Role of spin–orbit coupling on the physical properties of APb3 (A = Na, Ca, Y, and Th) superconductors
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[1] Ranjan Kumar,et al. Superconductivity in YIn3 under positive pressure , 2019, Physica C: Superconductivity and its Applications.
[2] X. Gou,et al. Electron-phonon interaction and superconductivity in representative AuCu3-type intermetallic compounds , 2018, Computational Materials Science.
[3] Stefano de Gironcoli,et al. Advanced capabilities for materials modelling with Quantum ESPRESSO , 2017, Journal of physics. Condensed matter : an Institute of Physics journal.
[4] Ramesh Sharma,et al. Intermediate coupled superconductivity in yttrium intermetallics , 2017 .
[5] Y. Yoshida,et al. Superconductivity in LaBi3 with AuCu3-type structure , 2016 .
[6] Y. Sun,et al. Superconductivity in CaSn3 single crystals with a AuCu3-type structure , 2015, 1512.02514.
[7] M. Peng,et al. Anisotropic elastic properties of the Ca–Pb compounds , 2014 .
[8] N. Christensen,et al. Fermi surface properties of AB3 (A = Y, La; B = Pb, In, Tl) intermetallic compounds under pressure , 2013, Journal of physics. Condensed matter : an Institute of Physics journal.
[9] E. Morosan,et al. Type-I superconductivity in ScGa 3 and LuGa 3 single crystals , 2012, 1205.6836.
[10] J. Cooley,et al. Superconductivity in single-crystal Y In3 , 2011, 1112.3083.
[11] J. Akimitsu,et al. Superconducting state in YSn 3 with a AuCu 3 -type structure , 2010 .
[12] K. Bohnen,et al. Effect of spin-orbit coupling on the electron-phonon interaction of the superconductors Pb and Tl , 2010 .
[13] Zi-kui Liu,et al. A first-principles approach to finite temperature elastic constants , 2010, Journal of physics. Condensed matter : an Institute of Physics journal.
[14] Stefano de Gironcoli,et al. QUANTUM ESPRESSO: a modular and open-source software project for quantum simulations of materials , 2009, Journal of physics. Condensed matter : an Institute of Physics journal.
[15] Matthieu Verstraete,et al. Density functional perturbation theory with spin-orbit coupling: Phonon band structure of lead , 2008 .
[16] Xiaojuan Liu,et al. Crystal structures and elastic properties of superhard IrN2 and IrN3 from first principles , 2007 .
[17] V. Servedio,et al. Wave-vector dependent intensity variations of the Kondo peak in photoemission fromCePd3 , 2005, cond-mat/0506202.
[18] A. Kotani,et al. Electron correlation and surface/bulk effects in various spectra of Ce compounds , 2004 .
[19] Jean-Michel Leger,et al. Synthesis and Design of Superhard Materials , 2001 .
[20] A Kokalj,et al. XCrySDen--a new program for displaying crystalline structures and electron densities. , 1999, Journal of molecular graphics & modelling.
[21] G. Kido,et al. Studies of pressure effects on the heavy fermion compound of CePb3 , 1998 .
[22] I. R. Walker,et al. The normal and superconducting states of CeIn3 near the border of antiferromagnetic order , 1997 .
[23] Yuen,et al. Magnetic phase diagram and magnetic structure of Gd(Sn1-xInx)3. , 1996, Physical review. B, Condensed matter.
[24] Taylor,et al. Evolution of the spin-orbit excitation with increasing Kondo energy in CeIn3-xSnx. , 1993, Physical review. B, Condensed matter.
[25] G. Chandra,et al. Resistivity and thermopower studies on La3X (XAl, Sn, In, Ru, Ir, Co, Ni, Ge, Ga) systems , 1993 .
[26] D. G. Pettifor,et al. Theoretical predictions of structure and related properties of intermetallics , 1992 .
[27] A. Murani. Magnetic spectral response in the intermetallic compound CeSn3 , 1983 .
[28] A. Zunger,et al. Self-interaction correction to density-functional approximations for many-electron systems , 1981 .
[29] J. M. Hastings,et al. Observation of an unusual magnetic phase transition in NdSn/sub 3/ , 1980 .
[30] M. Maple,et al. Superconducting and normal state properties of dilute alloys of LaSn3 containing Ce impurities , 1978 .
[31] H. Monkhorst,et al. SPECIAL POINTS FOR BRILLOUIN-ZONE INTEGRATIONS , 1976 .
[32] P. Lethuillier. Crystal-field effects on the superconducting transition temperature of LaSn$sub 3$:Pr, LaPb$sub 3$:Pr, and LaTl$sub 3$:Pr , 1975 .
[33] R. Dynes,et al. Transition temperature of strong-coupled superconductors reanalyzed , 1975 .
[34] R. Dynes,et al. Superconductivity at very strong coupling , 1975 .
[35] C. Chu,et al. Anomalous Tc-behavior of LaSn3 under pressure , 1975 .
[36] E. E. Havinga,et al. Oscillatory dependence of superconductive critical temperature on number of valency electrons in Cu3Au-type alloys , 1970 .
[37] W. L. Mcmillan. TRANSITION TEMPERATURE OF STRONG-COUPLED SUPERCONDUCTORS. , 1968 .
[38] R. Gambino,et al. Superconductivity of lanthanum intermetallic compounds with the Cu3Au structure , 1967 .
[39] W. Kohn,et al. Self-Consistent Equations Including Exchange and Correlation Effects , 1965 .
[40] O. Anderson,et al. A simplified method for calculating the debye temperature from elastic constants , 1963 .
[41] G. M. Éliashberg,et al. Interactions between electrons and lattice vibrations in a superconductor , 1960 .
[42] A. B. Migdal,et al. INTERACTION BETWEEN ELECTRONS AND THE LATTICE VIBRATIONS IN A NORMAL METAL , 1958 .
[43] S. Pugh. XCII. Relations between the elastic moduli and the plastic properties of polycrystalline pure metals , 1954 .
[44] R. Hill. The Elastic Behaviour of a Crystalline Aggregate , 1952 .
[45] F. Murnaghan. The Compressibility of Media under Extreme Pressures. , 1944, Proceedings of the National Academy of Sciences of the United States of America.
[46] A. Dal Corso. Elastic constants of beryllium: a first-principles investigation , 2016, Journal of physics. Condensed matter : an Institute of Physics journal.
[47] J. A. Abraham,et al. Theoretical calculations of structural, electronic, optical, elastic, and thermal properties of YX3 (X = In, Sn, Tl, and Pb) compounds based on density functional theory , 2014, Journal of Materials Science.
[48] P. Giannozzi,et al. Density-Functional Perturbation Theory for Quasi-Harmonic Calculations , 2010 .
[49] Rabe,et al. Optimized pseudopotentials. , 1990, Physical review. B, Condensed matter.
[50] G. Shenoy,et al. Magnetic and Structural Properties of Some Rare‐Earth‐Sn3 Compounds , 1970 .
[51] A. Reuss,et al. Berechnung der Fließgrenze von Mischkristallen auf Grund der Plastizitätsbedingung für Einkristalle . , 1929 .