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Chapter 12. Interaction of Light and Sound. 12.0 Introduction Acousto-Optic(AO) effect : # Effect of change in the index of refraction of medium (crystal) by an Acoustic wave # Acoustic wave Photoelastic effect Change in refractive index. Reference :
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Chapter 12. Interaction of Light and Sound 12.0 Introduction Acousto-Optic(AO) effect : # Effect of change in the index of refraction of medium (crystal) by an Acoustic wave # Acoustic wave Photoelastic effect Change in refractive index Reference : A. Ghatak, K. Thyagarajam, “Optical Electronics”, Cambridge Univ. Press A. Yariv, P. Yeh, “Optical Waves in Crystals”, John Wiley & Sons
Photoelastic effect : Mechanical strain Index of refraction Index ellipsoid for Principal axes : Strain tensor elements, S : : Normal strain : Shear strain where,u, v, w : displacements along the x, y, z axes
Change in index of refraction due to the mechanical strain : where,Pij : Elasto-Optic (Strain Optic) Coefficient (6x6 matrix) Table 9.1 / 9.2 The equation of the index ellipsoid in the presence of a strain field :
Example) Sound wave propagating along the z direction in water Sound wave : Elasto-Optic Coefficient for the water (isotropic, Table 9.1) : The new index ellipsoid :
Example) y-polarized Shear wave propagating along the z direction in Ge Sound wave : Elasto-Optic Coefficient for the Ge (cubic, Table 9.1) : The new index ellipsoid :
Acousto-Optic effect Bragg diffraction & Raman-Nath diffraction Vector Representation light wave acoustic wave # Spread angle of Acoustic wave : Raman-Nath diffraction : acoustic wave vector has an angular distribution Bragg diffraction : acoustic wave vector is well defined # Diffraction angle of Light : # Dimensionless parameter :
Example) Water, n=1.33, W=6MHz (vs=1,500 m/s), l=632.8 nm Bragg diffraction : Single order diffraction Raman-Nath diffraction : Multiple order diffraction
Raman-Nath diffraction Moving periodic refractive index grating : Consider L is small enough so that the medium behave as a thin phase grating, where,f1=(2p/l)n0L, f1=(2p/l)Dn0L The transmitted field on the plane x=L :
amplitude reduction Frequency : Wave vector : Propagation in x>L : : +1 order : -1 order Diffraction angles :
m-th order diffractive wave : # Frequency : # Diffraction angle : # : The restriction on length of medium is severe at higher frequency Diffraction efficiency reduction : First order diffraction maximum
Bragg diffraction In this regime, we can no longer consider the refractive index perturbation to act as a thin phase grating. We should consider the propagation equation of light ;
Let, And, slow varying approximation ;
(1) Small Bragg angle diffraction : Bragg condition
These equations have a solution for when only , The solutions for a+=a, a-=a are independent each other, so let a+=a
Diffraction efficiency, h 0-th and 1-st diffraction powers : i) ii) Maximum transfer : Diffration efficiency :
Acoustic intensity : (Text p. 483) : Figure of Merit Diffraction efficiency :
Acoustic intensity for maximum efficiency : Diffraction figure of merit of the material relative to water Acoustic power for maximum efficiency (LH cross-section, maximum impedance matching case) :
(2) Large Bragg angle diffraction x-dependent term
These equations have a solution for when only , The two solutions are independent each other, so let 1) b+=b+K (Co-directional coupling) Solutions :
Diffraction efficiency, h 0-th and 1-st diffraction powers : Diffraction efficiency :
2) b-=b-K (Counter-directional coupling) Solutions :
Surface Acousto-Optics : Diffraction effect through a thin film surface or wave guide : High intensity localized on the interface enhancing the diffraction efficiency : 1967, Ippen et al. (first experimental demonstration in a quartz) Surface undulation profile by the acoustic wave : Wave vectors of reflected and transmitted light waves : Electric field on the surface :
Diffraction angle : the amplitude of reflected wave :
2) Transmitted wave Similarly, Diffraction efficiency of l-th order :
