Half-quantized Hall Plateaus in the Confined Geometry of Graphene
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Since the ground-breaking discovery of the quantum Hall effect, half-quantized quantum Hall plateaus have been some of the most studied and sought-after states. Their importance stems not only from the fact that they transcend the composite fermion framework used to explain fractional quantum Hall states (such as Laughlin states). Crucially, they hold promise for hosting non-Abelian excitations, which are essential for developing topological qubits - key components for fault-tolerant quantum computing. In this work, we show that these coveted half-quantized plateaus can appear in more than one unexpected way. We report the observation of fractional states with conductance quantization at $\nu_H = 5/2$ arising due to charge equilibration in the confined region of a quantum point contact in monolayer graphene.
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Elevated Hall Responses as Indicators of Edge Reconstruction
Coexistence of upstream charge and neutral modes in multi-terminal geometry for the ν=1 quantum Hall state leads to enhanced electrical and thermal Hall conductances exceeding twice the unreconstructed quantized values.
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