稀薄气体的数学理论(影印版) pdf epub mobi txt 电子书 下载 2024

图书介绍


稀薄气体的数学理论(影印版)

简体网页||繁体网页
[意] 切尔奇纳尼 等 著



点击这里下载
    


想要找书就要到 静流书站
立刻按 ctrl+D收藏本页
你会得到大惊喜!!

发表于2024-11-06

类似图书 点击查看全场最低价

出版社: 高等教育出版社
ISBN:9787040255355
版次:1
商品编码:10635138
包装:平装
丛书名: 天元基金影印数学丛书
开本:16开
出版时间:2009-02-01
用纸:胶版纸
页数:317
字数:430000
正文语种:英文

稀薄气体的数学理论(影印版) epub 下载 mobi 下载 pdf 下载 txt 电子书 下载 2024

相关图书



稀薄气体的数学理论(影印版) epub 下载 mobi 下载 pdf 下载 txt 电子书 下载 2024

稀薄气体的数学理论(影印版) pdf epub mobi txt 电子书 下载



具体描述

内容简介

   《稀薄气体的数学理论(影印版)》讲述了稀薄气体的数学理论(Boltzmann方程的数学理论)中的三个主要问题直到1994年的理论发展,包括BoItzmann方程是怎样从经典力学推出来的,即BoItzmann方程是怎样从Liouville方程推出来的;Boltzmann方程解的存在性问题;Boltzmann方程与流体力学的关系,即EuIer方程和Navier-Stokes方程是怎样从Liouville方程推出来的。另外,《稀薄气体的数学理论(影印版)》还介绍了O.LanfordⅢ,DiPerna,P.L.Lions等的出色工作,可作为BOItzmann方程的数学理论的优秀的教材和参考书。

内页插图

目录

Introduction
1 Historical Introduction
1.1 What is a Gas? From the Billiard Table to Boyles Law
1.2 Brief History of Kinetic Theory
2 Informal Derivation of the Boltzmann Equation
2.1 The Phase Space and the Liouville Equation
2.2 Boltzmanns Argument in a Modern Perspective
2.3 Molecular Chaos. Critique and Justification
2.4 The BBGKY Hierarchy
2.5 The Boltzmann Hierarchy and Its Relation to the Boltzmann Equation
3 Elementary Properties of the Solutions
3.1 Collision Invariants 33
3.2 The Boltzmann Inequality and the Maxwell Distributions
3.3 The Macroscopic Balance Equations
3.4 The H-Theorem
3.5 Loschmidts Paradox
3.6 Poincares Recurrence and Zermelos Paradox
3.7 Equilibrium States and Maxwellian Distributions
3.8 Hydrodynamical Limit and Other Scalings
4 Rigorous Validity of the Boltzmann Equation
4.1 Significance of the Problem
4.2 Hard-Sphere Dynamics
4.3 Transition to L1. The Liouville Equation and the BBGKY Hierarchy Revisited
4.4 Rigorous Validity of the Boltzmann Equation
4.5 Validity of the Boltzmann Equation for a Rare Cloud of Gas in the Vacuum
4.6 Interpretation
4.7 The Emergence of Irreversibility
4.8 More on the Boltzmann Hierarchy
Appendix 4.A More about Hard-Sphere Dynamics
Appendix 4.B A Rigorous Derivation of the BBGKY Hierarchy
Appendix 4.C Uchiyamas Example
5 Existence and Uniqueness Results
5.1 Preliminary Remarks
5.2 Existence from Validity, and Overview
5.3 A General Global Existence Result
5.4 Generalizations and Other Remarks
Appendix 5.A
6 The Initial Value Problem for the Homogeneous Boltzmann Equation
6.1 An Existence Theorem for a Modified Equation
6.2 Removing the Cutoff: The L1-Theory for the Full Equation
6.3 The L∞-Theory and Classical Solutions
6.4 Long Time Behavior
6.5 Further Developments and Comments
Appendix 6.A
Appendix 6.B
Appendix 6.C
7 Perturbations of Equilibria and Space Homogeneous Solutions
7.1 The Linearized Collision Operator
7.2 The Basic Properties of the Linearized Collision Operator
7.3 Spectral Properties of the Fourier-Transformed, Linearized Boltzmann Equation
7.4 The Asymptotic Behavior of the Solution of the Cauchy Problem for the Linearized Boltzmann Equation
7.5 The Global Existence Theorem for the Nonlinear Equation
7.6 Extensions: The Periodic Case and Problems in One and Two Dimensions
7.7 A Further Extension: Solutions Close to a Space Homogeneous Solution
8 Boundary Conditions
8.1 Introduction
8.2 The Scattering Kernel
8.3 The Accommodation Coefficients
8.4 Mathematical Models
8.5 A Remarkable Inequality
9 Existence Results for Initial-Boundary and Boundary Value Problems
9.1 Preliminary Remarks
9.2 Results on the Traces
9.3 Properties of the Free-Streaming Operator
9.4 Existence in a Vessel with Isothermal Boundary
9.5 Rigorous Proof of the Approach to Equilibrium
9.6 Perturbations of Equilibria
9.7 A Steady Problem
9.8 Stability of the Steady Flow Past an Obstacle
9.9 Concluding Remarks
10 Particle Simulation of the Boltzmann Equation
10.1 Rationale amd Overview
10.2 Low Discrepancy Methods
10.3 Birds Scheme
11 Hydrodynamical Limits
11.1 A Formal Discussion
11.2 The Hilbert Expansion
11.3 The Entropy Approach to the Hydrodynamical Limit
11.4 The Hydrodynamical Limit for Short Times
11.5 Other Scalings and the Incompressible Navier-Stokes Equations
12 Open Problems and New Directions
Author Index
Subject Index

