Dynamic crossover across the peak effect in Ba1-xKxFe2As2 superconductor for H parallel to c-axis and H parallel to ab-plane

Citation:

Pissas M, Stamopoulos D, Wang CL, Ma YW. Dynamic crossover across the peak effect in Ba1-xKxFe2As2 superconductor for H parallel to c-axis and H parallel to ab-plane. SUPERCONDUCTOR SCIENCE & TECHNOLOGY. 2022;35(6).

Abstract:

The vortex matter properties of a Ba1-xKxFe2As2 single crystal (T-c = 38.2 K) were studied, by employing both isofield and isothermal ac-susceptibility measurements, chi(n)(f, H-0) = chi(n)' (f, H-0) - i chi(n)'' (f, H-0), in a wide range of frequencies and amplitudes of the applied ac magnetic field. The irreversibility line (H-irr(T, theta)), formally defined by the onset of the third harmonic, is recorded for both H parallel to c-axis and H parallel to ab-plane. It can be reproduced from the empirical equation, H-irr(T) = H-0(1 - T/T-c)(n), with n(c) = n(ab) = 1.24 and mu H-0(0)c = 210 Tesla, torro mu H-0(0)ab = 540 Tesla. The isofield measurements of the first harmonic revealed a narrow diamagnetic peak, related to a local peak of the critical current below the irreversibility line for both H parallel to c-axis and H parallel to ab-plane. The local peak for mu H-0 < 0.2 Tesla is transformed to a sudden drop before it completely disappears. Detailed ac-susceptibility measurements were conducted for frequencies ranging within f = 0.1 10 kHz. From these data, the pinning potential, U, is deduced both as function of temperature and dc magnetic field. These results revealed that the ac response of vortex matter exhibits three distinct dynamic behaviors. By employing a model proposed by Mikitik and Brandt (2001 Phys. Rev. B 64 184514), that is based on a Lindemann type criterion and the collective pinning theory, we reproduced the experimentally recorded vortex matter phase diagram by taking into account both thermal fluctuations and random point disorder. To this effect, we adopted a delta T-c, pinning mechanism, c(L) = 0.25, D-0/c(L) = 1.1-1.5 and a Ginzburg number Gi = 10(-3).