学家布西奈克这两位杰出的研究人员不仅讨论了水力学的问题,而且讨论了物理学的一般问题。此外,他们的通信还涉及伦理、宗教、科学史和个人新闻等问题。如果流线曲率效应占主导地位,则SWEs的结果不再成立;这包括破碎波、孤立波和余弦波,或一般的非线性波。然而,在大多数其他情况下,SWEs完全适用于工程实践中的典型流动;它们被认为是描述明渠流动的基本方程组。因此,本工作提供了其诞生的背景,包括许多关于其改进,物理意义,解决方法的评论,以及对结果的讨论。本文还讨论了定常流动方程,对《通信》中提到的主要人物作了简短的介绍,并概述了ses在1920年以前的进一步发展。
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Correspondence between de Saint-Venant and Boussinesq. 1: Birth of the Shallow–Water Equations

The Shallow–Water Equations (SWEs), also referred to as the de Saint-Venant equations, constitute the current governing mathematical tool for free-surface water flows. These include, e.g., flood flows in rivers and in urban zones, flows across hydraulic structures as dams or wastewater facilities, flows in the environmental fields, glaciology, or meteorology. Despite this attractiveness, the system of two partial differential equations has an exact mathematical solution only for a limited number of problems of practical relevance.

This historical work on the SWEs is based on a correspondence between two 19th-century scientists, de Saint-Venant and Boussinesq. Their well-known papers are thus commented from the point of development of their theory; the input of both scientists is evidenced by their writings, and comments of both to each other that led to what is commonly known as the SWEs. Given the age difference of the two of 45 years, the experienced engineer de Saint-Venant, and the mathematician Boussinesq, two eminent researchers, met to discuss not only problems in hydraulics, but in physics generally. In addition, their correspondence embraced also questions in ethics, religion, history of sciences, and personal news.

The results of the SWEs cease to hold if streamline curvature effects dominate; this includes breaking waves, solitary and cnoidal waves, or non-linear waves in general. In most other cases, however, the SWEs perfectly apply to typical flows in engineering practice; they are considered the fundamental system of equations describing open channel flows. This work thus provides a background to its birth, including lots of comments as to its improvement, physical meanings, methods of solution, and a discussion of the results. This paper also deals with the steady flow equations, gives a short account on the main persons mentioned in the Correspondence, and provides a summary of further developments of the SWEs until 1920.

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来源期刊
Comptes Rendus Mecanique
Comptes Rendus Mecanique 物理-力学
CiteScore
1.40
自引率
0.00%
发文量
0
审稿时长
12 months
期刊介绍: The Comptes rendus - Mécanique cover all fields of the discipline: Logic, Combinatorics, Number Theory, Group Theory, Mathematical Analysis, (Partial) Differential Equations, Geometry, Topology, Dynamical systems, Mathematical Physics, Mathematical Problems in Mechanics, Signal Theory, Mathematical Economics, … The journal publishes original and high-quality research articles. These can be in either in English or in French, with an abstract in both languages. An abridged version of the main text in the second language may also be included.
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