We study spread complexity and the statistics of work done for quenches in the three-spin interacting Ising model, the XY spin chain, and the Su-Schrieffer-Heeger model. We study these models without quench and for different schemes of quenches, such as sudden quench and multiple sudden quenches. We employ the Floquet operator technique to investigate all three models in the presence of time-dependent periodic driving of parameters. In contrast to the sudden quenched cases, the periodically varying parameter case clearly shows non-analytical behaviour near the critical point. We also elucidate the relation between work done and the Lanczos coefficient and how the statistics of work done behave near critical points.Comment: 23 pages, 18 figu...
In this paper, we relate the coupling of Markov chains, at the basis of perfect sampling methods, wi...
We study Nielsen's circuit complexity in a periodic harmonic oscillator chain, under single and mult...
Krylov complexity measures the spread of the wavefunction in the Krylov basis, which is constructed ...
We study spread complexity and the statistics of work done for quenches in the three-spin interactin...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
We demonstrate that in a class of disordered quantum systems the dynamical partition function is not...
Abstract Using a recent proposal of circuit complexity in quantum field theories introduced by Jeffe...
Inspired by current research on measurement-induced quantum phase transitions, we analyze the nonuni...
Quantum quenches in continuum field theory across critical points are known to display different sca...
I investigated the quench dynamics of inhomogeneous quantum spin chains. Here quench means the sudde...
We study the slow quenching dynamics (characterized by an inverse rate τ−1) of a one-dimensional tra...
Quantum quenches in continuum field theory across critical points are known to display different sca...
In this work we develop the theory of the Loschmidt echo and dynamical phase transitions in non-inte...
Recent years have witnessed a growing interest in topics at the intersection of many-body physics an...
In this paper, we relate the coupling of Markov chains, at the basis of perfect sampling methods, wi...
We study Nielsen's circuit complexity in a periodic harmonic oscillator chain, under single and mult...
Krylov complexity measures the spread of the wavefunction in the Krylov basis, which is constructed ...
We study spread complexity and the statistics of work done for quenches in the three-spin interactin...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
We propose a measure of quantum state complexity defined by minimizing the spread of the wave-functi...
We demonstrate that in a class of disordered quantum systems the dynamical partition function is not...
Abstract Using a recent proposal of circuit complexity in quantum field theories introduced by Jeffe...
Inspired by current research on measurement-induced quantum phase transitions, we analyze the nonuni...
Quantum quenches in continuum field theory across critical points are known to display different sca...
I investigated the quench dynamics of inhomogeneous quantum spin chains. Here quench means the sudde...
We study the slow quenching dynamics (characterized by an inverse rate τ−1) of a one-dimensional tra...
Quantum quenches in continuum field theory across critical points are known to display different sca...
In this work we develop the theory of the Loschmidt echo and dynamical phase transitions in non-inte...
Recent years have witnessed a growing interest in topics at the intersection of many-body physics an...
In this paper, we relate the coupling of Markov chains, at the basis of perfect sampling methods, wi...
We study Nielsen's circuit complexity in a periodic harmonic oscillator chain, under single and mult...
Krylov complexity measures the spread of the wavefunction in the Krylov basis, which is constructed ...