Optomechanical Crystals in Cavity Opto- and Electromechanics · 2016. 11. 15. · Maxwell’s...
Transcript of Optomechanical Crystals in Cavity Opto- and Electromechanics · 2016. 11. 15. · Maxwell’s...
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Johannes Fink and Oskar Painter
Institute for Quantum Information and Matter California Institute of Technology
Optomechanical Crystals in Cavity Opto- and Electromechanics
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Announcements
2016: New Institute, brand new lab
à
- Circuit QED - Electro- and Optomechanics - Integrated microwave to optical link - Quantum communication & imaging
Quantum integrated devices (quantumids.com)
Deadline: Feb 7, 2016
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Why Mechanics?
Cavity Optomechanics
Physics
x̂ = xzpf(b+ b
†)
Hint
= ~gom
x̂a†a = ~g0
(b+ b†)a†a
Aspelmeyer, Kippenberg, Marquardt Rev. Mod. Phys. 86 (2014)
• Fundamental tests gravitation, decoherence
• Precision measurements displacements, masses, forces, accelerations
• Mechanical circuits and arrays nonlinearities for QIP, collective dynamics
• Mechanics as a bus connecting qubits, spins, photons, atoms, ...
• Mechanics as a toolbox storage, amplification, filtering, multiplexing, sensing, …
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Optomechanical Crystals
Coupling Strength
J. Chan, et. al, Nature 478 (2011)
go = 1,100 kHz (experiment)
0.5 nm Periodic Atomic Structure
500 nm
Periodically Placed Holes
àBandgaps for electron waves
fm = 5.7 GHz
fo = 194 THz
à Bandgaps for sound & light waves • Independent routing of acoustic and optical waves
• Strong co-localization of modes • Large radiation pressure effect (g0) • Phononic shield for high mechanical Q • Telecom wavelengths • <n> << 1 at 10 mK
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Outline
Lectures 1-3:
Basics of OMCs
1. Maxwell’s equations a) Basics b) Energy, mode
volume and quantization
c) Symmetry and periodicity
d) Band structures
2. Acoustic wave equation a) Basics b) Effective mass c) Guided waves d) Band structures
Design & Engineering 1. OMC Band structures
2. Linear and point defects a) Basics b) 1D Nanobeam c) W1 Snowflake
3. OM Coupling a) Boundary b) Stress-Optical c) Vacuum coupling
4. Techniques
a) Fabrication b) Coupling
OMCs & Microwaves
1. Slot mode coupled PCs a) Design b) Coupling c) Nonlinearities
2. Slot mode coupled ‘OMCs’ a) Design & coupling b) Fabrication c) EIT d) Ground state e) TLS coupling f) Wavelength
conversion
3. Outlook
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Optomechanical Crystals in Cavity Opto- and Electromechanics
Basics of OMCs
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Maxwell’s Equations I
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Most general
Mixed dielectric medium
- No sources of light: - Linear: - Isotropic - No material dispersion - Lossless: is real and pos. - = 1 à
Linear and lossless
Solutions are harmonic modes With e.g.
