Symmetry, Structure, & Tensor Properties of Materials
by Prof. Bernhardt Wuensch
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Description
This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity.
| Name | Description | Released | Price | ||
|---|---|---|---|---|---|
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1 |
Lecture 01 part 1: Introduction to Crystallography | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
2 |
Lecture 01 part 2: Introduction to Crystallography | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
3 |
Lecture 02 part 1: Crystalline Structure and Geometry | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
4 |
Lecture 02 part 2: Crystalline Structure and Geometry | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
5 |
Lecture 03 part 1: Translation, Rotation, Periodicity | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
6 |
Lecture 03 part 2: Translation, Rotation, Periodicity | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
7 |
Lecture 04 part 1: 2D Symmetries | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
8 |
Lecture 04 part 2: 2D Symmetries | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
9 |
Lecture 05 part 1: 2D Plane Groups, Lattices | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
10 |
Lecture 05 part 2: 2D Plane Groups, Lattices | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
11 |
Lecture 06 part 1: 2D Plane Groups, Lattices (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
12 |
Lecture 06 part 2: 2D Plane Groups, Lattices (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
13 |
Lecture 07 part 1: 2D Plane Groups, Lattices (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
14 |
Lecture 07 part 2: 2D Plane Groups, Lattices (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
15 |
Lecture 08 part 1: Diffraction, 3D Symmetries | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
16 |
Lecture 08 part 2: Diffraction, 3D Symmetries | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
17 |
Lecture 10 part 1: 3D Symmetries, Point Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
18 |
Lecture 10 part 2: 3D Symmetries, Point Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
19 |
Lecture 11 part 1: Point Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
20 |
Lecture 11 part 2: Point Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
21 |
Lecture 12 part 1: 3D Lattices | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
22 |
Lecture 12 part 2: 3D Lattices | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
23 |
Lecture 13 part 1: Physical Properties of Crystal Structures | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
24 |
Lecture 13 part 2: Physical Properties of Crystal Structures | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
25 |
Lecture 14 part 1: Final Lecture on Symmetry: 3D Space Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
26 |
Lecture 14 part 2: Final Lecture on Symmetry: 3D Space Groups | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
27 |
Lecture 15 part 1: Space Group Notation; Tensors | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
28 |
Lecture 15 part 2: Space Group Notation; Tensors | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
29 |
Lecture 16 part 1: Tensors (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
30 |
Lecture 16 part 2: Tensors (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
31 |
Lecture 18 part 1: Tensors (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
32 |
Lecture 18 part 2: Tensors (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
33 |
Lecture 20 part 1: Representation Quadric | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
34 |
Lecture 20 part 2: Representation Quadric | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
35 |
Lecture 21 part 1: Stress and Strain Tensors | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
36 |
Lecture 21 part 2: Stress and Strain Tensors | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
37 |
Lecture 22 part 1: Sheer and Thermal Expansion Tensors | -- | 5/4/07 | Free | View In iTunes |
|
38 |
Lecture 22 part 2: Sheer and Thermal Expansion Tensors | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
39 |
Lecture 23 part 1: Piezoelectricity | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
40 |
Lecture 23 part 2: Piezoelectricity | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
41 |
Lecture 24 part 1: Piezoelectricity (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
42 |
Lecture 24 part 2: Piezoelectricity (cont.) | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
|
43 |
Lecture 26: 4th Rank Tensor Properties | This course covers the derivation of symmetry theory; lattices, point groups, space groups, and their properties; use of symmetry in tensor representation of crystal properties, including anisotropy and representation surfaces; and applications to piezoelectricity and elasticity. | 5/4/07 | Free | View In iTunes |
| Total: 43 Episodes |
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