02/21/2014 PHY 712 Spring 2014 -- Lecture 16-17 1 PHY 712 Electrodynamics 9-9:50 & 10-10:50 AM Olin 107 Plan for Lecture 16-17: Read Chapter 7 1. Plane polarized electromagnetic waves 2. Reflectance and transmittance of electromagnetic waves – extension to anisotropy and complexity 3. Frequency dependence of dielectric materials; Drude model 4. Kramers-Kronig relationships
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PHY 712 Electrodynamics 9-9:50 & 10-10:50 AM Olin 107 Plan for Lecture 16-17: Read Chapter 7
PHY 712 Electrodynamics 9-9:50 & 10-10:50 AM Olin 107 Plan for Lecture 16-17: Read Chapter 7 Plane polarized electromagnetic waves Reflectance and transmittance of electromagnetic waves – extension to anisotropy and complexity Frequency dependence of dielectric materials; Drude model - PowerPoint PPT Presentation
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PHY 712 Spring 2014 -- Lecture 16-17 102/21/2014
PHY 712 Electrodynamics9-9:50 & 10-10:50 AM Olin 107
Plan for Lecture 16-17:Read Chapter 7
1. Plane polarized electromagnetic waves2. Reflectance and transmittance of electromagnetic
waves – extension to anisotropy and complexity3. Frequency dependence of dielectric materials;
Drude model4. Kramers-Kronig relationships
PHY 712 Spring 2014 -- Lecture 16-17 202/21/2014
PHY 712 Spring 2014 -- Lecture 16-17 302/21/2014
For linear isotropic media and no sources: ; Coulomb's law: 0
Ampere-Maxwell's law: 0
Faraday's law: 0
No magnetic monopoles:
t
t
D E B HE
EB
BE
0 B
Maxwell’s equations
PHY 712 Spring 2014 -- Lecture 16-17 402/21/2014
0 2
22
2
t
ttBB
EBEB
Analysis of Maxwell’s equations without sources -- continued:
0 :monopoles magnetic No
0 :law sFaraday'
0 :law sMaxwell'-Ampere
0 :law sCoulomb'
B
BE
EB
E
t
t
0 2
22
2
t
ttEE
BEBE
PHY 712 Spring 2014 -- Lecture 16-17 502/21/2014
2
20022
2
2
22
2
2
22
where
01
01
nccv
tv
tv
EE
BB
Analysis of Maxwell’s equations without sources -- continued: Both E and B fields are solutions to a wave equation:
tiitii etet rkrk ErEBrB 00 , ,
:equation wave tosolutions wavePlane
PHY 712 Spring 2014 -- Lecture 16-17 602/21/2014
Analysis of Maxwell’s equations without sources -- continued:
00
222
00
where
, ,
:equation wave tosolutions wavePlane
nc
nv
etet tiitii
k
ErEBrB rkrk
Note: , , n, k can all be complex; for the moment we will assume that they are all real (no dissipation).
