Composite materials : mathematical theory and exact relations /
Grabovsky Yury
Composite materials : mathematical theory and exact relations / created by Yury Grabovsky - xiv, (irregular pagination): 25 cm
Includes a bibliography
Preface
1. Introduction
part I. Mathematical theory of composite materials. 2. Material properties and governing equations
2.1. Introduction
2.2. Conductivity and elasticity
2.3. Abstract Hilbert space framework
2.4. Boundary value problems
2.5. Geometry of local spaces. 3. Composite materials
3.1. Mathematical definition of a composite
3.2. Periodic composites
3.3. Properties of H-convergence. part II. General theory of exact relations and links
4. Exact relations
4.1. Introduction
4.2. L-relations
4.3. Sufficient conditions for stability under homogenization
4.4. Special types of exact relations
4.5. Proofs of theorems 4.8, 4.12, 4.11. 5. Links
5.1. Links as exact relations
5.2. Algebraic structure of links
5.3. Volume fraction formulas as links. 6. Computing exact relations and links
6.1. Finding Jordan A-multialgebras
6.2. Computing exact relations
6.3. Computing volume fraction relations
6.4. Finding Jordan A^-multialgebras
6.5. Computing links. part III. Case studies
7. Introduction. 8. Conductivity with the Hall effect
8.1. Two-dimensional conductivity with the Hall effect
8.2. Three-dimensional conductivity with the Hall effect
8.3. Fibrous conducting composites with the Hall effect. 9. Elasticity
9.1. Two-dimensional elasticity
9.2. Three-dimensional elasticity
9.3. Fibrous elastic composites. 10. Piezoelectricity
10.1. Exact relations
10.2. Links
10.3. Two-dimension-specific relations and links. 11. Thermoelasticity
11.1. Two-dimensional thermoelasticity
11.2. Three-dimensional thermoelasticity
12. Three-dimensional thermoelectricity. part IV. Appendices
A. E- and J -regularity for conductivity and elasticity
B.A polycrystalline L-relation that is not exact
C. Multiplication of SO(3) irreps in endomorphism algebras
The mathematical method of composites has reached a very high level of maturity and developments have increased our understanding of the relationship between the microstructure of composites and their macroscopic behaviour. This book provides a self-contained unified approach to the mathematical foundation of the theory of composites, leading to the general theory of exact relations. It also provides complete lists of exact relations in many specific physically relevant contexts, such as conductivity, fibre-reinforced elasticity, piezoelectricity, thermoelectricity and more
9780750310499
Composite materials
Materials science --Mathematics
Physics --Mathematical & Computational
Mathematical physics
Composites
TA418.9.C6 GRA
Composite materials : mathematical theory and exact relations / created by Yury Grabovsky - xiv, (irregular pagination): 25 cm
Includes a bibliography
Preface
1. Introduction
part I. Mathematical theory of composite materials. 2. Material properties and governing equations
2.1. Introduction
2.2. Conductivity and elasticity
2.3. Abstract Hilbert space framework
2.4. Boundary value problems
2.5. Geometry of local spaces. 3. Composite materials
3.1. Mathematical definition of a composite
3.2. Periodic composites
3.3. Properties of H-convergence. part II. General theory of exact relations and links
4. Exact relations
4.1. Introduction
4.2. L-relations
4.3. Sufficient conditions for stability under homogenization
4.4. Special types of exact relations
4.5. Proofs of theorems 4.8, 4.12, 4.11. 5. Links
5.1. Links as exact relations
5.2. Algebraic structure of links
5.3. Volume fraction formulas as links. 6. Computing exact relations and links
6.1. Finding Jordan A-multialgebras
6.2. Computing exact relations
6.3. Computing volume fraction relations
6.4. Finding Jordan A^-multialgebras
6.5. Computing links. part III. Case studies
7. Introduction. 8. Conductivity with the Hall effect
8.1. Two-dimensional conductivity with the Hall effect
8.2. Three-dimensional conductivity with the Hall effect
8.3. Fibrous conducting composites with the Hall effect. 9. Elasticity
9.1. Two-dimensional elasticity
9.2. Three-dimensional elasticity
9.3. Fibrous elastic composites. 10. Piezoelectricity
10.1. Exact relations
10.2. Links
10.3. Two-dimension-specific relations and links. 11. Thermoelasticity
11.1. Two-dimensional thermoelasticity
11.2. Three-dimensional thermoelasticity
12. Three-dimensional thermoelectricity. part IV. Appendices
A. E- and J -regularity for conductivity and elasticity
B.A polycrystalline L-relation that is not exact
C. Multiplication of SO(3) irreps in endomorphism algebras
The mathematical method of composites has reached a very high level of maturity and developments have increased our understanding of the relationship between the microstructure of composites and their macroscopic behaviour. This book provides a self-contained unified approach to the mathematical foundation of the theory of composites, leading to the general theory of exact relations. It also provides complete lists of exact relations in many specific physically relevant contexts, such as conductivity, fibre-reinforced elasticity, piezoelectricity, thermoelectricity and more
9780750310499
Composite materials
Materials science --Mathematics
Physics --Mathematical & Computational
Mathematical physics
Composites
TA418.9.C6 GRA