作者:(俄罗斯)弗拉基米尔·科诺普列夫
页数:252
出版社:哈尔滨工业大学出版社
出版日期:2021
ISBN:9787560397108
电子书格式:pdf/epub/txt
内容简介
本书是一部英文版的物理学专著,本书的独特之处在于,在不考虑“分析”力学离散性,以及局部连续介质中转动和颗粒的形变存在的条件下,着重于研究伽利略力学的发展基础.伽利略力学字宙的主要性质被表述为六维二重矢量测度(旋量)的密度平衡公理,这给出了伽利略力学主要的新框架,即广义伽利略群的几何。
目录
Preface
1 Introduction
2 The geometrical universe of mechanics and its primary properties.
2.1 Axioms of kinematics
2.2 Axioms of dynamics
2.3 Generalized Galtlean group on mechanics universe
2.4 Secondary properties of geometric universeof mechanics
2.4.1 Dynamics homogeneity and lsotropy of geometric universe of mechanics
2.4.2 Equations of motion of locally changeable continuous medium
2.4.3 Equation of balance of inertial mass for locally changeable continuous medium
2.4.4 Equations of energy balance for locally changeable continuous medium
3 Kinematics of locally linearly changeable medium
3.1 Kinematics equation on k-deformator group
3.2 Deformation matrix and its relation with medium displacement and with k-deformator
3.3 Generatricesofk-deformatorgroup
3.4 Transvective-dllation decomposition of k-deformators
3.4.1 Transvectlons, dilations, dilators and homothettes
3.4.2 Transvection-dflatlon decompositions of k-deformator group by Cavaliert group
3.4.3 Transvection-dflatlon decompositions of k-deformator group by Cavalterl generalized group
3.5 Polar decomposition of k-deformator group
3.5.1 Right-hand polar decomposition of k-deformator group
3.5.2 Kinematics equations on the groups □(数理化公式) and □(数理化公式)
3.5.3 Left-hand polar decomposition of k-deformator group
3.5.4 Non-circular (potential) deformation of medium
3.6 Additive decompositions of medium point velocities
3.6.1 Transvective-dilation decomposition
3.6.2 Polar decompositions
3.6.3 Geometrical incompressibility of medium
4 Elements of dynamics of locally changeable continuous medium
4.1 Dynamic and static equations of continuous media
4.2 Quasi-linear continuous media
4.3 Conditions for continuous medium entirety
4.4 Elements of dynamics of ideal fluid
4.4.1 Dynamic equations of ideal fluid
4.4.2 Equations of thermodynamics for ideal fluid
4.5 Elements of H-class dynamics
4.5.1 Dynamic equations of H-class of media
4.5.2 Thermodynamic equation
4.6 Elements of P-class dynamics
4.6.1 Group of rheologtcal coefficient matrices – P -media of II type
4.6.2 P12-class of quasi-linear continuous media
4.6.3 P13-class of quasi-linear continuous media
4.6.4 P23-class of quasi-linear continuous media
4.7 Elements of dynamics for quasi-linear continuous NPL-media
4.7,1 Equations of mechanical state and dynamics for NPL-medta
4.7.2 Thermodynamics equation
4.8 Elements of dynamics of R-class
4.8.1 Mechanical state equations
4.8.2 Dynamic equations
4.8.3 Thermodynamics equation
1 Introduction
2 The geometrical universe of mechanics and its primary properties.
2.1 Axioms of kinematics
2.2 Axioms of dynamics
2.3 Generalized Galtlean group on mechanics universe
2.4 Secondary properties of geometric universeof mechanics
2.4.1 Dynamics homogeneity and lsotropy of geometric universe of mechanics
2.4.2 Equations of motion of locally changeable continuous medium
2.4.3 Equation of balance of inertial mass for locally changeable continuous medium
2.4.4 Equations of energy balance for locally changeable continuous medium
3 Kinematics of locally linearly changeable medium
3.1 Kinematics equation on k-deformator group
3.2 Deformation matrix and its relation with medium displacement and with k-deformator
3.3 Generatricesofk-deformatorgroup
3.4 Transvective-dllation decomposition of k-deformators
3.4.1 Transvectlons, dilations, dilators and homothettes
3.4.2 Transvection-dflatlon decompositions of k-deformator group by Cavaliert group
3.4.3 Transvection-dflatlon decompositions of k-deformator group by Cavalterl generalized group
3.5 Polar decomposition of k-deformator group
3.5.1 Right-hand polar decomposition of k-deformator group
3.5.2 Kinematics equations on the groups □(数理化公式) and □(数理化公式)
3.5.3 Left-hand polar decomposition of k-deformator group
3.5.4 Non-circular (potential) deformation of medium
3.6 Additive decompositions of medium point velocities
3.6.1 Transvective-dilation decomposition
3.6.2 Polar decompositions
3.6.3 Geometrical incompressibility of medium
4 Elements of dynamics of locally changeable continuous medium
4.1 Dynamic and static equations of continuous media
4.2 Quasi-linear continuous media
4.3 Conditions for continuous medium entirety
4.4 Elements of dynamics of ideal fluid
4.4.1 Dynamic equations of ideal fluid
4.4.2 Equations of thermodynamics for ideal fluid
4.5 Elements of H-class dynamics
4.5.1 Dynamic equations of H-class of media
4.5.2 Thermodynamic equation
4.6 Elements of P-class dynamics
4.6.1 Group of rheologtcal coefficient matrices – P -media of II type
4.6.2 P12-class of quasi-linear continuous media
4.6.3 P13-class of quasi-linear continuous media
4.6.4 P23-class of quasi-linear continuous media
4.7 Elements of dynamics for quasi-linear continuous NPL-media
4.7,1 Equations of mechanical state and dynamics for NPL-medta
4.7.2 Thermodynamics equation
4.8 Elements of dynamics of R-class
4.8.1 Mechanical state equations
4.8.2 Dynamic equations
4.8.3 Thermodynamics equation
