Transmission lines and resonators based on quantum Hall plasmonics: Electromagnetic field, attenuation, and coupling to qubits

Abstract: Quantum Hall edge states have some characteristic features that can prove useful to measure and control solid state qubits. For example, their high voltage to current ratio and their dissipationless nature can be exploited to manufacture low-loss microwave transmission lines and resonators with a characteristic impedance of the order of the quantum of resistance h/e 2 ∼ 25kΩ. The high value of the impedance guarantees that the voltage per photon is high and for this reason high impedance resonators can be expl… Show more

“…A detailed analysis of dissipation in these devices and a quantitative analysis of the coupling to semiconductor qubits are issues that are not addressed here. More insights into these aspects can be found in [26].…”

“…If we use a piecewise approximation for the velocity and assume a symmetric configuration, we can divide each droplet into two propagation regions T, B of length L p at the top and bottom of the droplet, where the excitation moves at a constant velocity v 0 and two coupling regions R, L of length a at the right and left of the droplet, characterized by intra-and inter-edge velocities, v F and v 1 respectively. Using the results from [26] and rearranging the coordinate system to have the same (clockwise) direction in each droplet and the same origin (fixed conventionally at the boundary between region T and L), it is quite simple to find that the general solutions for the differential equations in the four regions of the ith droplet are…”

“…iωρ(y, ω) = ∂ y (v(y)ρ(y, ω)) + σ xy ∂ y V a (y, ω), (1) where V a (y, ω) is the time dependent drive applied, σ xy is the off-diagonal conductivity of the QH material and v is the propagation velocity of the EMP as function of position y, possibly accounting for different screening of Coulomb interactions due to the presence of the electrodes. A detailed discussion of the validity of this model can be found in [16,26].…”

“…The total current flowing into the ith electrode is obtained by integrating the displacement current density over its area. In the model presented here, we neglect fringing fields and, because the EMP charge density is assumed to be localized in an infinitesimally narrow stripe along the edge, the integral over the area of the electrode simplifies into the one dimensional integral [16,26]:…”

“…Note that in the setup chosen, all parts of the perimeter of the droplet are coupled to some external electrode. This choice guarantees that the EMP velocity has no logarithmic singularity in the long-wavelength limit [11], and, when d i /L i 1, it allows one to use a simple piecewise decomposition for the velocity function v(y), with constant velocity v i in the region coupled to the ith electrode [26]. The velocity v i can then be estimated by using…”

Transmission Lines and Metamaterials Based on Quantum Hall Plasmonics

“…A detailed analysis of dissipation in these devices and a quantitative analysis of the coupling to semiconductor qubits are issues that are not addressed here. More insights into these aspects can be found in [26].…”

“…If we use a piecewise approximation for the velocity and assume a symmetric configuration, we can divide each droplet into two propagation regions T, B of length L p at the top and bottom of the droplet, where the excitation moves at a constant velocity v 0 and two coupling regions R, L of length a at the right and left of the droplet, characterized by intra-and inter-edge velocities, v F and v 1 respectively. Using the results from [26] and rearranging the coordinate system to have the same (clockwise) direction in each droplet and the same origin (fixed conventionally at the boundary between region T and L), it is quite simple to find that the general solutions for the differential equations in the four regions of the ith droplet are…”

“…iωρ(y, ω) = ∂ y (v(y)ρ(y, ω)) + σ xy ∂ y V a (y, ω), (1) where V a (y, ω) is the time dependent drive applied, σ xy is the off-diagonal conductivity of the QH material and v is the propagation velocity of the EMP as function of position y, possibly accounting for different screening of Coulomb interactions due to the presence of the electrodes. A detailed discussion of the validity of this model can be found in [16,26].…”

“…The total current flowing into the ith electrode is obtained by integrating the displacement current density over its area. In the model presented here, we neglect fringing fields and, because the EMP charge density is assumed to be localized in an infinitesimally narrow stripe along the edge, the integral over the area of the electrode simplifies into the one dimensional integral [16,26]:…”

“…Note that in the setup chosen, all parts of the perimeter of the droplet are coupled to some external electrode. This choice guarantees that the EMP velocity has no logarithmic singularity in the long-wavelength limit [11], and, when d i /L i 1, it allows one to use a simple piecewise decomposition for the velocity function v(y), with constant velocity v i in the region coupled to the ith electrode [26]. The velocity v i can then be estimated by using…”

Transmission Lines and Metamaterials Based on Quantum Hall Plasmonics

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