Implications - transversality - “Master equation”
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Maxwell’s Equations II
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Procedure - For a given ε(r)
- Solve
to find mode profile
- Then use e.g. to recover electric field profile (and make sure \ )
Eigenvalue Problem - We can define operator Θ
- Θ is linear and hermitian -> ω is real, modes are orthogonal
1D Example - Inner product - orthogonal modes
Normalization - with
- and
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Energy, Mode Volume, Quantization
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Variational Principle - Minimize EM energy functional
-> minimize Uf to get lowest energy mode ω0
2/c2 subject to
Effective Mode Volume - Depends on physics
- Minimal possible in dielectric cavity ~ with
- About ~ 0.01 μm3 (Si at 1550 nm)
Physical Energy - For harmonic mode, time averaged
Relation to cavity / circuit QED
- Dipole moment - Electric field - Dipole coupling
with ZPF (1D):
V usually normalized with |E(ratom)|2
M. O. Scully, et. al, Cambridge University Press (1997)
Quantization
ß max by definition
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Symmetry and Bloch Waves
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Inversion Symmetry - Even odd
- Symmetry operator:
- is also a valid mode with and α = 1 or -1
- Symmetry operations can be used to classify modes (without knowing the details of it)
Continuous Translational Symmetry - Operator
- Solution (1D)
- Homogeneous medium (3D): ε=1 -> plane waves -> disp. relation
Plane of glass
- Free space
- Light line
- Index guided
Band structure
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Periodicity and Bands
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Discrete Translational Symmetry
- Plane waves again
- Degenerate set
- Reciprocal lattice vector
- Bloch
- Brillouin zone
Bloch Theorem (3D)
- Bloch state vector
- Reciprocal lattice vectors
Photonic Bands
- Operator
- Transversality
- Periodicity
à use MPB to get for a given
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IBZ and Propagation
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Irreducible Brillouin Zone - e.g. Rotational symmetry:
à Symmetries of the lattice are inherited by the bands à Additional redundancy in the BZ
- In general: Bands have symmetries of point group (Rotation, Reflection, Inversion)
- IBZ of square Lattice
Polarization
- 2D photonic crystals have symmetry
- Allows only two different polarizations TE: TM:
Bloch wave propagation
- With time dependence à k is conserved à All scattering events are coherent
- Group velocity
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Band structure
- PBG forms at where λ = 2 a
dielectric band air band
- Bandgap scales with Δε
Photonic Band Gaps
J. D. Joannopoulos, et. al, Princeton University Press (2008)
1D Photonic Crystal - A multilayer film
- Bloch state
- BZ is 1D
- Consider only kz
- Layer width a/2
- Light line
ε=(13,13) ε=(13,12) ε=(13,1)
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Band structure - k z = 0, r = 0.2 a, ε= (8.9, 1)
- TM modes: - Zero group velocity (standing waves) at X and M
- Only TM has band gap à “symmetry BG”
Photonic Band Gaps
J. D. Joannopoulos, et. al, Princeton University Press (2008)
2D Photonic Crystal - A set of rods
- Band gap in x-y plane
- Can prevent light to propagate in any direction in this plane
- Modes in x-y plane are TE: H normal to plane or TM: E normal to plane
- Bloch state
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Band Gaps & Slabs
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Triangular Lattice: Complete BG - Compromise: weakly connected “rods”
- Hexagonal BZ, BG for all polarizations
- But no confinement to x-y plane
Triangular Lattice in a Slab - Index guiding in z direction - Forms “quasi” photonic band gap
(only for guided modes below light cone) - Band modes decay as exp( i (k + i κ) z) - Avoid leakage:
- Out of plane radiation - TM –TE mixing
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Eigenvalue Problem - with operator
Acoustic Wave Equation
A. H. Safavi-Naeini and O. Painter, Springer (2014)
Continuum mechanics (λp >> interatomic distances)
- Material properties:
elasticity tensor density displacement vector field
- Strain (relative deformation)
- Stress (Hooke’s law)
- Newton’s law
- Wave eqn.
