Photonic structures are building blocks for many optical applications in which light
manipulation is required spanning optical filtering, lasing, light emitting diodes, sensing and …

The standard (Markovian) transport model based on the Boltzmann equation cannot
describe some non-equilibrium processes called anomalous that take place in many …

In this paper we propose an electronic Lévy glass, analogous to a recent optical realization.
To that end, we investigate the transmission of electrons in graphene nanoribbons in the …

New aspects of electron transport in quantum wires with Lévy-type disorder are described.
We study the weak scattering and the incoherent sequential tunneling in one-dimensional …

We investigate the propagation of waves in one-dimensional systems with Lévy-type
disorder. We perform a complete analysis of nonrelativistic and relativistic wave …

We investigate the propagation of electronic waves described by the Dirac equation subject
to a Lévy-type disorder distribution. Our numerical calculations, based on the transfer matrix …

We study Anderson localization of the classical lattice waves in a chain with mass impurities
distributed randomly through a power-law relation s−(1+ α) with s as the distance between …

Transport in complex systems is characterized by a fractal dimension—the walk dimension—
that indicates the diffusive or anomalous nature of the underlying random walk process …

We study the statistics of the conductance g through one-dimensional disordered systems
where electron wave functions decay spatially as| ψ|∼ exp (− λ r α) for 0< α< 1, λ being a …

We study the effects of scattering lengths on Lévy walks in quenched, one-dimensional
random and fractal quasilattices, with scatterers spaced according to a long-tailed …