We have recently proposed a two-dimensional quantum walk where the requirement of a higher dimensionality of the coin space is substituted with the alternance of the directions in which the walker can move [C. Di Franco, M. Mc Gettrick, and Th. Busch, Phys. Rev. Lett. 106, 080502 (2011)]. For a particular initial state of the coin, this walk is able to perfectly reproduce the spatial probability distribution of the nonlocalized case of the Grover walk. Here, we present a more detailed proof of this equivalence. We also extend the analysis to other initial states in order to provide a more complete picture of our walk. We show that this scheme outperforms the Grover walk in the generation of x-y spatial entanglement for any initial condition...
Localization phenomena of quantum walks makes the propagation dynamics of a walker strikingly differ...
Discrete quantum walks are operations on the states comprised of an external position space and an i...
One of the unique features of discrete-time quantum walks is called trapping, meaning the inability ...
We have recently proposed a two-dimensional quantum walk where the requirement of a higher dimension...
The nonlocalized case of the spatial density probability of the two-dimensional Grover walk can be o...
The nonlocalized case of the spatial density probability of the two-dimensional Grover walk can be o...
One of the proposals for the exploitation of two-dimensional quantum walks has been the efficient ge...
We present a mathematical formalism for the description of unrestricted quantum walks with entangled...
We analyse the quantum walk in higher spatial dimensions and compare classical and quantum spreading...
We suggest an alternative definition of N-dimensional coined quantum walk by generalizing a recent p...
In this article, we undertake a detailed study of the limiting behavior of a three-state discrete-ti...
We present a discrete-time, one-dimensional quantum walk based on the entanglement between the momen...
Quantum walks, both discrete (coined) and continuous time, form the basis of several recent quantum ...
Quantum walks have emerged as an interesting approach to quantum information processing, exhibiting ...
Quantum walks are a powerful tool for developing efficient algorithms in quantum computing. This res...
Localization phenomena of quantum walks makes the propagation dynamics of a walker strikingly differ...
Discrete quantum walks are operations on the states comprised of an external position space and an i...
One of the unique features of discrete-time quantum walks is called trapping, meaning the inability ...
We have recently proposed a two-dimensional quantum walk where the requirement of a higher dimension...
The nonlocalized case of the spatial density probability of the two-dimensional Grover walk can be o...
The nonlocalized case of the spatial density probability of the two-dimensional Grover walk can be o...
One of the proposals for the exploitation of two-dimensional quantum walks has been the efficient ge...
We present a mathematical formalism for the description of unrestricted quantum walks with entangled...
We analyse the quantum walk in higher spatial dimensions and compare classical and quantum spreading...
We suggest an alternative definition of N-dimensional coined quantum walk by generalizing a recent p...
In this article, we undertake a detailed study of the limiting behavior of a three-state discrete-ti...
We present a discrete-time, one-dimensional quantum walk based on the entanglement between the momen...
Quantum walks, both discrete (coined) and continuous time, form the basis of several recent quantum ...
Quantum walks have emerged as an interesting approach to quantum information processing, exhibiting ...
Quantum walks are a powerful tool for developing efficient algorithms in quantum computing. This res...
Localization phenomena of quantum walks makes the propagation dynamics of a walker strikingly differ...
Discrete quantum walks are operations on the states comprised of an external position space and an i...
One of the unique features of discrete-time quantum walks is called trapping, meaning the inability ...