Quantization again
- Define ladder operators for each mode
- Single phonon energy
- With ZPF
- And
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Waves and Phonons 1 Guided waves
- EM modes 2 transverse waves (different pol.) with:
- Mechanical modes 2 transverse (shear) waves with 1 longitudinal (dilatational, pressure) wave with
A. H. Safavi-Naeini and O. Painter, Springer (2014)
Material
- Typical properties of SOI (Si)
Phonons in a slab - Propagation - Polarization (SH), (SV) and (P) - Mirror symmetry: (-x+z), (+x-z), (+x+z)
operator e.g. - Boundary: - Horizontal shear (SH) dispersion - Slab boundary couples SV and P modes - Form pair of solutions:
(-z) … flexural and (+z) … extensional - Level repulsion causes low energy dispersion difference
λ = 1500 nm T = 220 nm
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Waves and Phonons 2
A. H. Safavi-Naeini and O. Painter, Springer (2014)
Phonons in a beam
- Additional boundary condition - Boundaries also couples SH modes - 2 flexural modes and one extensional (+x+z) - One additional torsional mode (-x-z)
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1D pad connector
- Symmetries
- à phononic bandgap
Phononic Band Structures 1D chain with basis
- Dispersion relation
- Acoustic is linear at small k
- Band gap scales with Δm (and K)
- For N > 2 masses: acoustic: 2 + 1 optical: 3 N - 3 modes
M. Eichenfield, et. Al. Optics Express 17 (2009) A. H. Safavi-Naeini and O. Painter, Optics Express 18 (2010)
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Optomechanical Crystals in Cavity Opto- and Electromechanics
Design and Engineering
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Quasi - 1D Nanobeam crystal Lattice: photonic bands: phononic bands:
- Symmetry points: Γ(k=0), M (k=π/a) - Optics: Fundametal TE modes in black - Mechanics: Extensional modes shown in black
OMC Band Structures 1
A. H. Safavi-Naeini and O. Painter, Optics Express 18 (2010)
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OMC Band Structures 2 Quasi 2D Cross crystal Lattice: photonic bands: phononic bands:
(even, vertical sym.) à Bad choice for OMC à Great choice for phononic shield
A. H. Safavi-Naeini and O. Painter, Springer (2014)
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Quasi 2D Snowflake crystal Lattice: photonic bands: phononic bands:
(even, vertical sym.) à Higher symmetry à Independent tuning a-2r (phononics) and w (photonics) à Great choice for OMC
OMC Band Structures 3
A. H. Safavi-Naeini and O. Painter, Springer (2014)
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Point defects 1
J. D. Joannopoulos, et. al, Princeton University Press (2008)
Point defect in 1D
- Defect in multilayer film
- Density of states
- Defect allows localized mode - νspecific “mirrors” for cavity - Can “pull” or “push” a defect from any band
Localization
- Defect modes decay exponentially in crystal - Evanescent with complex k+iκ
- Can approximate
- Large k and small V at midgap
- Strong confinement causes radiation loss
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1D Nanobeam cavity - Push optical defect for X point ß further from light cone - Pull mechanical defect from Γ point ß constructive overlap with optical mode - Choose a quadratic scaling of the defect ß minimize wave package in real and reciprocal space - Numerical optimization of geometry with fitness function, e.g. g0
2/κ
Point defects 2
photonic phononic
defect mech. and opt. cavity mode
A. H. Safavi-Naeini and O. Painter, Optics Express 18 (2010)
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Example: Waveguide in air - Introduce line defect in 2D crystal
- One direction with discrete translational symmetry
- ky in propagation direction is conserved
- Projected band structure for dielectric rods:
for a (ky,ω0), choose any kx (continuous regions)
- Guided band inside the BG
- Coupling to and guiding of traveling photons and phonons
Linear defects
J. D. Joannopoulos, et. al, Princeton University Press (2008)
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Snowflake cavity
- Change radius of snowflakes (quadratically)
- Cavity modes:
Snowflake waveguide
- Missing row of snowflakes
- Band diagrams
Linear + Point defect in 2D
A. H. Safavi-Naeini and O. Painter, Optics Express 18 (2010)
Ey(r)
Q(r)
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Optomechanical Coupling Small Perturbations
- Get mode profiles Q(r) and e(r) - Small modifications - To first order
with
- intuitively
A. H. Safavi-Naeini and O. Painter, Springer (2014)
Boundary perturbation
- Deformation affects dielectric function - High contrast step function across a boundary is
shifted - Need to relate deformation to
Vacuum Coupling
- Multiply with ZPF
- Total coupling is the sum of both
overlap
Photo elastic coupling
- Strain affects the refractive index
- With photo elastic tensor p - Coupling:
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‘Recipe’ for designing an OMC
- Conceive a suitable design lattice / unit cell - Get the material parameters - Simulate photonic band structure in MPB - Simulate phononic band structure in Comsol - Optimize the design “by hand” for good band gaps - Simulate the band structures of different defect perturbations (tuning) - Now simulate the full cavity in Comsol (use all available symmetries) - Extract frequencies, Qopt, gom and check overlap of modes - Simulate Qmech using a perfectly matched layer - Maybe add a phononic shield to improve Qmech if possible
- Define a fitness function e.g. go2/κ and do numerical optimization of the
design i.e. vary defect size, depth, perturbation … - Test if design is robust, i.e. remove symmetries in simulation, introduce
fabrication defects - Try to fabricate and test it!
