Add to ORKGWe study the dynamical quantum phase transition(DQPT) of the Bose-Hubbard model utilizing recently developed Loschmidt cumulants method. We determine the complex Loschmidt zeros of the Loschmidt amplitude analogous to the Lee-Yang zeros of the thermal partition function. We obtain the DQPT critical points through identifying the crossing points with the imaginary axis. The critical points show high accuracy when compared to those obtained using the matrix product states method. In addition, we show that how the critical points of DQPT can be determined by analyzing the energy fluctuation of the initial state, making it a valuable tool for future studies in this area. Finally, DQPT in the extended Bose-Hubbaed model is also investigated
During recent years the interest to dynamics of quantum systems has grown considerably. Quantum many...
Quantum phase transitions universally exist in the ground and excited states of quantum many-body sy...
We investigate the orthogonality catastrophe and quantum speed limit in the Creutz model for dynamic...
Dynamical phase transitions extend the notion of criticality to nonstationary settings and are chara...
Dynamical quantum phase transitions are at the forefront of current efforts to understand quantum ma...
The Loschmidt echo is a purely quantum-mechanical quantity whose determination for large quantum man...
Dynamical quantum phase transitions are at the forefront of current efforts to understand quantum ma...
Non-equilibrium dynamics of an isolated quantum system driven through a quantum critical point shows...
The development of ultracold atom physics enables people to study fundamental questions in quantum m...
We investigate the nonequilibrium behavior of a fully connected (or all-to-all coupled) Bose-Hubbard...
The fast progress of cold atoms experiments in the last decade has allowed to explore new aspects of...
Dynamical quantum phase transitions (DQPTs) are criticalities in the time evolution of quantum syste...
We develop the nonequilibrium extension of bosonic dynamical mean-field theory and a Nambu real-time...
We study the slow quenching dynamics (characterized by an inverse rate τ−1) of a one-dimensional tra...
We investigate the dynamics of the rate function and of local observables after a quench in models w...
During recent years the interest to dynamics of quantum systems has grown considerably. Quantum many...
Quantum phase transitions universally exist in the ground and excited states of quantum many-body sy...
We investigate the orthogonality catastrophe and quantum speed limit in the Creutz model for dynamic...
Dynamical phase transitions extend the notion of criticality to nonstationary settings and are chara...
Dynamical quantum phase transitions are at the forefront of current efforts to understand quantum ma...
The Loschmidt echo is a purely quantum-mechanical quantity whose determination for large quantum man...
Dynamical quantum phase transitions are at the forefront of current efforts to understand quantum ma...
Non-equilibrium dynamics of an isolated quantum system driven through a quantum critical point shows...
The development of ultracold atom physics enables people to study fundamental questions in quantum m...
We investigate the nonequilibrium behavior of a fully connected (or all-to-all coupled) Bose-Hubbard...
The fast progress of cold atoms experiments in the last decade has allowed to explore new aspects of...
Dynamical quantum phase transitions (DQPTs) are criticalities in the time evolution of quantum syste...
We develop the nonequilibrium extension of bosonic dynamical mean-field theory and a Nambu real-time...
We study the slow quenching dynamics (characterized by an inverse rate τ−1) of a one-dimensional tra...
We investigate the dynamics of the rate function and of local observables after a quench in models w...
During recent years the interest to dynamics of quantum systems has grown considerably. Quantum many...
Quantum phase transitions universally exist in the ground and excited states of quantum many-body sy...
We investigate the orthogonality catastrophe and quantum speed limit in the Creutz model for dynamic...