| Resumo: |
Graphene, a two-dimensional lattice of carbon atoms, has been widely studied during the past few years. The interest in this material is not only due to its possible future technological applications, but also because it provides the possibility to probe interesting phenomena predicted by quantum field theories, ranging from Klein tunneling and other quasi-relativistic effects to the existence of new types of electron degrees of freedom, namely, the pseudo-spin, and the existence of two inequivalent electronic valleys in the vicinity of the gapless points of its energy spectrum. Several of the exotic properties observed in graphene originate from the fact that within the low energy approximation for the tight-binding Hamiltonian of graphene, electrons behave as massless Dirac fermions, with a linear energy dispersion. Just like in single layer graphene, the low-energy eletronic spectrum in bilayer graphene is gapless, but in this case it is dominated by the parabolic dispersion. Nevertheless, one interesting feature is shared by both monolayer and bilayer graphene: the valley degree of freedom. In this thesis, we theoretically investigate: (i) the dynamic properties in mono and bilayer graphene, performing a systematic study of wave packet scattering in different interface shapes, edges and potentials; and furthermore (ii) the energy levels of confined systems in graphene in the presence or absence of external magnetic and electric fields. In the first part of the work, we use the tight-binding approach to study the scattering of a Gaussian wave packet on monolayer graphene edges (armchair and zigzag) in the presence of real and pseudo (strain induced) magnetic fields and also calculate the transmission probabilities of a Gaussian wave packet through a quantum point contact defined by electrostatic gates in bilayer graphene. These numerical calculations are based on the solution of the time-dependent Schrödinger equation for the tight-binding model Hamiltonian, using the Split-operator technique. Our theory allows us to investigate scattering in reciprocal space, and depending on the type of graphene edge we observe scattering within the same valley, or between different valleys. In the presence of an external magnetic field, the well known skipping orbits are observed. However, our results demonstrate that in the case of a pseudo-magnetic field, induced by non-uniform strain, the scattering by an armchair edge results in a non-propagating edge state. We propose also a very efficient valley filtering through a quantum point contact system defined by electrostatic gates in bilayer graphene. For the suggested bilayer system, we investigate how to improve the efficiency of the system as a valley filter by varying parameters, such as length, width and amplitude of the applied potential. In the second part of the thesis, we present a systematic study of the energy spectra of graphene quantum rings having different geometries and edge types, in the presence of a perpendicular magnetic field. We discuss which features obtained through a simplified Dirac model can be recovered when the eigenstates of graphene quantum rings are compared with the tight-binding results. Furthermore, we also investigate the confined states in two different hybrid monolayer - bilayer systems, identifying dot-localized states and edge states for the suggested bilayer confinement structures, as well as we will study the behavior of the energy levels as a function of dot size and under an applied external magnetic field. Finally, using the four-band continuum Dirac model, we also derive a general expression for the infinite-mass boundary condition in bilayer graphene in order to apply this boundary condition to calculate analytically the confined states and the corresponding wave functions in a bilayer graphene quantum dot in the absence and presence of a perpendicular magnetic field. Our analytic results exhibit good agreement when compared with the tight-binding ones. |
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