Fermi's golden rule
In quantum physics, Fermi's golden rule is a formula that describes the transition rate (the probability of a transition per unit time) from one energy eigenstate of a quantum system to a group of energy eigenstates in a continuum, as a result of a weak perturbation. This transition rate is effectively independent of time (so long as the strength of the perturbation is independent of time) and is proportional to the strength of the coupling between the initial and final states of the system (described by the square of the matrix element of the perturbation) as well as the density of states. It is also applicable when the final state is discrete, i.e. it is not part of a continuum, if there is some decoherence in the process, like relaxation or collision of the atoms, or like noise in the perturbation, in which case the density of states is replaced by the reciprocal of the decoherence bandwidth.
Historical background
Although the rule is named after Enrico Fermi, most of the work leading to it is due to Paul Dirac, who twenty years earlier had formulated a virtually identical equation, including the three components of a constant, the matrix element of the perturbation and an energy difference.[1][2] It was given this name because, on account of its importance, Fermi called it "golden rule No. 2".[3]
Most uses of the term Fermi's golden rule are referring to "golden rule No. 2", but Fermi's "golden rule No. 1" is of a similar form and considers the probability of indirect transitions per unit time.[4]
The rate and its derivation
Fermi's golden rule describes a system that begins in an eigenstate of an unperturbed Hamiltonian H0 and considers the effect of a perturbing Hamiltonian H' applied to the system. If H' is time-independent, the system goes only into those states in the continuum that have the same energy as the initial state. If H' is oscillating sinusoidally as a function of time (i.e. it is a harmonic perturbation) with an angular frequency ω, the transition is into states with energies that differ by ħω from the energy of the initial state.
In both cases, the transition probability per unit of time from the initial state to a set of final states is essentially constant. It is given, to first-order approximation, by
where is the matrix element (in bra–ket notation) of the perturbation H' between the final and initial states, and is the density of states (number of continuum states divided by in the infinitesimally small energy interval to ) at the energy of the final states. This transition probability is also called "decay probability" and is related to the inverse of the mean lifetime. Thus, the probability of finding the system in state is proportional to .
The standard way to derive the equation is to start with time-dependent perturbation theory and to take the limit for absorption under the assumption that the time of the measurement is much larger than the time needed for the transition.[5][6]
Derivation in time-dependent perturbation theory | |
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Statement of the problemThe golden rule is a straightforward consequence of the Schrödinger equation, solved to lowest order in the perturbation H' of the Hamiltonian. The total Hamiltonian is the sum of an “original” Hamiltonian H0 and a perturbation: . In the interaction picture, we can expand an arbitrary quantum state’s time evolution in terms of energy eigenstates of the unperturbed system , with . Discrete spectrum of final statesWe first consider the case where the final states are discrete. The expansion of a state in the perturbed system at a time t is . The coefficients an(t) are yet unknown functions of time yielding the probability amplitudes in the Dirac picture. This state obeys the time-dependent Schrödinger equation: Expanding the Hamiltonian and the state, we see that, to first order, where En and |n⟩ are the stationary eigenvalues and eigenfunctions of H0. This equation can be rewritten as a system of differential equations specifying the time evolution of the coefficients : This equation is exact, but normally cannot be solved in practice. For a weak constant perturbation H' that turns on at t = 0, we can use perturbation theory. Namely, if , it is evident that , which simply says that the system stays in the initial state . For states , becomes non-zero due to , and these are assumed to be small due to the weak perturbation. The coefficient which is unity in the unperturbed state, will have a weak contribution from . Hence, one can plug in the zeroth-order form into the above equation to get the first correction for the amplitudes : whose integral can be expressed as with , for a state with ai(0) = 1, ak(0) = 0, transitioning to a state with ak(t). The probability of transition from the initial state (ith) to the final state (fth) is given by It is important to study a periodic perturbation with a given frequency since arbitrary perturbations can be constructed from periodic perturbations of different frequencies. Since must be Hermitian, we must assume , where is a time independent operator. The solution for this case is[7] This expression is valid only when the denominators in the above expression is non-zero, i.e., for a given initial state with energy , the final state energy must be such that Not only the denominators must be non-zero, but also must not be small since is supposed to be small. Consider now the case where the perturbation frequency is such that where is a small quantity. Unlike the previous case, not all terms in the sum over in the above exact equation for matters, but depends only on and vice versa. Thus, omitting all other terms, we can write The two independent solutions are where and the constants and are fixed by the normalization condition. If the system at is in the state, then the probability of finding the system in the state is given by which is a periodic function with frequency ; this function varies between and . At the exact resonance, i.e., , the above formula reduces to which varies periodically between and , that is to say, the system periodically switches from one state to the other. The situation is different if the final states are in the continuous spectrum. Continuous spectrum of final statesSince the continuous spectrum lies above the discrete spectrum, and it is clear from the previous section, major role is played by the energies lying near the resonance energy , i.e., when . In this case, it is sufficient to keep only the first term for . Assuming that perturbations are turned on from time , we have then The squared modulus of is Therefore, the transition probability per unit time, for large t, is given by Note that the delta function in the expression above arises due to the following argument. Defining the time derivative of is , which behaves like a delta function at large t (more more information, please see Sinc function#Relationship to the Dirac delta distribution). The constant decay rate of the golden rule follows.