Quantum regression theorem is a very useful result in open quantum system and extensively used for computing multi-point correlation functions. Traditionally it is derived for two-time correlators in the Markovian limit employing the Schr\"odinger picture. In this paper we make use of the Heisenberg picture to derive quantum regression theorems for multi-time correlation functions which in the special limit reduce to the well known two-time regression theorem. For multi-time correlation function we find that the regression theorem takes the same form as it takes for two-time correlation function with a mild restriction that one of the times should be greater than all the other time variables. Interestingly, the Heisenberg picture also allow...
Quantum many-body systems are characterized by their correlations. While equal-time correlators and ...
Correlation functions of quantum systems are central objects in quantum field theories which may be ...
The hierarchy of correlations is an analytical approximation method which allows us to study non-equ...
The quantum regression theorem is a powerful tool for calculating the muli-time correlators of opera...
The quantum regression formula for an open quantum system consists in an infinite hierarchy of condi...
We investigate the validity of quantum regression for a family of quantum Hamiltonians on a multipar...
Beyond the conventional quantum regression theorem, a general formula for non-Markovian correlation ...
We explore the connection between two recently introduced notions of non-Markovian quantum dynamics ...
We study numerically and analytically the time dependence and saturation of out-of-time ordered corr...
The applicability of the so-called truncated Wigner approximation (−W) is extended to multitime aver...
Quantum Chaos has originally emerged as the field which studies how the properties of classical chao...
Multi-time quantum processes are endowed with the same richness as many-body physics, including temp...
Joint probability of obtaining outcomes in projective measurement performed sequentially on a two-le...
In the present Thesis we study the behavior of multi-time correlation functions and of thermodynamic...
We study a class of quantum spin systems that includes the S = 1/2 Heisenberg and XY-models, and pr...
Quantum many-body systems are characterized by their correlations. While equal-time correlators and ...
Correlation functions of quantum systems are central objects in quantum field theories which may be ...
The hierarchy of correlations is an analytical approximation method which allows us to study non-equ...
The quantum regression theorem is a powerful tool for calculating the muli-time correlators of opera...
The quantum regression formula for an open quantum system consists in an infinite hierarchy of condi...
We investigate the validity of quantum regression for a family of quantum Hamiltonians on a multipar...
Beyond the conventional quantum regression theorem, a general formula for non-Markovian correlation ...
We explore the connection between two recently introduced notions of non-Markovian quantum dynamics ...
We study numerically and analytically the time dependence and saturation of out-of-time ordered corr...
The applicability of the so-called truncated Wigner approximation (−W) is extended to multitime aver...
Quantum Chaos has originally emerged as the field which studies how the properties of classical chao...
Multi-time quantum processes are endowed with the same richness as many-body physics, including temp...
Joint probability of obtaining outcomes in projective measurement performed sequentially on a two-le...
In the present Thesis we study the behavior of multi-time correlation functions and of thermodynamic...
We study a class of quantum spin systems that includes the S = 1/2 Heisenberg and XY-models, and pr...
Quantum many-body systems are characterized by their correlations. While equal-time correlators and ...
Correlation functions of quantum systems are central objects in quantum field theories which may be ...
The hierarchy of correlations is an analytical approximation method which allows us to study non-equ...