0ˆ and 0ˆ :note also
ˆ
0 :law sFaraday' from
t;independennot are and that Note
00
000
00
BkEk
EkEkB
BE
BE
cn
t
PHY 712 Spring 2014 -- Lecture 16-17 702/21/2014
Analysis of Maxwell’s equations without sources -- continued:
0ˆ and where
, ˆ
,
: wavesneticelectromag plane ofSummary
000
222
00
Ekk
ErEEkrB rkrk
nc
nv
etec
nt tiitii
220
0
20
Poynting vector and energy density:
1ˆ ˆ2 2
12
avg
avg
nc
u
ES k E k
E
E0
B0k
PHY 712 Spring 2014 -- Lecture 16-17 802/21/2014
Reflection and refraction of plane electromagnetic waves at a plane interface between dielectrics (assumed to be lossless)
’ ’
k’
kikR
i R
q
PHY 712 Spring 2014 -- Lecture 16-17 902/21/2014
Reflection and refraction -- continued
’ ’
k’ki kRi R
q
tt
cnt
et
ttcnt
et
RRRRR
ctniRR
iiiii
ctniii
Rc
ic
,ˆ,ˆ,
,
,ˆ,ˆ,
,
: mediumIn
ˆ
0
ˆ
0
rEkrEkrB
ErE
rEkrEkrB
ErE
rk
rk
tt
cnt
et ctni c
,'ˆ'',''ˆ','
','
:'' mediumIn 'ˆ'
0
rEkrEkrB
ErE rk
PHY 712 Spring 2014 -- Lecture 16-17 1002/21/2014
Reflection and refraction -- continued
inninxxnnn
Riix
x
yx
i
Ri
sinsin' : law sSnell'sinsin' ˆ'ˆ'
ˆsinˆsin'ˆ
ˆ0ˆˆ :planeboundary at factors phase matching -- law sSnell'
qq
q
rkrk
rkrk
rk
zyxr
’ ’
k’ki kRi R
q
z
x
PHY 712 Spring 2014 -- Lecture 16-17 1102/21/2014
Reflection and refraction -- continued
continuous ˆ ,ˆcontinuous ˆ ,ˆ
:planeboundary at amplitudes field Matching
0 0
0 0:sources noith boundary wat equations Continuity
zEzHzBzD
BEDH
BD
tt
’ ’
k’ki kRi R
q
z
x
PHY 712 Spring 2014 -- Lecture 16-17 1202/21/2014
Reflection and refraction -- continued
zEk
zEkEk
zBzEzEE
zD
ˆ''ˆ'
ˆˆˆ:continuous ˆ
ˆ''ˆ:continuous ˆ
:planeboundary at amplitudes field Matching
0
00
000
i
RRii
Ri
n
n
’ ’
k’ki kRi R
q
z
x
zEkzEkEk
zHzEzEE
zE
ˆ''ˆ'' ˆˆˆ
:continuous ˆˆ'ˆ
:continuous ˆ
000
000
iRRii
Ri
nn
PHY 712 Spring 2014 -- Lecture 16-17 1302/21/2014
Reflection and refraction -- continued
’ ’
k’ki kRi R
q
z
x
s-polarization – E field “polarized” perpendicular to plane of incidence
zEkzEkEk
zHzEzEE
zE
ˆ''ˆ'' ˆˆˆ
:continuous ˆˆ'ˆ
:continuous ˆ
000
000
iRRii
Ri
nn
sin'cos' : thatNote
cos''
cos
cos2' cos'
'cos
cos''
cos
222
0
0
0
0
innn
nin
inEE
nin
nin
EE
ii
R
q
qq
q
PHY 712 Spring 2014 -- Lecture 16-17 1402/21/2014
Reflection and refraction -- continued
’ ’
k’ki kRi R
q
z
x
p-polarization – E field “polarized” parallel to plane of incidence
sin'cos' : thatNote
coscos''
cos2' coscos'
'
coscos''
222
0
0
0
0
innn
nin
inEE
nin
nin
EE
ii
R
q
qq
q
zEkzEkEk
zHzEzEE
zD
ˆ''ˆ'' ˆˆˆ
:continuous ˆˆ''ˆ
:continuous ˆ
000
000
iRRii
Ri
nn
PHY 712 Spring 2014 -- Lecture 16-17 1502/21/2014
Reflection and refraction -- continued
’ ’
k’ki kRi R
q
z
x
1TR that Note
coscos
'''
ˆˆ'T
ˆˆ
R
:ance transmitte,Reflectanc2
0
0
2
0
0
in
nEE
EE
iii
R
i
R q
zSzS
zSzS
PHY 712 Spring 2014 -- Lecture 16-17 1602/21/2014
sin'cos' : thatNote
cos''
cos
cos2' cos'
'cos
cos''
cos
222
0
0
0
0
innn
nin
inEE
nin
nin
EE
ii
R
q
qq
q
