Book contents
- Frontmatter
- Contents
- Preface
- 1 Central concepts in classical mechanics
- 2 Central concepts in classical electromagnetism
- 3 Central concepts in quantum mechanics
- 4 Central concepts in stationary quantum theory
- 5 Central concepts in measurement theory
- 6 Wigner's phase-space representation
- 7 Hamiltonian formulation of classical electrodynamics
- 8 System Hamiltonian of classical electrodynamics
- 9 System Hamiltonian in the generalized Coulomb gauge
- 10 Quantization of light and matter
- 11 Quasiparticles in semiconductors
- 12 Band structure of solids
- 13 Interactions in semiconductors
- 14 Generic quantum dynamics
- 15 Cluster-expansion representation of the quantum dynamics
- 16 Simple many-body systems
- 17 Hierarchy problem for dipole systems
- 18 Two-level approximation for optical transitions
- 19 Self-consistent extension of the two-level approach
- 20 Dissipative extension of the two-level approach
- 21 Quantum-optical extension of the two-level approach
- 22 Quantum dynamics of two-level system
- 23 Spectroscopy and quantum-optical correlations
- 24 General aspects of semiconductor optics
- 25 Introductory semiconductor optics
- 26 Maxwell-semiconductor Bloch equations
- 27 Coherent vs. incoherent excitons
- 28 Semiconductor luminescence equations
- 29 Many-body aspects of excitonic luminescence
- 30 Advanced semiconductor quantum optics
- Appendix Conservation laws for the transfer matrix
- Index
- References
29 - Many-body aspects of excitonic luminescence
Published online by Cambridge University Press: 05 January 2012
- Frontmatter
- Contents
- Preface
- 1 Central concepts in classical mechanics
- 2 Central concepts in classical electromagnetism
- 3 Central concepts in quantum mechanics
- 4 Central concepts in stationary quantum theory
- 5 Central concepts in measurement theory
- 6 Wigner's phase-space representation
- 7 Hamiltonian formulation of classical electrodynamics
- 8 System Hamiltonian of classical electrodynamics
- 9 System Hamiltonian in the generalized Coulomb gauge
- 10 Quantization of light and matter
- 11 Quasiparticles in semiconductors
- 12 Band structure of solids
- 13 Interactions in semiconductors
- 14 Generic quantum dynamics
- 15 Cluster-expansion representation of the quantum dynamics
- 16 Simple many-body systems
- 17 Hierarchy problem for dipole systems
- 18 Two-level approximation for optical transitions
- 19 Self-consistent extension of the two-level approach
- 20 Dissipative extension of the two-level approach
- 21 Quantum-optical extension of the two-level approach
- 22 Quantum dynamics of two-level system
- 23 Spectroscopy and quantum-optical correlations
- 24 General aspects of semiconductor optics
- 25 Introductory semiconductor optics
- 26 Maxwell-semiconductor Bloch equations
- 27 Coherent vs. incoherent excitons
- 28 Semiconductor luminescence equations
- 29 Many-body aspects of excitonic luminescence
- 30 Advanced semiconductor quantum optics
- Appendix Conservation laws for the transfer matrix
- Index
- References
Summary
In the previous chapter, we have already discussed that the microscopic origin of spontaneous light emission in semiconductors is significantly more complicated than for the atomistic situation where a single entity, i.e., an isolated electron–ion pair, emits a photon. In the artificial situation of a purely excitonic population without any Fermionic substructure, all the plasma contributions vanish and the semiconductor luminescence equations (SLE) predict that, e.g., the emission at the 1s energy stems only from the 1s-exciton population. The very same conclusion follows from the simplified atomic picture analyzed in Chapters 16–23 because the isolated atomic entities are uniquely defined by their eigenstates |φλ〉 and the eigenenergies Eλ. For example, the two-level luminescence Eq. (23.44) yields an emission that is proportional to the population of the excited state.
In reality, the semiconductor excitations are hardly ever dilute enough for the electron–hole pairs to be treated as isolated entities. Instead, the excited quasiparticles interact collectively with the emitted photons. Consequently, it is not justified to omit the Fermionic aspects from Eq. (28.47). In addition, semiconductors with a continuous band structure always have a much greater number of available plasma than exciton states and both of them usually contribute to the excitonic luminescence.
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- Information
- Semiconductor Quantum Optics , pp. 593 - 607Publisher: Cambridge University PressPrint publication year: 2011