Chapter 7. Interference of Light Last Lecture Superposition of waves Laser This Lecture Two-Beam Interference Young s Double Slit Experiment Virtual Sources Newton s Rings Film Thickness Measurement by Interference Stokes Relations Multiple-Beam Interference in a Parallel Plate
Two-Beam Interference r r Consider two waves E1 and E2 that have the same frequency ω : r r r r r r E1(, t) = E01cos( k1 ωt + φ1) = E01cos( ks1 ωt + φ1) r r r r r r E t E k t E ks t (, ) = cos( ω + φ ) = cos( ω + φ ) 2 02 2 2 02 2 2 S 2 k r 1 k r 2 S 1
Two-Beam Interference Interference term
Two-Beam Interference The irradiances for beams 1 and 2 are given by : The interference term is given by r r r r E1 E2 = E01 E02cos( ks1 ωt+ φ1)cos( ks2 ωt+ φ2) r r r r 2 E1 E2 = 2E01 E02 cos( α ωt)cos( β ωt) r r = E01 E02 cos( α + β 2 ωt) + cos( β α) r r = E01 E02 cos( β α) r r = E E cosδ 01 02 1 2 1 2 ( s ) ( ) 1 2 2 1 { α ks + φ, β ks + φ } 1 1 2 2 { 2cos( A)cos( B) = cos( A+ B) + cos( A B) } δ k s + φ φ : phase difference I = I + I + 2 I I cosδ E01 E02 1 2 1 2 r r when (same polarization) I = I + I + 2 I I cosδ for purely monochromatic light
Interference of mutually incoherent beams I = I + I + 2 I I cosδ 1 2 1 2 { k( s1 s2) 2 t 1 t } cosδ = cos + φ () φ () mutual incoherence means φ 1 (t) and φ 2 (t) are random in time cosδ = 0 I = I1+ I2 Mutually incoherent beams do not interference with each other
Interference of mutually coherent beams I = I + I + 2 I I cosδ 1 2 1 2 { k( s1 s2) 2 t 1 t } cosδ = cos + φ () φ () mutual coherence means [ φ 1 (t) - φ 2 (t) ] is constant in time I = I + I + 2 I I cosδ 1 2 1 2 { ( 1 2) } cosδ = cosδ = cos k s s Mutually coherent beams do interference with each other
Interference of mutually coherent beams The total irradiance is given by There is a maximum in the interference pattern when This is referred to as constructive interference. There is a minimum in the interference pattern when This is referred to as destructive interference
Visibility Visibility = fringe contrast V I I max max + I I min min { 0 V 1 } When I = 4I I min = 0 max 0 Therefore, V = 1
Sources must be: Conditions for good visibility same in phase evolution in terms of time (source frequency) temporal coherence space (source size) spatial coherence Same in amplitude Same in polarization Normal Very good Very bad
Young s Double Slit Experiment Hecht, Optics, Chapter 9.
Young s Double Slit Interference Assume that y << s and a << s. The condition for an interference maximum is The condition for an interference minimum is Relation between geometric path difference and phase difference : 2π δ = kδ= Δ λ a θ y Δ s
Young s Double Slit Interference On the screen the irradiance pattern is given by Assuming that y << s : Bright fringes: Dark fringes: λs a Δ ymax =Δ ymin =
Interference Fringes From 2 Point Sources Figure 7-5
Interference Fringes From 2 Point Sources Two coherent point sources : P 1 and P 2
Interference With Virtual Sources: Fresnel s Double Mirror Hecht, Optics, Chapter 9.
Interference With Virtual Sources: Lloyd s Mirror Light source Figure 7-7 mirror Rotation stage
Interference With Virtual Sources: Fresnel s Biprism Hecht, Optics, Chapter 9.
7-4. Interference in Dielectric Films
Analysis of Interference in Dielectric Films Figure 7-12
Analysis of Interference in Dielectric Films The phase difference due to optical path length differences for the front and back reflections is given by
Analysis of Interference in Dielectric Films Also need to account for phase differences Δ r due to differences in the reflection process at the front and back surfaces Δ r Δ = Δ p + Δ r Δ r Constructive interference Destructive interference
Fringes of Equal Inclination Fringes arise as varies due to changes in the incident angle: θ i θ t Constructive interference Destructive interference Figure 7-13
7-5. Fringes of Equal Thickness When the direction of the incoming light is fixed, fringes arise as varies due to changes in the dielectric film thickness : Constructive interference Bright fringe Destructive interference Dark fringe
7-6. Fringes of Equal Thickness: Newton s Rings Figure 7-17
Newton s rings R-t m θ R R = r + ( R t ) R= 2 2 2 m m r 2 m 2Rt m r + t 2t 2 2 m m m n r m t m << R Maxima (bright rings) when, t m λ λ Δ= 2 tm + = mλ ( nf = 1, Δ r = ) 2 2 r = m λr 2 2 1 m Minima (dark rings) when, reflection transmission λ 1 Δ= 2tm + = m+ λ 2 2 r = 2 m mλr
7-7. Film-thickness measurement by interference
7-8. Stokes Relations in reflection and transmission E i is the amplitude of the incident light. The amplitudes of the reflected and transmitted beams are given by From the principle of reversibility Stokes relations r = e iπ r
7-9. Multiple-Beam Interference in a Parallel Plate I 0 I R I T Transmittance I T T I 0 Reflectance I R R I 0
Multiple-Beam Interference in a Parallel Plate I = E 0 0 2 I R = E R 2 Find the superposition of the reflected beams from the top of the plate. The phase difference between neighboring beams is δ = kδ Δ = 2ndcosθ f t r t Given that the incident wave is t d r I T = E T 2
Multiple-Beam Interference in a Parallel Plate The reflected amplitude resulting from the superposition of the reflected beams from the top of the plate is given by Define Therefore
Multiple-Beam Interference in a Parallel Plate The Stokes relations can now be used to simplify the expression
Multiple-Beam Interference in a Parallel Plate The reflection irradiance is given by
Multiple-Beam Interference in a Parallel Plate The transmitted irradiance is given by
Multiple-Beam Interference in a Parallel Plate Minima in reflected irradiance and maxima in transmitted irradiance occur when Δ = 2ndcosθ = f t mλ Minima in transmitted irradiance and maxima in reflected irradiance occur when Δ= 2nd f cosθt = m+ 1 λ 2