Nonadiabatic quantum transition-state theory in the golden-rule limit. I. Theory and application to model systems

Thapa, Manish; Fang, Wei; Richardson, Jeremy O.

doi:10.1063/1.5081108

Cited by 25 publications

(84 citation statements)

References 132 publications

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“…In contrast, as we have shown in Ref. 40, GR-QTST always reduces to the correct classical expression (Eqn. (9)) in the high-temperature limit where the ring polymer collapses.…”

Section: Methodsmentioning

confidence: 54%

“…However, we could show the unsuitability of this assumption by comparing Wolynes theory 32 and our newly developed GR-QTST. 40,41 In an earlier study it was observed that GR-QTST and Wolynes theory predict the same rate for a spin-boson model in the quantum limit. 40 In contrast to this, the two theories predict quantum correction factors that differ by a factor of 6 for the atomistic system, therefore making it impossible to argue that a spin-boson model is a good approximation in this case.…”

Section: Discussionmentioning

confidence: 94%

“…Our aim is to quantify the quantum effects present in the aqueous ferrous-ferric system and thereby to address the controversy of the magnitude of the effect of quantum tunnelling on the reaction rate. In this section we present results from both Wolynes theory and our newly developed GR-QTST 40,41 and discuss the predictions for rate constants and isotope effects from these two different approaches. We investigate possible pitfalls of each theory and discuss how they affect the rate of this system.…”

Section: Resultsmentioning

confidence: 99%

“…59 This constraint is automatically obeyed by all instantons, which ensures a strong connection to instanton theory, and it also retains the correct classical limit. GR-QTST has been shown to perform very well for model systems in both the normal and inverted regimes, 40 including the multidimensional spin-boson model. GR-QTST was also investigated for systems with multiple transition states, where Wolynes theory breaks, and provides accurate rate predictions.…”

Section: Introductionmentioning

confidence: 99%

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Revisiting nuclear tunnelling in the aqueous ferrous–ferric electron transfer

Fang

Zarotiadis

Richardson

2020

Phys. Chem. Chem. Phys.

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The aqueous ferrous-ferric system provides a classic example of an electron-transfer process in solution. There has been a long standing argument spanning more than three decades around the importance of nuclear tunnelling in this system, with estimates based on Wolynes theory suggesting a quantum correction factor of 65, while estimates based on a related spin-boson model suggest a smaller factor of 7-36. Recently, we have shown that Wolynes theory can break down for systems with multiple transition states leading to an overestimation of the rate, and we suggest that a liquid system such as the one investigated here may be particularly prone to this. We re-investigate this old yet interesting system with the first application of the recently developed golden-rule quantum transition-state theory (GR-QTST). We find that GR-QTST can be applied to this complex system without apparent difficulties and that it gives a prediction for the quantum rate 6 times smaller than that from Wolynes theory. The fact that these theories give different results suggests that although it is well known that the system can be treated using linear response and therefore resembles a spin-boson model in the classical limit, this approximation is questionable in the quantum case. It also intriguingly suggests the possibility that the previous predictions were overestimating the rate due to a break down of Wolynes theory.Semiclassical instanton rate theory 22-24 predicts the tunnelling rate and mechanism via locating the optimal tunnelling pathway (the instanton) defined by a stationary-action principle. Based on a similar first-principles derivation as in the normal regime, 25,26 instanton theory has been extended to treat electron-transfer reactions 27-29 in both the normal and inverted regimes. 30 It has the most rigorous derivation of the methods discussed in this paper, shows excellent agreement with exact methods on model systems and is well suited for gas-phase electron-transfer reactions. How-J o u r n a l N a me , [ y e a r ] , [ v o l . ] , 1-12 | 1 arXiv:1912.09811v2 [physics.chem-ph] 3 Feb 2020 2 | 1-12 J o u r n a l N a me , [ y e a r ] , [ v o l . ] , aqueous ferrous-ferric electron transfer. AbstractIn this supporting information we provide further details of the simulations reported in the manuscript and additional discussions in support of the conclusions reached. * These authors contributed equally †

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“…In contrast, as we have shown in Ref. 40, GR-QTST always reduces to the correct classical expression (Eqn. (9)) in the high-temperature limit where the ring polymer collapses.…”

Section: Methodsmentioning

confidence: 54%

Section: Discussionmentioning

confidence: 94%

Section: Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Revisiting nuclear tunnelling in the aqueous ferrous–ferric electron transfer

Fang

Zarotiadis

Richardson

2020

Phys. Chem. Chem. Phys.

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“…Nonetheless, a good understanding of the instanton paths has helped in the development of a number of methods based on path-integral sampling which are applicable to reactions in solution. 61,62,104 We hope that the information obtained on the instanton in this work will help derive novel path-integral-based rate theories which can describe the inverted regime more rigorously.…”

Section: Discussionmentioning

confidence: 94%

Instanton formulation of Fermi’s golden rule in the Marcus inverted regime

Heller

Richardson

2020

The Journal of Chemical Physics

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Fermi's golden rule defines the transition rate between weakly coupled states and can thus be used to describe a multitude of molecular processes including electron-transfer reactions and light-matter interaction. However, it can only be calculated if the wave functions of all internal states are known, which is typically not the case in molecular systems. Marcus theory provides a closed-form expression for the rate constant, which is a classical limit of the golden rule, and indicates the existence of a normal regime and an inverted regime. Semiclassical instanton theory presents a more accurate approximation to the golden-rule rate including nuclear quantum effects such as tunnelling, which has so far been applicable to complex anharmonic systems in the normal regime only. In this paper we extend the instanton method to the inverted regime and study the properties of the periodic orbit, which describes the tunnelling mechanism via two imaginary-time trajectories, one of which now travels in negative imaginary time. It is known that tunnelling is particularly prevalent in the inverted regime, even at room temperature, and thus this method is expected to be useful in studying a wide range of molecular transitions occurring in this regime.

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Polariton-Mediated Electron Transfer via Cavity Quantum Electrodynamics

2020

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We investigate the polariton mediated electron transfer reaction in a model system. With analytic rate constant expression and direct quantum dynamical simulations, we demonstrate that charge transfer reactions can be significantly enhanced or suppressed by coupling the molecular system to the quantized radiation field inside an optical cavity. This is due to the fact that quantum light-matter interactions can mediate the effective driving force and electronic couplings between the hybrid light-matter excitation (so-called the polariton states). Under a resonance condition, the effective driving force can be tuned by changing the light-matter coupling strength; for an off-resonant condition, the same effect can be accomplished by changing the molecule-cavity detuning. Forming polaritons thus provides new possibilities to control the fundamental photo-redox chemistry. Further, we find that both the counter-rotating terms and the dipole self-energy in the quantum electrodynamics Hamiltonian play a crucial role for obtaining an accurate polariton eigenenergy and the polariton mediated charge transfer rate constant, especially in the ultra-strong coupling regime. These investigations significantly complement the previous theoretical developments that ignore both terms, and bring interesting concepts from quantum optics into the field of photochemistry.

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Nonadiabatic quantum transition-state theory in the golden-rule limit. I. Theory and application to model systems

Cited by 25 publications

References 132 publications

Revisiting nuclear tunnelling in the aqueous ferrous–ferric electron transfer

Revisiting nuclear tunnelling in the aqueous ferrous–ferric electron transfer

Instanton formulation of Fermi’s golden rule in the Marcus inverted regime

Polariton-Mediated Electron Transfer via Cavity Quantum Electrodynamics

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