Emergence of superconductivity in heavy-electron materials

Yang, Yi-feng; Pines, David

doi:10.1073/pnas.1422100112

Cited by 28 publications

(45 citation statements)

References 34 publications

Supporting

Mentioning

Contrasting

Unclassified

Order By: Relevance

“…For CeRhIn 5 at p = 2.7 GPa, a pressure that is larger than its experimental value of p L = 2.4 GPa, we see that scaling behavior is found down to a temperature T x ∼ T L , its delocalization temperature, that is calculated to be 5.7 K using T * = 42 K and f 0 (2.7 GPa)=1.24 estimated from other experiments [15]; the loss of scaling below T x must be attributed to the intrinsic Kondo liquid. As may be seen in Fig.…”

mentioning

confidence: 50%

“…The phenomenological two-fluid model, which explains so many other aspects of heavy electron behavior [4][5][6][7][8][9][10][11][12], is also key to understanding the remarkable scaling of their dynamic behavior. In it, below T * , the collective hybridization of the Kondo lattice of f -electron local moments with the background conduction electrons gives rise to an itinerant heavy electron Kondo liquid (KL) of strength (or volume fraction), f , that coexists with the hybridized local moment spin liquid, of strength 1 − f , with [5] …”

mentioning

confidence: 99%

“…For pressures less than p L , partial quasiparticle localization reduces the number of heavy electrons able to become superconducting and so suppresses T c , while for pressures greater than p L , it is physically appealing to assume that the attractive interaction between heavy electron quasiparticles becomes increasingly less effective [15].…”

mentioning

confidence: 99%

See 2 more Smart Citations

Quantum critical scaling and superconductivity in heavy electron materials

2015

Self Cite

View full text Add to dashboard Cite

We use the two fluid model to determine the conditions under which the nuclear spin-lattice lattice relaxation rate, T1, of candidate heavy quantum critical superconductors can exhibit scaling behavior and find that it can occur if and only if their "hidden" quantum critical spin fluctuations give rise to a temperature-independent intrinsic heavy electron spin-lattice relaxation rate. The resulting scaling of T1 with the strength of the heavy electron component and the coherence temperature, T * , provides a simple test for their presence at pressures at which the superconducting transition temperature, Tc, is maximum and is proportional to T * . These findings support the previously noted partial scaling of the spin-lattice relaxation rate with Tc in a number of important heavy electron materials and provide additional evidence that in these materials their optimal superconductivity originates in the quantum critical spin fluctuations associated with a nearby phase transition from partially localized to fully itinerant quasiparticles.PACS numbers: 71.27.+a, 74.70.Tx, 76.60.-k A tantalizing hint that the spin fluctuations seen in the nuclear spin relaxation rate for a number of unconventional superconductors might be the magnetic glue responsible for their superconductivity appears in a scaling relation between that rate and the optimal superconducting transition temperature, T c , that was first noted by Curro et al [1]. In the present communication we focus on understanding this scaling relation for one important member of this family, the heavy electron materials, for which some experimental results are given in Fig. 1 [1, 2]. As may be seen in Fig. 2, finding such a relation appears at first sight highly problematic because the scaling covers a range of temperatures (T c < T < T * ) in the normal state in which both hybridized localized spins and the itinerant heavy electron Kondo liquid contribute to the spin-lattice relaxation rate. However, we find that rigorous Curro T c scaling can become possible if three conditions are met: (1) the maximum in T c occurs at the pressure p L , at which the line marking the boundary between partially localized and fully itinerant behavior for heavy electron quasiparticles, T L , intersects with T c , so that T max c = T L (p L ); (2) at p L the total spin-lattice relaxation rate scales with the coherence temperature, T

show abstract

mentioning

confidence: 50%

mentioning

confidence: 99%

See 1 more Smart Citation

Quantum critical scaling and superconductivity in heavy electron materials

2015

Self Cite

View full text Add to dashboard Cite

show abstract

“…CeCoIn 5 1 has long been considered the "hydrogen atom" of heavy fermion superconductivity [2][3][4][5][6][7][8] , and much experimental [9][10][11][12][13][14][15][16][17][18][19] and theoretical effort [20][21][22][23][24][25][26][27] has focused on illuminating its unconventional properties [28][29][30][31][32] , and the microscopic mechanism underlying the emergence of superconductivity. While a variety of experimental probes have reported evidence for the existence of nodes [9][10][11][12] , a sign change of the superconducting (SC) order parameter along the Fermi surface 13,14 , and spinsinglet pairing 11,12 , theoretical efforts [20][21][22][23][24][25][26] to provide a quantitative or even qualitative exp...…”

mentioning

confidence: 99%

“…While a variety of experimental probes have reported evidence for the existence of nodes [9][10][11][12] , a sign change of the superconducting (SC) order parameter along the Fermi surface 13,14 , and spinsinglet pairing 11,12 , theoretical efforts [20][21][22][23][24][25][26] to provide a quantitative or even qualitative explanation for the properties of the superconducting state in CeCoIn 5 have been hampered by insufficient insight into the material's complex electronic bandstructure 16 . This situation, however, has recently changed due to a series of groundbreaking scanning tunneling spectroscopy (STS) experiments [33][34][35] which have yielded unprecedented insight into the electronic structure of the superconducting state, providing strong evidence for its unconventional d x 2 −y 2 -wave symmetry.…”

mentioning

confidence: 99%

Differential conductance and defect states in the heavy-fermion superconductorCeCoIn5

2016

View full text Add to dashboard Cite

The quantum ferromagnetic transition in a clean Kondo lattice is discontinuous

Kirkpatrick

Belitz

2016

Fortschritte der Physik

View full text Add to dashboard Cite

The Kondo-lattice model, which couples a lattice of localized magnetic moments to conduction electrons, is often used to describe heavy-fermion systems. Because of the interplay between Kondo physics and magnetic order it displays very complex behavior and is notoriously hard to solve. The ferromagnetic Kondo-lattice model, with a ferromagnetic coupling between the local moments, describes a phase transition from a paramagnetic phase to a ferromagnetic one as a function of either temperature or the ferromagnetic local-moment coupling. At zero temperature, this is a quantum phase transition that has received considerable attention. It has been theoretically described to be continuous, or second order. Here we show that this belief is mistaken; in the absence of quenched disorder the quantum phase transition is first order, in agreement with experiments, as is the corresponding transition in other metallic ferromagnets.

show abstract

Emergence of superconductivity in heavy-electron materials

Cited by 28 publications

References 34 publications

Quantum critical scaling and superconductivity in heavy electron materials

Quantum critical scaling and superconductivity in heavy electron materials

Differential conductance and defect states in the heavy-fermion superconductorCeCoIn5

The quantum ferromagnetic transition in a clean Kondo lattice is discontinuous

Contact Info

Product

Resources

About