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- SOI substrate - ZEP resist
- 100 keV EBPG - Optimized C4F8 / SF6 plasma etch - 49% HF release - Repeated piranha cleaning + H termination (1:20 HF in water)
Fabrication of OMCs
A. H. Safavi-Naeini and O. Painter, Springer (2014)
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- Fiber taper coupling
- With adiabatic coupler
Coupling to OMCs
A. H. Safavi-Naeini and O. Painter, Springer (2014)
- End fire
- V-groove
50 μm
J. D. Cohen et al., Opt. Express 21 (2013)
S. M. Meenehan et al., PRA 90 (2014)
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Optomechanical Crystals in Cavity Opto- and Electromechanics
OMCs and Microwaves
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Circuit QED + OMCs
Challenges
Optics • Low loss • Noise resilient à Communication
µw Circuits + Optomechanics: ‘Quantum Microwave Photonics‘
Why with microwaves? • Less heating • Circuit QED toolbox • Fully engineered
GHz acoustics • No active cooling • Acoustic waveguides & circuits • Phonon interference, entanglement
Microwaves • Good qubits • Very large g à Processing
AO transducer • State synthesis and distribution • Interface for circuits and atoms • ‘Quantum Internet’
µw Circuits + Acoustic Cavities: ‘Microwave Phonon Circuits‘
• Size mismatch à small gem • Low bandwidth
• Heating • Quasiparticles
• Losses & materials • Complex fabrication
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Microwave to Optical
Beat losses: Impedance matching:
Beam splitter like interaction Conversion efficiency
Safavi-Naeini, A. H. et al., NJP 13, 013017 (2011) Wang, Y. and Clerk, A., PRL 108, (2012) Vitali, D. et al., PRL 109, (2012)
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SOI Sample @ RT
Tunable Photonic Crystal
A. Di Falco, APL 92 (2008) A. Safavi-Naeini, et al, APL 97 (2010) Winger, M. et al., Opt. Expr. 19, (2011) Sun, X. et al., APL 101, (2012)
Experimental setup Mechanics 2D photonic crystal
!
o
/2⇡ ⇠ 200 THz
!
m
/2⇡ ⇠ 60 MHz
Q
o
⇠ 105
Q
m
⇠ 102
m
e↵
⇠ 7.8 pg
x
zpf
⇠ 4.1 fm
g
0,om
/2⇡ ⇠ 490 kHz
C
m
⇠ 1 fF
A. Pitanti, J. M. Fink, et al., Opt. Expr. 23 (2015)
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Voltage tuning
Electromechanical Coupling
EM coupling
A. Pitanti, J. M. Fink, et al., Opt. Expr. 23 (2015)
Capacitive force And measured opt. tuneability α0=-2.5 pm/V2
EM coupling
Modulated capacitance
gem~ 50 MHz/nm
Stray: Cs~ 12 fF: à gext,em~ 15 Hz (Qs ~ 105, 8 GHz) à Cem > 1 for n~ 105 à Com > 1 for n ~ 102
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Duffing response and phase locking
Nonlinear Mechanics
Nonlinear coupling Capacitive softening
à Directions: thermal squeezing, amplification, efficient AO modulation (go to vacuum) à Linear range sufficient for state conversion however not sideband resolved (get an inductor) à But want better g0, lower Cs, and a low loss substrate
A. Pitanti, J. M. Fink, et al., Opt. Expr. 23 (2015)
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Slot Mode Coupled OMCs
Can we do even better? - Remove substrate! - Increase mechanical frequency
(sideband resolution)
à Slot mode coupled OMCs on stressed silicon nitride
M. Davanco et al., Opt. Express 20 (2012) K. E. Grutter et al., arXiv 1508.05919 (2015)
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Silicon Nitride Chip Design
Schematic Circuit
High Z Inductors: à Can get as low as Cs~2 fF à “new” circuit element:
a linear superinductor
à Great for coupling any small dipole moment object!