[8] As a constant, it underlies the exponential particle decay laws of radioactivity. (For excessively long times, however, the secular growth of the ak(t) terms invalidates lowest-order perturbation theory, which requires ak ≪ ai.) |
Only the magnitude of the matrix element enters the Fermi's golden rule. The phase of this matrix element, however, contains separate information about the transition process. It appears in expressions that complement the golden rule in the semiclassical Boltzmann equation approach to electron transport.[9]
While the Golden rule is commonly stated and derived in the terms above, the final state (continuum) wave function is often rather vaguely described, and not normalized correctly (and the normalisation is used in the derivation). The problem is that in order to produce a continuum there can be no spatial confinement (which would necessarily discretise the spectrum), and therefore the continuum wave functions must have infinite extent, and in turn this means that the normalisation is infinite, not unity. If the interactions depend on the energy of the continuum state, but not any other quantum numbers, it is usual to normalise continuum wave-functions with energy labelled , by writing where is the Dirac delta function, and effectively a factor of the square-root of the density of states is included into .[10] In this case, the continuum wave function has dimensions of , and the Golden Rule is now
where refers to the continuum state with the same energy as the discrete state . For example, correctly normalized continuum wave functions for the case of a free electron in the vicinity of a hydrogen atom are available in Bethe and Salpeter.[11]
The following paraphrases the treatment of Cohen-Tannoudji.[10] As before, the total Hamiltonian is the sum of an “original” Hamiltonian H0 and a perturbation: . We can still expand an arbitrary quantum state’s time evolution in terms of energy eigenstates of the unperturbed system, but these now consist of discrete states and continuum states. We assume that the interactions depend on the energy of the continuum state, but not any other quantum numbers. The expansion in the relevant states in the Dirac picture is
where , and are the energies of states . The integral is over the continuum , i.e. is in the continuum.
Substituting into the time-dependent Schrödinger equation
and premultiplying by produces
where , and premultiplying by produces
We made use of the normalisation . Integrating the latter and substituting into the former,
It can be seen here that at time depends on at all earlier times , i.e. it is non-Markovian. We make the Markov approximation, i.e. that it only depends on at time (which is less restrictive than the approximation that used above, and allows the perturbation to be strong)
where and . Integrating over ,
The fraction on the right is a nascent Dirac delta function, meaning it tends to as (ignoring its imaginary part which leads to an unimportant energy shift, while the real part produces decay [10]). Finally
which has solutions: , i.e., the decay of population in the initial discrete state is where
Applications
Semiconductors
The Fermi golden rule can be used for calculating the transition probability rate for an electron that is excited by a photon from the valence band to the conduction band in a direct band-gap semiconductor, and also for when the electron recombines with the hole and emits a photon.[12] Consider a photon of frequency and wavevector , where the light dispersion relation is and is the index of refraction.
Using the Coulomb gauge where and , the vector potential of the EM wave is given by where the resulting electric field is
For a charged particle in the valence band, the Hamiltonian is
where is the potential of the crystal. If our particle is an electron () and we consider process involving one photon and first order in . The resulting Hamiltonian is
where is the perturbation of the EM wave.
From here on we have transition probability based on time-dependent perturbation theory that
where is the light polarization vector. From perturbation it is evident that the heart of the calculation lies in the matrix elements shown in the bracket.
For the initial and final states in valence and conduction bands respectively, we have and , and if the operator does not act on the spin, the electron stays in the same spin state and hence we can write the wavefunctions as Bloch waves so
where is the number of unit cells with volume . Using these wavefunctions and with some more mathematics, and focusing on emission (photoluminescence) rather than absorption, we are led to the transition rate
where is the transition dipole moment matrix element is qualitatively the expectation value and in this situation takes the form
Finally, we want to know the total transition rate . Hence we need to sum over all initial and final states (i.e. an integral of the Brillouin zone in the k-space), and take into account spin degeneracy, which through some mathematics results in
where is the joint valence-conduction density of states (i.e. the density of pair of states; one occupied valence state, one empty conduction state). In 3D, this is
but the joint DOS is different for 2D, 1D, and 0D.
