Lect1 2016 Orientation eng - Université Paris-SaclayDefinitions • Symmetry: • From greak (sun)...
Transcript of Lect1 2016 Orientation eng - Université Paris-SaclayDefinitions • Symmetry: • From greak (sun)...
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symmetry
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symmetry
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LAVAL
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LAVAL
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ININI
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ININI
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ININI
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ININI
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b dp qDyslexia…
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β δ π θ
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Definitions
• Symmetry: • From greak (sun) ‘’with" (metron) "measure" • Same etymology as "commensurate" • Until mid-XIX: only mirror symmetry
• Transformation, Group • Évariste Galois 1811, 1832.
Symmetry:
Property of invariance of an objet under a
space transformation
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Transformation
• Bijection which maps a geometric set in itself
M f(M)=M’
• Affine transformation defined by P, P’ and O such that:
f(M) = P’ + O(PM)
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'''
P P’
f : positions O : vectors
P
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Affine transformation
• Translation: O identity
• Homothety: O(PM)=k.PM
• (also): Homothety in one direction
• Isometry: preserves distances
• Simililarity: preserves ratios
P
preserves lines, planes, parallelism
P’ P
P P
P P
P
P P
P
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Translation
• Infinite periodic lattices
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• Self-similar objects • Infinite fractals
Homothety
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Similitude
θ -> θ+θ’
θ’
r -> re-bθ’
e-bθ’
Infinite fractal Logarithmic spiral (r=aebθ)
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Isometries
• Isometry ||O(u)||=||u|| distance-preserving map
• Helix of pitch P
(α, Pα /2π)
• Translation • Rotations
• Reflections
E ? 60°
• Rotations • Reflections
f(M) = P’ + O(PM)
• Two types of isometry:
• Affine isometry: f(M) • Transforms points. • Microscopic properties of crystals (electronic structure)
• Linear isometry O(PM)
• Transforms vectors (directions) • Macroscopic properties of crystals (response functions)
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Linear isometry- 2D
• In the plane (2D) ||O(u)|| = ||u||
!!"
#$$%
& −
θθ
θθ
cossinsincos
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− θθ
θθ
cossinsincos
• Rotations • Reflections (reflections by an axis)
θ θ/2
• Determinant +1 • Eigenvalues eiθ, e-iθ • Determinant -1
• Eigenvalues -1, 1
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Linear isometry - 3D
θ θ
θ c) Inversion (π) d) Roto-inversion (π+θ ) c) Reflection (0)
• In space (3D) : • ||O(u)|| = |λ| ||u|| Eigenvalues |λ | = 1
• λ : 3rd degree equation (real coefficients)
±1, eiθ, e-iθ (det. = ± 1)
Rotations Rotoreflections
• det. = 1 • Direct symmetry
• det. = -1 • Indirect symmetry
a) Rotation by angle θ b) Roto-reflection θImproper rotation
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O
N
M
P
P
P’ P’
M’
S
N
Stereographic projection
• To represent directions preserves angles on the sphere
Direction OM
P, projection of OM : Intersection of SM and equator
• Conform transformation (preserves angles locally) but not affine
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Main symmetry operations
• Conventionally
• Rotations (An) • Reflections (M) • Inversion (C)
• Rotoinversion (An)
• Indirect • Rotoreflections (An) • Reflection (M) • Inversion (C) • Rotoinversions (An)
. . .
. . .
. . . .
. .
.
. .
A2 vertical A2 horizontal A3 A4 A5
.
M vertical
. .
Inversion
.
M horizontal M
. . . .
A4
.
• Direct • n-fold rotation An (2π/n) • Represented by a polygon of same symmetry.
~ _
_
• Symmetry element • Locus of invariant points
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Difficulties…
• Some symmetry are not intuitive
• Reflection (mirrors) • Rotoinversion
‘’The ambidextrous universe’’ Why do mirrors reverse left and right but not top and bottom
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Composition of symmetries • Two reflections with angle α = rotation 2α
Composition of two rotations = rotation
M’M=A M
M’ α
2α
AN1 AN2 AN3
π/N1 π/N2
AN2AN1=AN3
• Euler construction
• No relation between N1, N2 et N3
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Point group: definition
• The set of symmetries of an object forms a group G
• A and B ⊂ G, AB ⊂ G (closure) • Associativity (AB)C=A(BC) • Identity element E (1-fold rotation) • Invertibility A, A-1 • No commutativity in general (rotation 3D)
• Example: point groupe of a rectangular table (2mm)
* E Mx My A2
E E Mx My A2
Mx Mx E A2 MyMy My A2 E MxA2 A2 My Mx E
≠ 1
2 1
2
Mx
My A2
2mm • Multiplicity: number of elements
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Composition of rotations
AN1 AN2 AN3
π/N1 π/N2
Spherical triangle, angles verifies:
ππππ
>++321 NNN
1111
321>++
NNN
22N (N>2), 233, 234, 235 Dihedral groups Multiaxial groups
234
Constraints
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Points groups
• Sorted by Symmetry degree
• Curie‘s limit groups
• Chiral, propers
• Impropers
• Centrosymmetric
m3 43m m3m ∞ /m ∞/m
3 4 6=3/m 2=m 1
32 422 622 222 _ _ _ _ _
3 4 6 2 1
4/m 6/m 2/m
3m 4mm 6mm 2mm
3m 42m (4m2) _ _ _ 62m (6m2) _ _
4/ mmm 6/ mmm mmm
432 23 _ _ _
∞
∞ /m
∞ 2
∞ m
∞ /mm
∞ ∞
Triclin
ic
Mon
oclin
ic
Ort
horh
ombi
c
Trigon
al
Tetr
agon
al
Hex
agon
al
Cubi
c
Curie’s
grou
ps
...
A n A n’
A n
A n A 2
A n
A n /M
A n M
A n M
A n /MM’
A n A n’
_
_
_
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Multiaxial groups
23 432 532
m3 _
43m _
m3m _
53m _ _
Tétraèdre Octaèdre
Cube
Icosaèdre
Dodécaèdre
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Points group: Notations
• Schönflies : Cn, Dn, Dnh
• Hermann-Mauguin (International notation - 1935)
• Generators (not minimum)
• Symmetry directions • Reflection ( - ): defined by the normal to the plane
Primary Direction: higher-order symmetry
Secondary directions : lower-order
Tertiary directions : lowest-order
4 2 2 m m m
4 m m m Notation
réduite
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Les 7 groupes limites de Pierre Curie
∞ /m ∞ /m
∞ 2
∞ /m
∞ /mm
∞ ∞
∞
∞ m
Rotating cone
Twisted cylindre
Rotating cylinder
Cone
Cylindrer
Chiral sphere
Sphere
axial + polar vectors
Axial tensor order 2
axial vector (H)
Polar vector (E, F)
Polar tensor ordre 2 (susceptibility)
Axial scalar (chiralité)
Polar scalar (pression, masse)
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Definitions Symmetric: Invariant under at least two
transformations
Asymmetric: Invariant under one transformation. Dissymmetric: Lost of symmetry…