Nonlinear impedance of a microwave-driven Josephson junction with noise

Coffey, W. T.; Déjardin, Jean‐Louis; Kalmykov, Yuri P.

doi:10.1103/physrevb.62.3480

Cited by 23 publications

(21 citation statements)

References 37 publications

(26 reference statements)

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“…This assumption is employed in almost all papers dealing with noise influence on Shapiro steps [13], on the impedance of microwave driven junctions [14,15] and other phenomena in Josephson junctions (more references are given in [16,17]). There are only few exceptions.…”

Section: Introductionmentioning

confidence: 99%

Quantum noise in a current-biased Josephson junction

Levinson

2003

Phys. Rev. B

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Section: Introductionmentioning

confidence: 99%

Quantum noise in a current-biased Josephson junction

Levinson

2003

Phys. Rev. B

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“…Similarly to the problem of resistively shunted non-linear Josephson junction [22], in our case finite temperature overcritical biases can also lead to a sign change in the real part of the impedance. In the previous communication [21] it has been shown that such an anomalous impedance behavior is more pronounced for low temperatures and small ac amplitudes and is challenging with regard to the development of parametric amplifiers and improving efficiency of down converters operating with Abrikosov vortices.…”

Section: Discussionmentioning

confidence: 99%

Noise-Assisted Microwave Up-conversion by Vortices in Thin-Film Superconductors with a dc-Biased Washboard Pinning Potential

Shklovskij¹,

Dobrovolskiy

Huth

2012

J Supercond Nov Magn

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So far the main theoretical basis for understanding and optimization of the microwave properties of vortices in type II superconductors has been relying upon the Coffey-Clem (CC) approach for the linear impedance at nonzero temperature. However, the CC model does not account for the non-linear response and the possibility to control it by changing the value of the dc transport current in a superconducting sample. For this reason, we have exactly solved the Langevin equation for the two-dimensional nonlinear vortex dynamics in a dc bias-tilted cosine pinning potential in the presence of an ac current of arbitrary amplitude and frequency ω and have, thereby, substantially generalized the CC results. In this work we analyze the behavior of the non-linear response on kω-frequency in a wide range of dc and ac current densities, ω, and temperature. The kω-response is found to depend strongly on all these parameters, as exemplified for the third-harmonic (k = 3) transformation coefficient Z 3 . The parametric window for the most enhanced up-conversion is presented. The predicted effects can be experimentally verified in thin-film superconductors with some pinning potential of the washboard type.

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“…Whereas the general exact solution of the problem [25,27] has been obtained for non-zero temperature in terms of a matrix continued fraction [52], here we treat the problem analytically in terms of only elementary functions which allow a more intuitive description of the main effects. Solving the equation of motion for a vortex at T = 0, j 0 < j c , and j 1 → 0 in the general case, we also consider some important limiting cases of isotropic vortex viscosity and zero Hall constant provided it substantially helps us to elucidate the physical picture.…”

Section: Development Of the Theory In The Fieldmentioning

confidence: 99%