We examine different nonlinear open quantum systems and calculate the non-Markovianity based on the distinguishability between two density matrices. We show that for a single spin (qubit) coupled to a bosonic field the non-Markovianity depends on the spectral density function and can take on any number N with 0 ≤ N ≤ 1, meaning the dynamics can be Markovian or highly non-Markovian. For the main result we consider a system of Ntot identical spins coupled to an environment in the mean-field way. Each spin is coupled to a local and the common reservoir. There are only indirect interactions between the spins through the common reservoir. In limit Ntot → 1 the subsystem consisting of a fixed set of n particles reduces to a factorized sta...
This thesis investigates two thematic lines of research, both underpinned by non-Markovian system-re...
We study and compare the sensitivity of multiple non-Markovianity indicators for a qubit subjected t...
In this Thesis I discuss the exact dynamics of simple non-Markovian systems. I focus on fundamental ...
This thesis is centred around the striking phenomenon of non-Markovianity which emanates from exact...
The dynamical behavior of open quantum systems plays a key role in many applications of quantum mech...
An open quantum system is a quantum system that interacts with some environment whose degrees of fre...
During the last ten years, the studies on non-Markovian open system dynamics has become increasingly...
This Thesis discusses the phenomenology of the dynamics of open quantum systems marked by non-Marko...
We provide a quantitative evaluation of non-Markovianity (NM) for an XX chain of interacting qubits ...
Abstract. We review the most recent developments in the theory of open quantum systems focusing on s...
textWe study the role of correlations with the environment as the source of non-Markovian quantum ev...
In this paper we investigate non-Markovian evolution of a two-level system (qubit) in a bosonic bath...
We study analytically the non-Markovianity of a spin ensemble, with arbitrary number of spins and sp...
We identify the conditions that guarantee equivalence of the reduced dynamics of an open quantum sys...
We study non-Markovian dynamics of an open quantum system system interacting with a nonstationary sq...
This thesis investigates two thematic lines of research, both underpinned by non-Markovian system-re...
We study and compare the sensitivity of multiple non-Markovianity indicators for a qubit subjected t...
In this Thesis I discuss the exact dynamics of simple non-Markovian systems. I focus on fundamental ...
This thesis is centred around the striking phenomenon of non-Markovianity which emanates from exact...
The dynamical behavior of open quantum systems plays a key role in many applications of quantum mech...
An open quantum system is a quantum system that interacts with some environment whose degrees of fre...
During the last ten years, the studies on non-Markovian open system dynamics has become increasingly...
This Thesis discusses the phenomenology of the dynamics of open quantum systems marked by non-Marko...
We provide a quantitative evaluation of non-Markovianity (NM) for an XX chain of interacting qubits ...
Abstract. We review the most recent developments in the theory of open quantum systems focusing on s...
textWe study the role of correlations with the environment as the source of non-Markovian quantum ev...
In this paper we investigate non-Markovian evolution of a two-level system (qubit) in a bosonic bath...
We study analytically the non-Markovianity of a spin ensemble, with arbitrary number of spins and sp...
We identify the conditions that guarantee equivalence of the reduced dynamics of an open quantum sys...
We study non-Markovian dynamics of an open quantum system system interacting with a nonstationary sq...
This thesis investigates two thematic lines of research, both underpinned by non-Markovian system-re...
We study and compare the sensitivity of multiple non-Markovianity indicators for a qubit subjected t...
In this Thesis I discuss the exact dynamics of simple non-Markovian systems. I focus on fundamental ...