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Mixing of Frenkel and Charge-Transfer Excitons and Their Quantum Confinement in Thin Films
in V. M. Agranovich and G. F. Bassani, Electronic Excitations in Organic Multilayers and Organic Based Heterostructures (Volume 31 of Thin Films and Nanostructures), pp. 221-292, Elsevier, Amsterdam, 2003
(page numbers refer to manuscript version for download)
| 1 | Introduction | 2 |
| 2 | Electronic Frenkel and charge-transfer excitons in rigid one-dimensional crystals | 7 |
| 2.1 | Localized basis states in real and momentum space | 7 |
| 2.2 | Model Hamiltonians for Frenkel and charge-transfer states | 9 |
| 2.3 | Characters and transition dipoles of the eigenstates | 16 |
| 2.4 | Direction of charge-transfer transition dipoles | 20 |
| 3 | Strong coupling of the electronic excitations with internal phonon modes | 25 |
| 3.1 | Exciton-phonon coupling in the isolated molecule | 25 |
| 3.2 | The Holstein-Hamiltonian for exciton-phonon coupling | 29 |
| 3.3 | Basis functions for numerical diagonalization | 30 |
| 3.4 | Transition dipoles and phonon clouds of the eigenstates | 34 |
| 3.5 | Truncated phonon basis and symmetry adaptation | 38 |
| 3.6 | The limit for weak intermolecular electronic coupling | 40 |
| 3.7 | Numerical solutions for various electronic coupling strengths | 44 |
| 3.8 | The Holstein Hamiltonian with charge-transfer states | 47 |
| 4 | Applications and consequences for quantum confinement | 53 |
| 4.1 | Description of PTCDA-derivatives | 53 |
| 4.2 | Inclusion of finite size and quantum confinement effects | 59 |
| 5 | Conclusion | 65 |
| 6 | Acknowledgments | 66 |
Illustrational Example: Fig. 14
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This figure gives on overview of band structures in the Holstein model for fixed exciton phonon coupling constant
g = 1 and various exciton hopping integrals J. The four panels (a) - (d) show the transition from the molecular limit (J=0) to the adiabatic limit (illustrated by J = 2 hbar omega). The electronic bands E(k) are shown in the center of each panel. The spectra on the left side of each panel (for k = 0) correspond to absorption spectr |