Optical Activity Peter Hertel Roadmap Permittivity …Roadmap Permittivity No external elds External...

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Externalelectric field

Externalmagnetic field

Opticalactivity

Optical Activity

Peter Hertel

University of Osnabruck, Germany

Lecture presented at APS, Nankai University, China

http://www.home.uni-osnabrueck.de/phertel

October/November 2011

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

• No external fields

• External electric field

• External magnetic field

• Optical activity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Roadmap

• Permittivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

The electromagnetic field

• action on charged particles

p = q E + v ×B• Fourier transform fields

F (t,x) =

∫dω

(2π)3F (ω, q) e

−iωte

iq · x

• Maxwell’s equations with % = 0, j = 0, µ = 1

q × H = −ωε0εEq × E = ωµ0H

• note that E, H and permittivity ε are Fourier transformsand depend on (ω, q).

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

p = q E + v ×B

• Fourier transform fields

F (t,x) =

∫dω

(2π)3F (ω, q) e

−iωte

iq · x

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

F (t,x) =

∫dω

(2π)3F (ω, q) e

−iωte

iq · x

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

F (t,x) =

∫dω

(2π)3F (ω, q) e

−iωte

iq · x

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

F (t,x) =

∫dω

(2π)3F (ω, q) e

−iωte

iq · x

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

• most general causal linear relationship between electricalfield and polarization field

Pi(t,x) = ε0

∫ ∞0

∫d3ξ Gij(τ, ξ)Ej(t− τ,x− ξ)

• Fourier transform

Pi(ω, q) = ε0 χij(ω, q) Ej(ω, q)

• Di = ε0 Ei + Pi

• Di = ε0 εijEi

• εij(ω, q) = δij + χij(ω, q)

• in general, permittivity εij depends on angular frequency ωand wave vector q

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Permittivity

Pi(t,x) = ε0

∫ ∞0

• Di = ε0 εijEi

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• dispersion relation of photons is ω = cq/n

• dispersion relation of phonons is ω = vq

• where v is speed of sound

• acoustical and optical phonons

• photon and phonon dispersion relations intersect foroptical phonons

• v/c ≈ 0.01, q is small

• εij(ω, q) ≈ εij(ω, 0)

• normally, the permittivity depends on ω only

• Gij(τ, ξ) ≈ Gij(τ) δ3(ξ)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Local interaction

• εij(ω, q) ≈ εij(ω, 0)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

• Locality is built into the Drude model

• We investigate matter at location x = 0

• deviation of a charged particle from this position isx = x(t)

• equation of motion

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

• right hand side approximated by E(t, 0)

• electromagnetic waves are long

• involved wave vectors are small

• good so , because otherwise solving equation of motionby Fourier transforming it would be impossible

• at least difficult

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Drude model

m x(t) + Γx(t) + Ω2x(t) = q E(t,x(t))

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Isotropic and birefringent media

• no external electric or magnetic field

• Onsager: εij = εji

• negligible absorption: εij = ε∗ji• permittivity is a real symmetric tensor

• can be orthogonally diagonalzed

• optically isotropic : εij = n2δij

• optically uniaxial

εij =

n2o 0 00 n2o 00 0 n2e

• ordinary beam : e = cosαx+ sinαy and k = z

• extraordinary : k = cosαx+ sinαy and e = z

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

• negligible absorption: εij = ε∗ji

• permittivity is a real symmetric tensor

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

εij =

n2o 0 00 n2o 00 0 n2e

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Double refraction (birefringence) by calcite

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

• εij = n2ij +RijkEk• Rijk = Rjik

• such a tensor with three indexes not allowed for crystalswith inversion symmetry

• but for instance in lithium niobate (3m symmetry)

• Pockels effect causes additional birefringence . . .

