Quantum dynamics of electrons in a molecular segment with phonon interaction

Gayen, Taposh; McDowell, Keith; Burns, Allassia

doi:10.1063/1.480977

Cited by 3 publications

(3 citation statements)

References 89 publications

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“…In particular, we showed that the reduced system density matrix of an N -level condensed-phase system can be obtained as a linear combination of N 2 time-dependent functions, which can be calculated exactly for certain types of baths and system−bath couplings. This technique has been used recently by Cook, Evans, and Coalson to study non-Condon effects in condensed-phase electron transfer and constitutes a generalization of simpler Hamiltonians discussed by Creechly and Dahnovsky and Gayen et al in a different context.…”

Section: Introductionmentioning

confidence: 99%

Condensed-Phase Relaxation of Multilevel Quantum Systems. I. An Exactly Solvable Model

2006

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An analytically solvable model of multilevel condensed-phase quantum dynamics relevant to vibrational relaxation and electron transfer is presented. Exact solutions are derived for the reduced system density matrix dynamics of a degenerate N-level quantum system characterized by nearest-neighbor hopping and off-diagonal coupling (which is linear in the bath coordinates) to a harmonic oscillator bath. We demonstrate that for N> 2 the long-time steady-state system site occupation probabilities are not the same for all sites; that is, they are distributed in a non-Boltzmann manner, which depends on the initial conditions and the number of levels in the system. Although the system-bath Hamiltonian considered here is restricted in form, the availability of an exact solution enables us to study the model in all regions of an extensive parameter space.

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Section: Introductionmentioning

confidence: 99%

Condensed-Phase Relaxation of Multilevel Quantum Systems. I. An Exactly Solvable Model

2006

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“…This particular non-Condon electron transfer Hamiltonian , is a special case of a more general class of nontrivial N -level Hamiltonians coupled to a dissipative environment (or bath) for which the time evolution of the composite quantum many-body system can be calculated exactly. In fact, we − and others − have shown that for this general class of Hamiltonians, the exact time dependence of the reduced system dynamics of the N -level system can be determined. It should be noted that this general class of Hamiltonians includes a very specific form for the system−bath coupling term, which means that these exactly solvable Hamiltonians are limited to a special region of parameter space.…”

Section: Introductionmentioning

confidence: 89%

“…Chem exactly. In fact, we [32][33][34][35] and others [42][43][44] have shown that for this general class of Hamiltonians, the exact time dependence of the reduced system dynamics of the N-level system can be determined. It should be noted that this general class of Hamiltonians includes a very specific form for the system-bath coupling term, which means that these exactly solvable Hamiltonians are limited to a special region of parameter space.…”

Section: Introductionmentioning

confidence: 99%

Effectiveness of Perturbation Theory Approaches for Computing Non-Condon Electron Transfer Dynamics in Condensed Phases

2009

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A description of electron transfer in condensed-phase media requires models that adequately describe the coupling of the electronic degrees of freedom to the surrounding nuclear coordinates. The spin-boson model has been the canonical model used to understand quantum dynamic processes in condensed-phase media over the last 25 years. Inherent in the standard model of a two-state quantum system coupled to a bosonic bath is the assumption that the Condon approximation is valid. In this context, the Condon approximation assumes that the bath configurations (coordinates) have no effect on the nonadiabatic coupling matrix element. While this is a useful model for electron transfer in small molecular systems, the validity of this approximation is less likely when large-scale motions of solvent molecules are strongly coupled to the electron transfer event, e.g., in molecular clamps and long-range electron transfer in biopolymers. In the present paper a general model for two-state electron transfer which allows for system-bath coupling in both the diagonal and off-diagonal (nonadiabatic) terms is studied. Time-dependent perturbation theory for this Hamiltonian is developed using a small polaron transformation. As noted in several recent studies, in a certain regime of parameter space, the relevant Hamiltonian admits an exact solution, termed the exactly solvable non-Condon Hamiltonian (or NCE). This limit, for which exact solutions are available, is used to benchmark the short- and long-time accuracy of various perturbative approaches. The validated perturbation equations are subsequently used to explore the role of non-Condon effects on electron transfer by systematically increasing the strength of the non-Condon coupling term from zero (i.e., the canonical spin-boson model) to the value that pertains to the exactly solvable non-Condon model (where non-Condon effects are significant).

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Condensed phase vibrational relaxation: calibration of approximate relaxation theories with analytical and numerically exact results

Coalson

Evans

2004

Chemical Physics

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Quantum dynamics of electrons in a molecular segment with phonon interaction

Cited by 3 publications

References 89 publications

Condensed-Phase Relaxation of Multilevel Quantum Systems. I. An Exactly Solvable Model

Condensed-Phase Relaxation of Multilevel Quantum Systems. I. An Exactly Solvable Model

Effectiveness of Perturbation Theory Approaches for Computing Non-Condon Electron Transfer Dynamics in Condensed Phases

Condensed phase vibrational relaxation: calibration of approximate relaxation theories with analytical and numerically exact results

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