For s-polarization
sin'cos' : thatNote
coscos''
cos2' coscos'
'
coscos''
222
0
0
0
0
innn
nin
inEE
nin
nin
EE
ii
R
q
qq
q
For p-polarization
PHY 712 Spring 2014 -- Lecture 16-17 1702/21/2014
Special case: normal incidence (i=0, q=0)
nn
nEE
nn
nn
EE
ii
R
''
2' '
'
''
0
0
0
0
''
''
2'
''T
''
''R
:ance transmitte,Reflectanc
2
2
0
0
2
2
0
0
nn
nn
nnn
EE
nn
nn
EE
i
i
R
PHY 712 Spring 2014 -- Lecture 16-17 1802/21/2014
Multilayer dielectrics (Problem #7.2)
n1 n2 n3
ki
kR
ktkb
ka
d
PHY 712 Spring 2014 -- Lecture 16-17 1902/21/2014
Extension of analysis to anisotropic media --
PHY 712 Spring 2014 -- Lecture 16-17 2002/21/2014
Consider the problem of determining the reflectance from an anisotropic medium with isotropic permeability 0 and anisotropic permittivity 0 k where:
By assumption, the wave vector in the medium isconfined to the x-y plane and will be denoted by
The electric field inside the medium is given by:
0 00 00 0
xx
yy
zz
kk
k
κ
and ˆ ˆ( ), where are to be determine d.t yx y xn n n nc
k x y
( )ˆ ˆ ˆ( )e .x yi n x n y i t
cx y zE E E
E x y z
PHY 712 Spring 2014 -- Lecture 16-17 2102/21/2014
Inside the anisotropic medium, Maxwell’s equations are:
After some algebra, the equation for E is:
From E, H can be determined from
0 0
0 00 0i i
H κ EE H H κ Eò
2
2
2 2
00 0.
0 0 ( )
xx y x y x
x y yy x y
zz x y z
n n n En n n E
n n E
kk
k
( )
0
1 ˆ ˆ ˆ( ) ( ) e .x yi n x n y i tc
z y x y x x yE n n E n E nc
H x y z
PHY 712 Spring 2014 -- Lecture 16-17 2202/21/2014
The fields for the incident and reflected waves are the same as for the isotropic case.
Note that, consistent with Snell’s law:Continuity conditions at the y=0 plane must be applied for the following fields:
There will be two different solutions, depending of the polarization of the incident field.
ˆ ˆ(sin cos ),
ˆ ˆ(sin cos ).
i
R
i ic
i ic
k x y
k x y
sinxn i
( ,0, , ), ( ,0, , ), ( ,0, , ), and ( ,0, , ).x z yx z t E x z t E x z t D x z tH
PHY 712 Spring 2014 -- Lecture 16-17 2302/21/2014
Solution for s-polarization
2 2
( ) ( )
0
0
1ˆ ˆ ˆe ( ) ex y x y
x y y zz x
i n x n y i t i n x n y i tc c
z z y x
E E n n
E E n nc
k
E z H x y
0 0 0 0 0 0
must be determined from the continuity conditions:
( ) cos ( ) in sz
z z y z xE E E E E i E n E E i E
E
n
0
0
cos.
cosy
y
i nEE i n
PHY 712 Spring 2014 -- Lecture 16-17 2402/21/2014
Solution for p-polarization2 2
( )
( )
0
0 ( ).
ˆ ˆ e .
ˆe .
x y
x y
xxy yy x
yy
i n x n y i txx x c
xyy y
i n x n y i tx xx c
z
y
E n n
nE
n
Ec n
kk
k
kk
k
E x y
H z
0 0 0 0 0 0( )cos ( ) ( )sin .
must be determi
ned from the continuity conditions:
x
xx xx xx x x
y y
nE E i E E E E E E i E
n n
Ek k
0
0
cos.
cosxx y
xx y
i nEE i n
kk
PHY 712 Spring 2014 -- Lecture 16-17 2502/21/2014
Extension of analysis to complex dielectric functions
rkrkrk EErE
ˆˆ
0
ˆ
0
2/122
2/122
2
0
0
,
2
2
:complex isfunction dielectric theSuppose that assume simplicityFor