• . . . which is proportional to the external field strength E• effect is fast (GHz), but requires large field strength

• therefore µm-optics (Integrated Optics)

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

• εij = n2ij +RijkEk

• Rijk = Rjik

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

• . . . which is proportional to the external field strength E

• effect is fast (GHz), but requires large field strength

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Pockels effect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

A commercial Pockels cell for modulating light

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

• εij = n2ij + iKεijkBk• rotation of polarization proportional to the magnetic

induction

• effect is non-reciprocal

• optical isolator for protecting lasers from their own light

• best with ferro- or ferri-magnetic media, likeyttrium iron garnet etc.

• goal: realize the optical isolator in µm-optics

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

• εij = n2ij + iKεijkBk

• rotation of polarization proportional to the magneticinduction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

induction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

induction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

induction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

induction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Faraday effect

induction

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

A commercial optical isolator

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

I found this in the internet when looking for optical activity.

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

• recall εij = εij(ω, q)

• Invariance with respect to time reversal:Gij(τ, ξ) = Gji(τ,−ξ)

• which implies εij(ω, q) = εji(ω,−q)

• if present, a magnetic field must be inverted as well

• recall that εij is also hermitian: εij = ε∗ji• up to first order in q:

• εij = n2ij + χoaijkqk

• χoaijk is purely imaginary and antisymmetric in the first two

indexes

• ∆εoaij = iεijkgk with gk = Gklql

• gyration vector gk depends linearly on the wave vector ql

• Gkl is a rank 2 pseudo-tensor

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

• recall that εij is also hermitian: εij = ε∗ji

• up to first order in q:

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity

indexes

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Genuine and pseudo tensors

• Coordinate transformation x→ x ′ such thatds2 = dx21 + dx22 + dx23 does not change

• x ′i = Rijxj where RR† = R†R = I

• detRR† = (detR)2 = 1

• detR = +1 : proper rotation

• detR = −1 : space inverions and proper rotation

• tensors Tij... transform as T ′ij... = RimRjn . . . Tmn...

• they are called genuine tensors

• pseudo tensors Pij... transform asP ′ij... = (detR)RimRjn . . . Pmn...

• δij is a genuine tensor of rank 2

• εijk is a pseudo tensor of rank 3

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Optical activity (ctd.)

• ∆χoaij = iεijkgk with gk = Gklql

• Ei and Pi are genuine vectors

• hence susceptibility χij is a genuine tensor of rank 2

• g must be a pseudo vector

• qi is a genuine vector

• Gkl therefore is a rank 2 pseudo tensor

• Only materials which have no mirror symmetry showoptical activity

• Material must distinguish between left and right handed

• dextrose, quartz, . . .

• Optically active materials cause a rotation of thepolarization proportional to the sample thickness

• The effect is reversible, as contrasted with the Faradayeffect

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Right vs. left handed quartz crystals.

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

• optical activity of sugar discovered by Seebeck in 1811

• this explains the name optical activity

• dextrose is naturally produced sugar

• glucose (sugar) from Greek γλυκυς=glycys=sweet

• dextrose from Latin dexter=right

• artificially produced sugar does not showleft/right-handedness

• biologically produces sugar (dextrose) is optically effective

• Nature has no tendency to prefer left to right handedness

• Question: Are all sugar producing plants copies of the firstplant, which randomly decided between left and right?

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Dextrose

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Thomas Seebeck, German physicist, 1770-1831

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• Quartz is silicon dioxide, SiO2

• the most common mineral on earth

• just think of sand

• single crystals are either left or right optically active

• however, twins are also found

• world wide distribution is very close to 1:1 for left:rightcrystals

• there seems to be no preference of nature for left or right

• although parity is not a symmetry of nature. . .

• TCP is

• P alone not

• but only in weak interactions

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

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Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Quartz

• TCP is

• P alone not

OpticalActivity

Peter Hertel

Roadmap

Permittivity

No externalfields

Opticalactivity

Natural quartz

Optical Activity Peter Hertel Roadmap Permittivity …Roadmap Permittivity No external elds External...

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Effective Parameter (Permittivity and User Guide_epsmuest

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MEASURED COMPLEX PERMITTIVITY OF WALLS WITH …