Add to ORKGThe analytical bounce solution is derived in terms of the polygamma function in the Caldeira-Leggett's dissipative quantum tunneling model. The classical action for the bounce solution lies between the upper and lower bounds in the full range of $\alpha$, where $\alpha$ is a dissipation coefficient. The bounce peak point increases from 1 to 4/3 with increase of $\alpha$. In spite of various nice features we have shown that the solution we have derived is not exact one by making use of the zero mode argument in the linearized fluctuation equation. However, our solution can be a starting point for approximate computation of the prefactor in this model
For a scalar theory whose classical scale invariance is broken by quantum effects, we compute self-c...
International audienceA closed form of the disentangling theorem is used to derive an exact expressi...
Macroscopic quantum tunnelling is described using the master equation for the reduced Wigner functio...
Abstract We generalize the string method, originally designed for the study of thermally activated r...
Effects on the spectra of the quantum bouncer due to dissipation are given when a linear o quadratic...
Abstract: The periodic bounce configurations responsible for quantum tunneling are obtained explicit...
The nature of the transition from the quantum tunneling regime to the thermal hopping regime has imp...
We discuss the time development of Gaussian wave packet solutions of the quantum bouncer' (a quantum...
We study tunneling in one-dimensional quantum mechanics using the path integral in real time, where ...
The energy loss due to a quadratic velocity-dependent force on a quantum particle bouncing off a per...
The quantum decay of a metastable vacuum is exponentially suppressed by a tunneling action that can ...
The quantum decay of a metastable vacuum is exponentially suppressed by a tunneling action that can ...
We study the escape rate of a particle in a metastable potential in presence of a dissipative bath c...
We follow up the work, where in light of the Picard-Lefschetz thimble approach, we split up the real...
The Wheeler-DeWitt equation is investigated and used to examine a state after a quantum tunneling wi...
For a scalar theory whose classical scale invariance is broken by quantum effects, we compute self-c...
International audienceA closed form of the disentangling theorem is used to derive an exact expressi...
Macroscopic quantum tunnelling is described using the master equation for the reduced Wigner functio...
Abstract We generalize the string method, originally designed for the study of thermally activated r...
Effects on the spectra of the quantum bouncer due to dissipation are given when a linear o quadratic...
Abstract: The periodic bounce configurations responsible for quantum tunneling are obtained explicit...
The nature of the transition from the quantum tunneling regime to the thermal hopping regime has imp...
We discuss the time development of Gaussian wave packet solutions of the quantum bouncer' (a quantum...
We study tunneling in one-dimensional quantum mechanics using the path integral in real time, where ...
The energy loss due to a quadratic velocity-dependent force on a quantum particle bouncing off a per...
The quantum decay of a metastable vacuum is exponentially suppressed by a tunneling action that can ...
The quantum decay of a metastable vacuum is exponentially suppressed by a tunneling action that can ...
We study the escape rate of a particle in a metastable potential in presence of a dissipative bath c...
We follow up the work, where in light of the Picard-Lefschetz thimble approach, we split up the real...
The Wheeler-DeWitt equation is investigated and used to examine a state after a quantum tunneling wi...
For a scalar theory whose classical scale invariance is broken by quantum effects, we compute self-c...
International audienceA closed form of the disentangling theorem is used to derive an exact expressi...
Macroscopic quantum tunnelling is described using the master equation for the reduced Wigner functio...