精彩书摘

As early as 1738 Daniel Bernoulli advanced the idea that gases are formedof elastic molecules rushing hither and thither at large speeds, colliding andrebounding according to the laws of elementary mechanics. Of course, thiswas not a completely new idea, because several Greek philosophers assertedthat the molecules of all bodies are in motion even when the body itselfappears to be at rest. The new idea was that the mechanical effect of theimpact of these moving molecules when they strike against a solid is whatis commonly called the pressure of the gas. In fact if we were guided solelyby the atomic hypothesis, we might suppose that the pressure would beproduced by the repulsions of the molecules. Although Bernoullis schemewas able to account for the elementary properties of gases (compressibility,tendency to expand, rise of temperature in a compression and fall in anexpansion, trend toward uniformity), no definite opinion could be passedon it until it was investigated quantitatively. The actual development of thekinetic theory of gases was, accordingly, accomplished much later, in thenineteenth century.

前言/序言

为了更好地借鉴国外数学教育与研究的成功经验,促进我国数学教育与研究事业的发展,提高高等学校数学教育教学质量,本着“为我国热爱数学的青年创造一个较好的学习数学的环境”这一宗旨,天元基金赞助出版“天元基金影印数学丛书”。
该丛书主要包含国外反映近代数学发展的纯数学与应用数学方面的优秀书籍,天元基金邀请国内各个方向的知名数学家参与选题的工作,经专家遴选、推荐,由高等教育出版社影印出版。为了提高我国数学研究生教学的水平,暂把选书的目标确定在研究生教材上。当然,有的书也可作为高年级本科生教材或参考书,有的书则介于研究生教材与专著之间。
欢迎各方专家、读者对本丛书的选题、印刷、销售等工作提出批评和建议。
稀薄气体的数学理论(影印版) 电子书 下载 mobi epub pdf txt

稀薄气体的数学理论(影印版) pdf epub mobi txt 电子书 下载
想要找书就要到 静流书站
立刻按 ctrl+D收藏本页
你会得到大惊喜!!

用户评价

评分

基本介绍网页上都有

评分

好书

评分

《稀薄气体的数学理论(影印版)》讲述了稀薄气体的数学理论(Boltzmann方程的数学理论)中的三个主要问题直到1994年的理论发展,包括BoItzmann方程是怎样从经典力学推出来的,即BoItzmann方程是怎样从Liouville方程推出来的;Boltzmann方程解的存在性和唯一性问题;Boltzmann方程与流体力学的关系,即EuIer方程和Navier-Stokes方程是怎样从Liouville方程推出来的。另外,《稀薄气体的数学理论(影印版)》还介绍了O.LanfordⅢ,DiPerna,P.L.Lions等的出色工作,可作为BOItzmann方程的数学理论的优秀的教材和参考书。

评分

《稀薄气体的数学理论(影印版)》讲述了稀薄气体的数学理论(Boltzmann方程的数学理论)中的三个主要问题直到1994年的理论发展,包括BoItzmann方程是怎样从经典力学推出来的,即BoItzmann方程是怎样从Liouville方程推出来的;Boltzmann方程解的存在性和唯一性问题;Boltzmann方程与流体力学的关系,即EuIer方程和Navier-Stokes方程是怎样从Liouville方程推出来的。另外,《稀薄气体的数学理论(影印版)》还介绍了O.LanfordⅢ,DiPerna,P.L.Lions等的出色工作,可作为BOItzmann方程的数学理论的优秀的教材和参考书。

评分

基本介绍网页上都有

评分

好书

评分

很好的专业书很好的专业书

评分

做这方面研究的值得入一本

评分

做这方面研究的值得入一本

类似图书 点击查看全场最低价

稀薄气体的数学理论(影印版) pdf epub mobi txt 电子书 下载


分享链接


去京东购买 去京东购买
去淘宝购买 去淘宝购买
去当当购买 去当当购买
去拼多多购买 去拼多多购买


稀薄气体的数学理论(影印版) bar code 下载
扫码下载










相关图书




本站所有内容均为互联网搜索引擎提供的公开搜索信息,本站不存储任何数据与内容,任何内容与数据均与本站无关,如有需要请联系相关搜索引擎包括但不限于百度google,bing,sogou

友情链接

© 2024 windowsfront.com All Rights Reserved. 静流书站 版权所有