Evidence of Andreev bound states as a hallmark of the FFLO phase in κ-(BEDT-TTF)2Cu(NCS)2

Mayaffre, H.; Krämer, Steffen; Horvatić, M.; Berthier, Y.; Miyagawa, Kazuya; Kanoda, K.; Mitrović, Vesna

doi:10.1038/nphys3121

Cited by 171 publications

(194 citation statements)

References 30 publications

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“…This enhancement mostly appears due to transitions between Andreev bound states and the propagating continuum states that can occur in high fields, µ B H = 0.5∆, close to the Pauli limiting field in D-wave µ B H P = 0.55∆ 0 . The range of fields where it appears is in good agreement with experimental observations in κ-(BEDT-TTF) 2 Cu(NCS) 2 near the first-order superconducting-normal transition, 14 although we find the magnitude of the enhancement is somewhat smaller than the measured value.…”

supporting

confidence: 90%

Spin susceptibility of Andreev bound states

Rosemeyer

Vorontsov

2016

Phys. Rev. B

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We calcuate electronic spin susceptibility and spin-lattice relaxation rate in singlet superconductor near a pairbreaking surface, or in a domain wall of the order parameter. We directly link presence of high-density Andreev bound states in the inhomogeneous region, combined with coherence factors, to enhancement of the susceptibility above the normal state's value for certain q vectors. Beside the dominant peak at ferromagnetic vector q = 0, we find significant enhancement of antiferromagnetic correlations at vectors q < ∼ 2k f , with q along the domain wall in S-wave superconductor, and across domain wall in D-wave (nodes along the wall). These features are destroyed by applying moderate Zeeman field that splits the zero-energy peak. We solve Bogoliubov-de Gennes equations in momentum space and our results deviate from the lattice models investigated previously. Large enhancement of the spin-lattice relaxation rate T −1 1 at the domain wall provides clear signature of the quasiparticle bound states, and is in good agreement with recent experiment in organic superconductor κ-(BEDT-TTF)2Cu(NCS)2.

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supporting

confidence: 90%

Spin susceptibility of Andreev bound states

Rosemeyer

Vorontsov

2016

Phys. Rev. B

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“…CeCoIn 5 [7][8][9][10][11]) or organic superconductors (e.g. [14][15][16][17][18]). These chemical compounds are often modeled as effectively quasi-2D one-band systems.…”

Section: Introductionmentioning

confidence: 99%

Multiple phase transitions in Pauli-limited iron-based superconductors

Ptok

2015

J. Phys.: Condens. Matter

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Abstract. Specific heat measurements have been successfully used to probe unconventional superconducting phases in one-band heavy-fermion and organic superconductors. We extend the method to study successive phase transitions in multi-band materials such as iron based superconductors. The signatures are multiple peaks in the specific heat, at low temperatures and high magnetic field, which can lead the experimental verification of unconventional superconducting states with non-zero total momentum.

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“…[27,28] is that the orbital effect is of the relative order of t 2 ⊥ /T 2 c0 1. From the experimental side, plenty of experimental works on Q2D organic and some other superconductors have been performed [29][30][31][32][33][34][35][36][37][38][39][40][41] to establish the possible existence of the FFLO phase in a parallel magnetic field.The goal of our paper is to consider the orbital effect in a parallel magnetic field in a Q2D conductor at zero temperature, in contrast to Refs. [27,28].…”

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confidence: 99%

Orbital effect for the Fulde-Ferrell-Larkin-Ovchinnikov phase in a quasi-two-dimensional superconductor in a parallel magnetic field

Lebed

2018

Phys. Rev. B

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We theoretically study the orbital destructive effect against superconductivity in a parallel magnetic field in the Fulde-Ferrell-Larkin-Ovchinnikov (FFLO or LOFF) phase at zero temperature in a quasi-two-dimensional (Q2D) conductor. We demonstrate that at zero temperature a special parameter, λ = l ⊥ (H )/d, is responsible for strength of the orbital effect, where l ⊥ (H ) is a typical "size" of the quasiclassical electron orbit in a magnetic field and d is the interplane distance. We discuss applications of our results to the existing experiments on the FFLO phase in the organic Q2D conductors κ-(ET) 2 Cu(NCS) 2 and κ-(ET) 2 Cu[N(CN) 2 ]Cl. DOI: 10.1103/PhysRevB.97.144504 It is well known that the orbital effect of electron motion in external magnetic field destroys superconductivity [1]. In singlet type-II superconductors, superconductivity is usually destroyed by magnetic fields higher than the so-called upper critical field, H c2 . For a 3D isotropic case, at zero temperature H c2 (0) was calculated in Ref.[2], whereas temperature dependence of the upper critical field, H c2 (T ), was found several years later [3]. As to triplet superconductivity, it can be restored in some cases in magnetic fields much higher than the H c2 (0), as theoretically predicted for quasi-one-dimensional (Q1D) [4,5], quasi-two-dimensional (Q2D) [6], and isotropic 3D [7] superconductors.Note that superconductivity in singlet superconductors can also be destroyed by spin effects, as was first demonstrated in Refs. [8,9] (i.e., above the so-called Clogston-Chandrasekhar paramagnetic limit, H P ). Nevertheless, Larkin, Ovchinnikov, Felde, and Ferrell (LOFF) stressed [10,11] that the situation with the above mentioned paramagnetic destruction of superconductivity is not so simple. Indeed, they showed that there might exist the FFLO (or LOFF) superconducting nonuniform phase in the restricted area of magnetic fields, H p < H < H FFLO . This happens when the orbital effect is small enough, which is realized in Q1D superconductors in an arbitrary oriented magnetic field and in Q2D superconductors for a magnetic field parallel to the conducting layers. As was shown in Ref.[12], the FFLO phase was stable in a pure 1D case for arbitrary strong magnetic field in the absence of the orbital effect. In Refs. [4,5,13,14], a possibility of the FFLO phase to exist in real Q1D materials from chemical family (TMTSF) 2 X (X = ClO 4 , PF 6 , etc.) was studied taking into account the orbital effect in a perpendicular magnetic field. In Ref. [15], it was shown that the FFLO phase has to exist in the Q1D superconductor (TMTSF) 2 ClO 4 , despite the orbital effect in a parallel magnetic field. Some important signatures of the possible existence of the FFLO phase were experimentally observed * Also at: L.D. Landau Institute for Theoretical Physics, RAS, 2 Kosygina Street, Moscow 117334, Russia. in perpendicular [16,17] and parallel [18,19] magnetic fields in the Q1D superconductors (TMTSF) 2 ClO 4 and (TMTSF) 2 PF 6 .As mentioned before, the second conve...

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Evidence of Andreev bound states as a hallmark of the FFLO phase in κ-(BEDT-TTF)2Cu(NCS)2

Cited by 171 publications

References 30 publications

Spin susceptibility of Andreev bound states

Spin susceptibility of Andreev bound states

Multiple phase transitions in Pauli-limited iron-based superconductors

Orbital effect for the Fulde-Ferrell-Larkin-Ovchinnikov phase in a quasi-two-dimensional superconductor in a parallel magnetic field

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