Finally we note that in a general way we can express the Fermi golden rule for semiconductors as[13]
Scanning tunneling microscopy
In a scanning tunneling microscope, the Fermi golden rule is used in deriving the tunneling current. It takes the form
where is the tunneling matrix element.
Quantum optics
When considering energy level transitions between two discrete states, Fermi's golden rule is written as
where is the density of photon states at a given energy, is the photon energy, and is the angular frequency. This alternative expression relies on the fact that there is a continuum of final (photon) states, i.e. the range of allowed photon energies is continuous.[14]
Drexhage experiment
Fermi's golden rule predicts that the probability that an excited state will decay depends on the density of states. This can be seen experimentally by measuring the decay rate of a dipole near a mirror: as the presence of the mirror creates regions of higher and lower density of states, the measured decay rate depends on the distance between the mirror and the dipole.[15][16]
See also
- Exponential decay – Decrease in value at a rate proportional to the current value
- List of things named after Enrico Fermi
- Particle decay – Spontaneous breakdown of an unstable subatomic particle into other particles
- Sinc function – Special mathematical function defined as sin(x)/x
- Time-dependent perturbation theory – Approximate modelling of a quantum system
- Sargent's rule
References
- Bransden, B. H.; Joachain, C. J. (1999). Quantum Mechanics (2nd ed.). Prentice Hall. p. 443. ISBN 978-0582356917.
- Dirac, P. A. M. (1 March 1927). "The Quantum Theory of Emission and Absorption of Radiation". Proceedings of the Royal Society A. 114 (767): 243–265. Bibcode:1927RSPSA.114..243D. doi:10.1098/rspa.1927.0039. JSTOR 94746. See equations (24) and (32).
- Fermi, E. (1950). Nuclear Physics. University of Chicago Press. ISBN 978-0226243658. formula VIII.2
- Fermi, E. (1950). Nuclear Physics. University of Chicago Press. ISBN 978-0226243658. formula VIII.19
- R Schwitters' UT Notes on Derivation.
- It is remarkable in that the rate is constant and not linearly increasing in time, as might be naively expected for transitions with strict conservation of energy enforced. This comes about from interference of oscillatory contributions of transitions to numerous continuum states with only approximate unperturbed energy conservation, see Wolfgang Pauli, Wave Mechanics: Volume 5 of Pauli Lectures on Physics (Dover Books on Physics, 2000) ISBN 0486414620, pp. 150–151.
- Landau, L. D., & Lifshitz, E. M. (2013). Quantum mechanics: non-relativistic theory (Vol. 3). Elsevier.
- Merzbacher, Eugen (1998). "19.7" (PDF). Quantum Mechanics (3rd ed.). Wiley, John & Sons, Inc. ISBN 978-0-471-88702-7.
- N. A. Sinitsyn, Q. Niu and A. H. MacDonald (2006). "Coordinate Shift in Semiclassical Boltzmann Equation and Anomalous Hall Effect". Phys. Rev. B. 73 (7): 075318. arXiv:cond-mat/0511310. Bibcode:2006PhRvB..73g5318S. doi:10.1103/PhysRevB.73.075318. S2CID 119476624.
- Cohen-Tannoudji, Claude; Diu, Bernard; Laloë, Franck (1977). Quantum Mechanics Vol II Chapter XIII Complement D_{XIII}. Wiley. ISBN 978-0471164333.
- Bethe, Hans; Salpeter, Edwin (1977). Quantum Mechanics of One- and Two-Electron Atoms. Springer, Boston, MA. ISBN 978-0-306-20022-9.
- Yu, Peter Y.; Cardona, Manuel (2010). Fundamentals of Semiconductors - Physics and Materials Properties (4 ed.). Springer. p. 260. doi:10.1007/978-3-642-00710-1. ISBN 978-3-642-00709-5.
- Edvinsson, T. (2018). "Optical quantum confinement and photocatalytic properties in two-, one- and zero-dimensional nanostructures". Royal Society Open Science. 5 (9): 180387. Bibcode:2018RSOS....580387E. doi:10.1098/rsos.180387. ISSN 2054-5703. PMC 6170533. PMID 30839677.
- Fox, Mark (2006). Quantum Optics: An Introduction. Oxford: Oxford University Press. p. 51. ISBN 9780198566731.
- K. H. Drexhage; H. Kuhn; F. P. Schäfer (1968). "Variation of the Fluorescence Decay Time of a Molecule in Front of a Mirror". Berichte der Bunsengesellschaft für physikalische Chemie. 72 (2): 329. doi:10.1002/bbpc.19680720261. S2CID 94677437.
- K. H. Drexhage (1970). "Influence of a dielectric interface on fluorescence decay time". Journal of Luminescence. 1: 693–701. Bibcode:1970JLum....1..693D. doi:10.1016/0022-2313(70)90082-7.