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Peculiar magnetism of the FeAs – grand parent of the iron-based superconductors A. Błachowski 1 , K. Ruebenbauer 1 , J. Żukrowski 2 , and Z. Bukowski 3 1 Mössbauer Spectroscopy Division, Institute of Physics, Pedagogical University, Cracow, Poland
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Peculiar magnetism of the FeAs – grand parent of the iron-based superconductors A. Błachowski1, K. Ruebenbauer1, J. Żukrowski2, and Z. Bukowski3 1 Mössbauer Spectroscopy Division, Institute of Physics, Pedagogical University, Cracow, Poland 2 Department of Solid State Physics, Faculty of Physics and Applied Computer Science, AGH University of Science and Technology, Cracow, Poland 3 Institute of Low Temperature and Structure Research, Polish Academy of Sciences, Wrocław, Poland --------------------------------------------------------------------------------------------------------------------------------------------------------- This work was supported by the National Science Center of Poland, Grant DEC-2011/03/B/ST3/00446 XVI KKN - XVI National Conference on Superconductivity October 7-12, 2013: Zakopane, Poland Seminarium Instytutu Fizyki UP, Kraków, 25 października 2013 r. (piątek): sala 513: 9.35
Mössbauer Spectroscopy Laboratory at MSDInstitute of Physics, Pedagogical UniversityCracow, Poland
Mössbauer Spectroscopy -ray energy is modulated by the Doppler effect due to the source motion vs. absorber Mössbauer spectrum 1 mm/s 48neV
Hyperfine Interactions Isomer Shift Quadrupole Splitting Magnetic Splitting 57Fe Mössbauer spectra B = 10 T Electron Density Electric Field Gradient Magnetic Hyperfine Field
Electric Field Gradient + Magnetic Hyperfine Field B = 10 T = 0° = 90°
A bit of formalism Relevant hyperfine Hamiltonian: Choice of the “convenient” reference frame: Transition and parameter dependence of the Hamiltonians:
Lattice dynamics and transition intensity corrections: Thermal ellipsoid for FeAs: For such axial ellipsoid aligned with the Cartesian quantization axes one has single anisotropy parameter. For the present case ellipsoid is flattened along y-axis.
Spiral structure of the magnetic hyperfine field Parameterization of the spiral field: www.elektron.up.krakow.pl/mosgraf-2009
Iron-arsenic phase diagram Landolt-Börnstein New Series IV/5
Structure of FeAs • Orthorhombic structure • The Pnma symmetry group • Arrows show Pna21 distortion • Quantization axes: abc - xyz • All Featoms are equivalent within Pnma • Thermal ellipsoid is flattened along b-axis [0 k+1/2 0] iron and [0 k 0] iron Orientation of magnetic spirals
p-T phase diagram of FeAs J. R. Jeffries et al., Phys. Rev. B 83, 134520 (2011)
Magnetic structure of FeAs Polarized neutron scattering results E.E. Rodriguez et al., Phys. Rev. B83, 134438 (2011)
Anisotropy of the hyperfine magnetic fields (spiral projections onto a-b plane) in FeAs Left column shows[0 k+1/2 0] iron,right column shows[0 k 0] iron. Baand Bb- iron hyperfine field components along the a-axis and b-axis, respectively. Orientation of the EFG and hyperfine magnetic field in the main crystal axes Average hyperfine fields <B> for [0 k+1/2 0] and [0 k 0] irons. Tc - transition temperature - static critical exponent
FeAs Spectral shift S and quadrupole coupling constant AQ versus temperature for [0 k+1/2 0] iron and[0 k 0] iron. Line at 72 K separate magnetically ordered region from paramagnetic region. Relative recoilless fraction <f>/<f0> versus temperature Green points correspond tomagnetically ordered region. Red point is the normalization point. Inset shows relative spectral area RSA plotted versus temperature.
Anisotropy of the recoilless fraction - FeAs Anisotropy disappears in the magnetic region
Spectra in the external field anti-parallel to the beam - FeAs Model 1 (different electron densities) is preferred, as for Model 2 one obtains unphysical diamagnetic „susceptibility”.There is significant anisotropy of the „susceptibility” evenhigh above transition temperature.
High temperature spectra of FeAs Model 1 Saturation of the recoilless fractionanisotropy above RT is an indication of the onset of the quasi-harmonic behavior. Arsenic starts to evaporate at 1000 K and under vacuum leading to the Fe2As phase – irreversible process.
Conclusions The iron hyperfine field along the electronic spin spiral varies enormously in amplitude in the magnetically ordered region. The pattern resembles symmetry of 3d electrons in the a-b plane with the significant distortion caused by the arsenic bonding p electrons. Another unusual feature is strong coupling between magnetism and lattice dynamics i.e. very strong phonon-magnon interaction. Static critical exponents suggest some underlying transition leading to the magnetic order. Due to the lack of the structural changes one can envisage some subtle order-disorder transition with very small latent heat and hysteresis driven by the itinerant charge/spin ordering. The sample starts to loose arsenic at about 1000 K under vacuum, what might be explanation for the specific heat anomaly observed at high temperature.