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Radiation-matter interactionClassical dipoles
• Dipole radiation
• Power radiated by a classical dipole in an inhomogeneous environment
• The local density of optical states (LDOS)
Quantum emitters
• Lifetime of quantum emitters
• Fluorescence lifetime measurements
• Fermi’s Golden Rule and decay-rate engineering by shaping LDOS
Spontaneous emission control
• Drexhage’s experiment
• The Purcell effect
• Microcavities
Optical antennas
• Radiation reaction in dipolar scatterers
• Decay-rate engineering with optical antennas
www.photonics.ethz.ch 1
www.photonics.ethz.ch 2
Recap
Decay rate of quantum emitter: Power dissipated by classical dipole:
Transition dipole moment is NOT classical dipole moment, but
Classical electromagnetism CANNOT make a statement about the absolute decay rate of a quantum emitter.BUT: Classical electromagnetism CAN predict the decay rate enhancement provided by a photonic system as compared to a reference system.
www.photonics.ethz.ch 3
Rate enhancement – quantum vs. classical
Decay rate of quantum emitter: Power dissipated by classical dipole:
Transition dipole moment is NOT classical dipole moment, but
The LDOS is a “radiation resistance” and quantifies the radiation damping experienced by a source of electromagnetic fields.
www.photonics.ethz.ch 4
Rate enhancement – quantum vs. classical
Decay rate of quantum emitter: Power dissipated by classical dipole:
EmitterTransition dipole moment:Wave function engineering by synthesizing molecules, and quantum dots
Chemistry, material science
EnvironmentLDOS: Electromagnetic mode engineering by shaping boundary conditions for Maxwell’s equations
Physics, electrical engineering
www.photonics.ethz.chantennaking.com, Wikimedia, emory.edu
5
Decay-rate engineering
The Purcell effect
In cavity: Lorentzian with one mode per Δω and cavity volume V
ω
ρ(ω)
Δω
www.photonics.ethz.ch 6
Transition dipole moment is NOT classical dipole moment, but
The LDOS is a “radiation resistance” and quantifies the radiation damping experienced by a source of electromagnetic fields.
www.photonics.ethz.ch 7
Rate enhancement – quantum vs. classical
Decay rate of quantum emitter: Power dissipated by classical dipole:
Which includes scatterers!
Nanoparticles: resonators at optical frequencies
www.photonics.ethz.ch 8
nanoparticle
100 nm Au particle
“damping”
• Metal nano-particles show resonances in the visible
HW3
Nanoparticles: resonators at optical frequencies
www.photonics.ethz.ch 9
nanoparticle
100 nm Au particle
“damping”
• Metal nano-particles show resonances in the visible
• Resonance frequency given by
• plasma frequency of Drude metal (first order)
• Size of particle (second order)
• Width of resonance given by
• Ohmic damping of Drude metal
• Radiation damping (LDOS)
HW3
HW3
The electrodynamic polarizability
• This is a recipe to amend any electrostatic polarizability α0 with a radiation damping term to ensure energy conservation
• Electrodynamic polarizability depends on position within photonic system
• Radiation correction small for weak scatterers (small α0)
• Radiation correction significant for strong scatterers (large α0)
• Limit of maximally possible scattering strength
www.photonics.ethz.ch 10
+++
- - --
+
The electrodynamic polarizability
• Compare static and dynamic α
• Static α0 may be huge, dynamic αeffis always bounded by inverse LDOS (unitary limit)
• Radiation damping is a loss channel and dampens resonance
• Radiation damping is given by the LDOS at the scatterer’s position
www.photonics.ethz.ch 11
Ohmic damping
Radiation damping
Metallic particle (Drude model for e)
Drexhage’s experiment with a scatterer
• Metal nanoparticle on a scanning probe close to a reflecting substrate
• Measure width of scatterer’s resonance as a function of distance to substrate
www.photonics.ethz.ch 12
Buchler et al., PRL 95, 063003 (2005)
Scatterer (metal nanoparticle)
(weak) mirror
Drexhage’s experiment with a scatterer
• Spectral width of scattering cross section (i.e. damping) can be tuned by changing scatterer-mirror distance
• LDOS determines damping rate of scatterer
www.photonics.ethz.ch 13
Buchler et al., PRL 95, 063003 (2005)
Scatterer (metal nanoparticle)
(weak) mirror
Optical antennas for spontaneous emission control
Metal nanoparticle is a resonator!