à Localizes charge on capacitor
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Silicon Nitride Chip Design
Expected coupling:
à Expect 40-50 Hz à Total Impedance is about 4 Rq à Cs due to additional wiring,
cross overs, loading, ground, …
Acoustic bandgap:
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Si3N4 Through Chip Membrane Devices
Etch through Si wafer leaving 300 nm thick transSi3N4 membrane
32 LC circuits On 4x4 membranes
Transmission Lines
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On-membrane circuit
Double cavity device Top coil
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On-membrane circuit
Double cavity device Nanobeam center
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Fabrication
Key fab steps Gap view
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Setup and basic Characteristics
Microwave Q
Setup
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Coherent Response: EIT
à nd ~ 107 à Qm ~ 5x105 à G/π ~
400 kHz à Cmax ~ 104
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Thermometry Calibration (C<<1)
Ti~ 220mK
Tf ~ 20 mK g0/2π ~ 41 Hz xzpf ~ 8 fm
Fluctuation dissipation theorem:
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Ground State Cooling
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Strong coupling to microscopic TLS
Cavity QED physics
E0 ⇠ (~!/V )1/2g = E0d/~
D. Walls & G. Milburn, Quantum Optics (1994)
Facilitated by extreme electric field confinement à ~120 V/m for single Photon
in the center of the gap
Vacuum Rabi splitting
ac Stark tuning
à g/pi~1.8 MHz à k/2pi~1.4 MHz
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All-Microwave Wavelength Conversion
Beat losses: Impedance matching:
Beam splitter like interaction Conversion efficiency
Safavi-Naeini, A. H. et al., NJP 13, 013017 (2011) Wang, Y. and Clerk, A., PRL 108, (2012) Hill, J. T. et al., Nat. Commun. 3, (2012)
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Cooling Run & EIT
à LW/2pi: 7 / 8 Hz à g0/2pi: 33 / 44 Hz
mode 1 @ 7.4 GHZ mode 2 @ 9.3 GHz
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Wavelength Conversion
Theory: Efficiency calibration:
R. W. Andrews, Nat. Phys. 10 (2014)
Conversion: Psignal = - 60 dBm ~ 26 photons
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Wavelength Conversion
Conversion efficiency vs. C1, C2: ~ 60%
Dynamic Range: ~ 106
Bandwidth: ~ 1 kHz -10, -9 dBm à 0, 0 dBm
Data Theory
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More internal dynamics
Outlook: 01/2016 à
Acoustic mode • Lower SQL input power • needs large mutual L • x2 detection • which way experiment with phonons
Microwave to optical on Si (or Si3N4) • On-chip coupling • New Si fab process • RT photon counting • Teleportation, Quantum Illumination…
50 μm
Intel i7: 109 transistors 103 contact pins • On-chip demultiplexing • Hardware protection (0-pi) • Many body physics
Circuit QED + mechanics • State synthesis and verification • Nonlinearities • Paramps • Mech. tunability
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Acknowledgements Alessandro Pitanti à Pisa Richard Norte à Delft Mahmoud Kalaee
Oskar Painter
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References Molding the flow of light John D. Joannopoulos, Steven G. Johnson, Joshua N. Winn, and Robert D. Meade. Princeton University Press, second edition (2008) http://ab-initio.mit.edu/book/
Cavity Optomechanics Nano- and Micromechanical Resonators Interacting with Light, Springer (2014) Chapter: Optomechanical Crystal Devices Amir H. Safavi-Naeini, Oskar Painter http://www.springer.com/fr/book/9783642553110