We study the distributions of the continuous-time quantum walk on a one-dimensional lattice. In particular we will consider walks on unbounded lattices, walks with one and two boundaries and Dirichlet boundary conditions, and walks with periodic boundary conditions. We will prove that all continuous-time quantum walks can be written as a series of Bessel functions of the first kind and show how to approximate these series
After a short review of the notion of a quantum Markov chain, a particular class of such chains, ...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...
We consider the problem of characterizing the set of input-output correlations that can be generated...
Quantum random walks are shown to have non-intuitive dynamics which makes them an attractive area of...
We study the measure theory of a two-site quantum random walk. The truncated decoherence functional ...
In this expository paper written for physicists and geometers we introduce the notions of TQFT and o...
Inspired by the discrete evolution implied by the recent work on loop quantum cosmology, we obtain a...
In an interacting continuous time quantum walk, while the walker (the cursor) ismoving on a graph, ...
We derive the momentum space dynamic equations and state functions for one dimensional quantum walks...
Quantum walks are not only algorithmic tools for quantum computation but also not trivial models whi...
AbstractFollowing the Killip–Kiselev–Last method, we prove quantum dynamical upper bounds for discre...
International audienceWe analyze an experiment with continuous heterodyne measurement of an energy l...
International audienceOpen Quantum Walks (OQWs), originally introduced in [2], are quantum generaliz...
AbstractWe develop further the approach to upper and lower bounds in quantum dynamics via complex an...
Models of quantum walks which admit continuous time and continuous spacetime limits have recently le...
After a short review of the notion of a quantum Markov chain, a particular class of such chains, ...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...
We consider the problem of characterizing the set of input-output correlations that can be generated...
Quantum random walks are shown to have non-intuitive dynamics which makes them an attractive area of...
We study the measure theory of a two-site quantum random walk. The truncated decoherence functional ...
In this expository paper written for physicists and geometers we introduce the notions of TQFT and o...
Inspired by the discrete evolution implied by the recent work on loop quantum cosmology, we obtain a...
In an interacting continuous time quantum walk, while the walker (the cursor) ismoving on a graph, ...
We derive the momentum space dynamic equations and state functions for one dimensional quantum walks...
Quantum walks are not only algorithmic tools for quantum computation but also not trivial models whi...
AbstractFollowing the Killip–Kiselev–Last method, we prove quantum dynamical upper bounds for discre...
International audienceWe analyze an experiment with continuous heterodyne measurement of an energy l...
International audienceOpen Quantum Walks (OQWs), originally introduced in [2], are quantum generaliz...
AbstractWe develop further the approach to upper and lower bounds in quantum dynamics via complex an...
Models of quantum walks which admit continuous time and continuous spacetime limits have recently le...
After a short review of the notion of a quantum Markov chain, a particular class of such chains, ...
The theory of resurgence connects high order terms of perturbative series to low order terms in non-...
We consider the problem of characterizing the set of input-output correlations that can be generated...