Can we use the resonance of a nanoparticle to enhance the spontaneous emission rate?
www.photonics.ethz.ch 14
Buchler et al., PRL 95, 063003 (2005)
Scatterer (metal nanoparticle)
(weak) mirror
Optical antennas
www.photonics.ethz.ch 15
Molecule (λem~600nm)
Kühn et al., PRL 97, 017402 (2006)Au particle(80nm diam.)
Anger et al., PRL 96, 113002 (2006)
Optical antennas
• Metallic nanoparticles can act as “antennas” and boost decay rate of quantum emitters in their close proximity
• Effect confined to length scale of order λ/10
www.photonics.ethz.ch 16
Molecule (λem~600nm)
Kühn et al., PRL 97, 017402 (2006)Au particle(80nm diam.)
Optical antennas – an intuitive approach
• assume an oscillating dipole close to a polarizable particle
• Assume that particle is small enough to be described as dipole
• Assume distance d<<λ, near field of source polarizes particle
• If polarizability α is large, antenna dipole largely exceeds source dipole
• Radiated power dominated by antenna dipole moment
www.photonics.ethz.ch 17
source
-+++-
-
antenna
Optical antenna is a dipole moment booster!
α
d
Optical antennas – a cleaner derivation
• Field at source is primary field + field generated by induced antenna dipole
• Assume source is close to particle (near-field terms dominate)
www.photonics.ethz.ch 18
Calculate rate enhancement via power enhancement
Source@ r0
-+++-
-
Antenna@ rant
α
d
Optical antennas – a cleaner derivation
• Field at source is primary field + field generated by induced antenna dipole
• Assume source is close to particle (near-field terms dominate)
• Close to source ReG along dipole axis diverges as 1/d³, ImG is constant
www.photonics.ethz.ch 19
Calculate rate enhancement via power enhancement
A=const.
Source@ r0
-+++-
-
Antenna@ rant
α
d
Optical antennas – a cleaner derivation
• Rate enhancement goes with the imaginary part of polarizability
• Rate enhancement goes with inverse source-antenna distance d-6
www.photonics.ethz.ch 20
Calculated rate enhancement (equals power enhancement):
Wait a minute! Didn’t we say earlier that the enhancement for a strong antenna should go as |α|²?True. But for a strong scatterer HW3
Source@ r0
-+++-
-
Antenna@ rant
α
d
Optical antennas …
• Modulate LDOS on sub-λ length scale
• Can boost decay rates of quantum emitters
• Can direct the emission of quantum emitters
• Rely on resonances in the polarizability of their constituents
www.photonics.ethz.ch 21
The polarizability of strong dipolar scatterers …
• has to take radiation effects into account
• depends on position within photonic system
The local density of optical states (LDOS) …
• Is (essentially) the imaginary part of the Green function
• Governs light-matter interaction, e.g.
• Determines the decay rate (enhancement) of quantum emitters
• Determines the linewidth of dipolar scatterers
• Determines the power dissipated by a classical constant-current source
www.photonics.ethz.ch 22
Photonic structures to control LDOS
• Modulate LDOS on a sub-λ scale
• Rely on resonances of conduction electrons of metal nanoparticles
• Rely on evanescent fields
www.photonics.ethz.ch 23
Optical antennas Micro-cavities
• Modulate LDOS on a λ scale
• Rely on interference of propagating waves
Fermi’s Golden Rule
Local Density of Optical States
Vah
ala,
Nat
ure
42
4,
83
9
Kü
hn
et a
l., P
RL
97
, 01
74
02
(2
00
6)
1. Because it is awesome!2. Some people like bright sources. Increase photon production rate of
emitter by LDOS enhancement.
3. Some people like efficient sources. Increase quantum efficiency of emitter by LDOS enhancement.
4. Some people like to investigate the excited states of quantum emitters. Increase lifetime of excited state by LDOS reduction.
www.photonics.ethz.ch 24
Why engineer the decay rate?
Engineering source brightness via LDOS
• How much light can we get out of a quantum emitter?
• Solve for steady state of rate equations
www.photonics.ethz.ch 25
Engineering source brightness via LDOS
• How much light can we get out of a quantum emitter with quantum efficiency QE?
• Solve for steady state of rate equations
www.photonics.ethz.ch 26
• Put emitter into system with LDOS enhancement A
Limit of strong pumping:Limit of weak pumping and high QE:
Limit of weak pumping and low QE:
Micro-cavities in the 21st century - micropillars
Vahala, Nature 424, 839
www.photonics.ethz.ch 27
LDOSenhancement