Quantum Anomalous Hall Effect in Graphene from Rashba and Exchange Effects (1005.1672v2)

Abstract: We investigate the possibility of realizing quantum anomalous Hall effect in graphene. We show that a bulk energy gap can be opened in the presence of both Rashba spin-orbit coupling and an exchange field. We calculate the Berry curvature distribution and find a non-zero Chern number for the valence bands and demonstrate the existence of gapless edge states. Inspired by this finding, we also study, by first principles method, a concrete example of graphene with Fe atoms adsorbed on top, obtaining the same result.

• The paper establishes that combining Rashba spin-orbit coupling and an exchange field opens a bulk energy gap in graphene, enabling the Quantum Anomalous Hall Effect.
• It employs tight-binding and first-principles methods to predict a quantized Hall conductivity of 2e²/h and a non-zero Chern number, evidencing robust chiral edge states.
• The study illustrates that graphene functionalized with Fe atoms can achieve a 5.5 meV gap, highlighting potential for experimental validation of QAHE.

Quantum Anomalous Hall Effect in Graphene from Rashba and Exchange Effects

The paper "Quantum Anomalous Hall Effect in Graphene from Rashba and Exchange Effects" presents a detailed investigation into the mechanisms by which graphene can manifest the Quantum Anomalous Hall Effect (QAHE). The focus is on how the introduction of Rashba spin-orbit coupling (SOC) and an exchange field can induce a non-trivial energy gap and facilitate topological phase transitions in graphene.

Key Findings

The authors propose that the combination of Rashba SOC and exchange fields can open a bulk energy gap in graphene, suggesting the potential realization of QAHE. The presence of the Rashba SOC, typically known to perturb the quantum spin Hall effect, paradoxically facilitates QAHE under the condition of broken time-reversal symmetry, a condition satisfied by the application of an exchange field.

Through tight-binding and first principles calculations, the paper predicts a quantized Hall conductivity of $\sigma_{yx}=2e^2/h$ when the Fermi level resides within the bulk gap. A prominent result of their computational model is the successful calculation of a non-zero Chern number, affirming the presence of robust chiral edge states. Such edge states are indicative of the bulk-boundary correspondence, a haLLMark of topologically non-trivial systems.

In an applied example, the authors examine graphene with iron (Fe) atoms adsorbed onto its surface. This adsorption is modeled to break structural symmetry, introducing a Rashba-like spin-orbit interaction. Moreover, the hybridization between the magnetic states of Fe and the $\pi$ states in graphene is noted to produce a macroscopic exchange field, thus fulfilling the criteria for QAHE. The robustness of this setup is affirmed by first principles calculations which posit the energy gap to be around 5.5 meV.

Implications and Future Directions

The findings posit graphene as a viable platform for realizing QAHE through extrinsic means, expanding its functionalities beyond conventional electronic applications. The relevance of a 5.5 meV gap is not insignificant, as it suggests feasibility under available experimental conditions, albeit potentially requiring low temperatures to manifest observable effects. This research not only elucidates a theoretical pathway to realize QAHE in monolayer graphene but also supplies a concrete setup with transition metal adatoms that can facilitate experimental validation.

Future explorations could delve into optimizing the conditions for experimental realization, such as manipulating the density and species of adsorbed metal atoms, or exploring substrates that might amplify these effects. Additionally, the impact of impurities, disorder, and other real-world variables on the stability of the QAHE might reveal sub-genres of electronic behavior unique to graphene.

In summary, this paper provides a comprehensive theoretical framework for inducing QAHE in graphene through Rashba SOC and exchange field effects while offering actionable insights for subsequent empirical research in the domain of topological quantum materials.