We study Nielsen's circuit complexity in a periodic harmonic oscillator chain, under single and multiple quenches. In a multiple quench scenario, it is shown that the complexity shows remarkably different behaviour compared to the other information theoretic measures, such as the entanglement entropy. In particular, after two successive quenches, when the frequency returns to its initial value, there is a lower limit of complexity, which cannot be made to approach zero. Further, we show that by applying a large number of successive quenches, the complexity of the time evolved state can be increased to a high value, which is not possible by applying a single quench. This model also exhibits the interesting phenomenon of crossover of complexi...
Global quantum quench with a finite quench rate which crosses critical points is known to lead to un...
Abstract The rate of complexification of a quantum state is conjectured to be bounded from above by ...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
We study the temporal evolution of the circuit complexity after the local quench where two harmonic ...
We examine the multifold complexity and Loschmidt echo for an inverted harmonic oscillator. We give ...
We study the temporal evolution of the circuit complexity for a subsystem in harmonic lattices after...
We apply the recently developed notion of complexity for field theory to a quantum quench through a ...
We apply the recently developed notion of complexity for field theory to a quantum quench through th...
Abstract Using a recent proposal of circuit complexity in quantum field theories introduced by Jeffe...
We investigate the circuit complexity and Loschmidt echo for the (inverted) harmonic oscillators. Fo...
Abstract In this work, we propose a testing procedure to distinguish between the different approache...
We study spread complexity and the statistics of work done for quenches in the three-spin interactin...
Abstract We investigate circuit complexity to characterize chaos in multiparticle quantum systems. I...
The dynamics of quantum states underlies the emergence of thermodynamics and even recent theories of...
The complex dynamics of a simple nonlinear circuit contains an infinite number of functions. Specifi...
Global quantum quench with a finite quench rate which crosses critical points is known to lead to un...
Abstract The rate of complexification of a quantum state is conjectured to be bounded from above by ...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...
We study the temporal evolution of the circuit complexity after the local quench where two harmonic ...
We examine the multifold complexity and Loschmidt echo for an inverted harmonic oscillator. We give ...
We study the temporal evolution of the circuit complexity for a subsystem in harmonic lattices after...
We apply the recently developed notion of complexity for field theory to a quantum quench through a ...
We apply the recently developed notion of complexity for field theory to a quantum quench through th...
Abstract Using a recent proposal of circuit complexity in quantum field theories introduced by Jeffe...
We investigate the circuit complexity and Loschmidt echo for the (inverted) harmonic oscillators. Fo...
Abstract In this work, we propose a testing procedure to distinguish between the different approache...
We study spread complexity and the statistics of work done for quenches in the three-spin interactin...
Abstract We investigate circuit complexity to characterize chaos in multiparticle quantum systems. I...
The dynamics of quantum states underlies the emergence of thermodynamics and even recent theories of...
The complex dynamics of a simple nonlinear circuit contains an infinite number of functions. Specifi...
Global quantum quench with a finite quench rate which crosses critical points is known to lead to un...
Abstract The rate of complexification of a quantum state is conjectured to be bounded from above by ...
In this work, we find that the complexity of quantum many-body states, defined as a spread in the Kr...