TY  - JOUR
AU  - Arnault, P.
AU  - Macquet, A.
AU  - Angles-Castillo, A.
AU  - Marquez-Martin, I.
AU  - Pina-Canelles, V.
AU  - Perez, A.
AU  - Di Molfetta, G.
AU  - Arrighi, P.
AU  - Debbasch, F.
PY  - 2020
DA  - 2020//
TI  - Quantum simulation of quantum relativistic diffusion via quantum walks
T2  - J. Phys. A
JO  - Journal of Physics A
SP  - 205303
EP  - 39pp
VL  - 53
IS  - 20
PB  - Iop Publishing Ltd
KW  - noisy quantum walks
KW  - noisy quantum systems
KW  - decoherence
KW  - Lindblad equation
KW  - quantum simulation
KW  - relativistic diffusions
KW  - telegraph equation
AB  - Two models are first presented, of a one-dimensional discrete-time quantum walk (DTQW) with temporal noise on the internal degree of freedom (i.e., the coin): (i) a model with both a coin-flip and a phase-flip channel, and (ii) a model with random coin unitaries. It is then shown that both these models admit a common limit in the spacetime continuum, namely, a Lindblad equation with Dirac-fermion Hamiltonian part and, as Lindblad jumps, a chirality flip and a chirality-dependent phase flip, which are two of the three standard error channels for a two-level quantum system. This, as one may call it, Dirac Lindblad equation, provides a model of quantum relativistic spatial diffusion, which is evidenced both analytically and numerically. This model of spatial diffusion has the intriguing specificity of making sense only with original unitary models which are relativistic in the sense that they have chirality, on which the noise is introduced: the diffusion arises via the by-construction (quantum) coupling of chirality to the position. For a particle with vanishing mass, the model of quantum relativistic diffusion introduced in the present work, reduces to the well-known telegraph equation, which yields propagation at short times, diffusion at long times, and exhibits no quantumness. Finally, the results are extended to temporal noises which depend smoothly on position.
SN  - 1751-8113
UR  - https://arxiv.org/abs/1911.09791
UR  - https://doi.org/10.1088/1751-8121/ab8245
DO  - 10.1088/1751-8121/ab8245
LA  - English
N1  - WOS:000531359000001
ID  - Arnault_etal2020
ER  -