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EE 230: Optical Fiber Communication Lecture 6. Nonlinear Processes in Optical Fibers. From the movie Warriors of the Net. Polarization. In molecules, P= μ + α E+ β E 2 + γ E 3 +… In materials, P=X (o) +X (1) E+X (2) E 2 +X (3) E 3 +…
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EE 230: Optical Fiber Communication Lecture 6 Nonlinear Processes in Optical Fibers From the movie Warriors of the Net
Polarization • In molecules, P=μ+αE+βE2+γE3+… • In materials, P=X(o)+X(1)E+X(2)E2+X(3)E3+… If multiple electric fields are applied, every possible cross term is generated. At sufficiently high values of E, quadratic or higher terms become important and nonlinear effects are induced in the fiber.
Polarization Distortion of an electron cloud in response to an E-field Molecules and their dipole moments
Nonlinear Effects • Stimulated Raman scattering • Stimulated Brillouin scattering • Four-wave Mixing • Self-phase Modulation • Cross-phase Modulation
Imaginary part of index: absorption For a sample of absorbance A and thickness d, the imaginary part of the refractive index is equal to
Index of Refraction vs Wavelength Refractive Index for various materials Refractive index vs Frequency for silica Wave slowing in a medium of higher Index
Nonlinear index of refraction Real part of index is best described as a power series n=n1+n2(P/Aeff) Term in parentheses is the intensity. For silica fiber, n22.6x10-11μm2/mW
Interaction Length where α (in cm-1) is the loss coefficient of the fiber. 0.1 dB/km=2.3x10-7 cm-1.
Nonlinear parameter Propagation constant is power-dependent
Propagation in Single Mode Fiber Geometrical optics is not useful for single mode fiber, must be handled by full E & M treatment Think of guiding as diffraction constrained by refraction Fields are evanescently damped in the cladding Understanding Fiber Optics-Hecht
Single Mode Gaussian Approximation Fundamentals of Photonics - Saleh and Teich Fiber Optic Communiocation Systems - Agrawal
Gaussian Pulse Mode Field Diameter w0/a=0.65+1.619V-3/2+2.879V-6 for V between 1.2 and 2.4. Otherwise, use w0/a=(ln V)-1/2 Fiber Optics Communication Technology-Mynbaev & Scheiner
Mitigation If P is high in a fiber application, the nonlinear component of the index is minimized by increasing the effective area of the fiber. Fiber designed for this purpose is called LEAF fiber (Large Effective Area).
Phase modulation • Self-modulation: φNL= γPLeff • Cross-modulation: φNL= 2γPotherLeff Effect of these phase changes is a frequency chirp (frequency changes during pulse), broadening pulse and reducing bit rate-length product
Gaussian Pulse in a Kerr Medium Phase change of gaussian pulse Instantaneous frequency shift Instantaneous Frequency chirp
Nonlinear scattering • Signal photon scatters off oscillation that is present in the material, gains or loses frequency equivalent to that of the material oscillation • At high powers, beating of signal frequency and scattered frequency generates frequency component at the difference that drives the material oscillations
Stimulated Brillouin Scattering • Sound waves represent alternating regions of compressed material and expanded material • Index of refraction increases with density of polarizable electrons and thus with compression • Scattering is induced by index discontinuities
SBS, continued • Transfer of energy into acoustic wave results in backwards scattering in fiber • Brillouin frequency shift equal to 2nv/λ, where n is the mode index and v is the speed of sound in the material • For fiber, scattered light is 11 GHz lower in frequency than signal wavelength (speed of sound is 5.96 km/s)
Stimulated Raman scattering • Oscillations are Si-O bonds in the glass, frequency ≤3.3x1013 Hz • Scattered photon can come off decreased by that amount (Stokes) or increased by that amount (anti-Stokes) • Stokes shift scatters 1550 nm light up to 1870 nm light
Raman shift in silica • Spectrum shows major peaks at 1100, 800, and 450 cm-1 • Those vibrational oscillations occur at 33, 24, and 13.5 THz • Raman gain spectrum shows maximum at 12-14, 18, 24, and 33 THz
Taylor Series expansion of β(ω) Through the cubic term: where
Importance of Taylor Series terms Group velocity Vg, dispersion D, and dispersion slope S
Four-Wave Mixing Phase-Matching Requirement Phase mismatch M needs to be small for FWM to occur significantly
FWM in a WDM system ω1=ω2=ω (power lost from one signal wavelength) ω3=ω+Χ where Χ is the difference in frequency between adjacent channels ω4=ω-Χ Substitute in phase mismatch expression to get M=β2Χ2 Want β2 to be big to minimize FWM!