The topological properties of fermions arise from their low-energy Dirac-like band dispersion and associated chirality. Initially confined to points, extensions of the Dirac dispersion to lines, and even loops, have now been uncovered, and semimetals hosting such features have been identified. However, experimental evidence for the enhanced correlation effects predicted to occur in these topological semimetals has been lacking. Here, we report a quantum oscillation study of the nodal-loop semimetal ZrSiS in high magnetic fields that reveals significant enhancement in the effective mass of the quasiparticles residing near the nodal loop. Above a threshold field, magnetic breakdown occurs across gaps in the loop structure with orbits that enclose different windings around its vertices, each winding accompanied by an additional π Berry phase. The amplitudes of these breakdown orbits exhibit an anomalous temperature dependence. These findings demonstrate the emergence of novel, correlation-driven physics in ZrSiS associated with the Dirac-like quasiparticles.
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Volovik, G. E. The Universe in a Helium Droplet (Oxford Univ. Press, 2007).
Kane, C. L. & Mele, E. J. Z2 topological order and the quantum spin Hall effect. Phys. Rev. Lett. 95, 146802 (2005).
Bernevig, B. A., Hughes, T. L. & Zhang, S.-C. Quantum spin Hall effect and topological phase transition in HgTe quantum wells. Science 314, 1757–1761 (2006).
Moore, J. E. & Balents, L. Topological invariants of time-reversal-invariant band structures. Phys. Rev. B 75, 121306 (2007).
Konig, M. et al. Quantum spin Hall insulator state in HgTe quantum wells. Science 318, 766–770 (2007).
Young, S. M. et al. Dirac semimetal in three dimensions. Phys. Rev. Lett. 108, 140405 (2012).
Young, S. M. & Kane, C. L. Dirac semimetals in two dimensions. Phys. Rev. Lett. 115, 126803 (2015).
Weng, H. et al. Topological node-line semimetal in three-dimensional graphene networks. Phys. Rev. B 92, 045108 (2015).
Wu, Y. et al. Dirac node arcs in PtSn4 . Nat. Phys. 12, 667–671 (2016).
Bian, G. et al. Topological nodal-line fermions in spin-orbit metal PbTaSe2 . Nat. Commun. 7, 10556 (2016).
Neupane, M. et al. Observation of topological nodal fermion semimetal phase in ZrSiS. Phys. Rev. B 93, 201104(R) (2016).
Schoop, L. M. et al. Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS. Nat. Commun. 7, 11696 (2016).
Burkov, A. A. Topological semimetals. Nat. Mater. 15, 1145–1148 (2016).
Fang, C., Weng, H., Dai, X. & Fang, Z. Topological nodal line semimetals. Chin. Phys. B 25, 117106 (2016).
Huh, Y., Moon, E.-G. & Kim, Y.-B. Long-range Coulomb interaction in nodal-ring semimetals. Phys. Rev. B 93, 035138 (2016).
Roy, B. Interacting line-node semimetal and spontaneous symmetry breaking. Phys. Rev. B 96, 041113 (2017).
Liu, J. & Balents, L. Correlation and transport phenomena in topological nodal-loop semi-metals. Phys. Rev. B 95, 075426 (2017).
Wang, X. et al. Evidence of both surface and bulk Dirac bands and anisotropic non-saturating magnetoresistance in ZrSiS. Adv. Electron. Mater. 2, 1600228 (2016).
Ali, M. N. et al. Butterfly magnetoresistance, quasi-2D Dirac Fermi surfaces and a topological phase transition in ZrSiS. Sci. Adv. 2, e1601742 (2016).
Hu, J. et al. Evidence of topological nodal-line fermions in ZrSiSe and ZrSiTe. Phys. Rev. Lett. 117, 016602 (2016).
Singha, R., Pariari, A., Satpati, B. & Mandal, P. Large non-saturating magnetoresistance and signature of non-degenerate Dirac nodes in ZrSiS. Proc. Natl Acad. Sci. USA 114, 2468–2473 (2017).
Hu, J. et al. Nearly massless Dirac fermions and strong Zeeman splitting in the nodal-line semimetal ZrSiS probed by de Haas–van Alphen quantum oscillations. Phys. Rev. B 96, 045127 (2017).
Topp, A. et al. Non-symmorphic band degeneracy at the Fermi level in ZrSiTe. New J. Phys. 13, 125014 (2016).
Tan, B. S. et al. Unconventional Fermi surface in an insulating state. Science 349, 287–290 (2015).
Klein Haneveld, A. J. & Jellinek, F. Zirconium silicide and germanide chalcogenides preparation and crystal structures. Rec. Trav. Chim. Pays-Bas 83, 776–783 (1964).
Xu, Q. et al. Two-dimensional oxide topological insulator with iron-pnictide superconductor LiFeAs structure. Phys. Rev. B 92, 205310 (2015).
Lv, Y.-Y. et al. Extremely large and significantly anisotropic magnetoresistance in ZrSiS single crystals. Appl. Phys. Lett. 108, 244101 (2016).
Matusiak, M., Cooper, J. R. & Kaczorowski, D. Thermoelectric quantum oscillations in ZrSiS. Nat. Commun. 8, 15219 (2017).
Gvozdikov, V. M., Pershin, Y. V., Steep, E., Jansen, A. G. M. & Wyder, P. de Haas–van Alphen oscillations in the quasi-two-dimensional organic conductor κ-(ET)2Cu(NCS)2: the magnetic breakdown approach. Phys. Rev. B 65, 165102 (2002).
Elias, D. C. et al. Dirac cones reshaped by interaction effects in suspended graphene. Nat. Phys. 7, 701–704 (2011).
Yu, G. L. et al. Interaction phenomena in graphene seen through quantum capacitance. Proc. Natl Acad. Sci. USA 110, 3282–3286 (2013).
Gegenwart, P. et al. Magnetic-field induced quantum critical point in YbRh2Si2 . Phys. Rev. Lett. 89, 056402 (2002).
Paglione, J. et al. Field-induced quantum critical point in CeCoIn5 . Phys. Rev. Lett. 91, 246405 (2003).
Shoenberg, D. Magnetic Oscillations in Metals (Cambridge Univ. Press, 1984).
Schrieffer, J. R. Theory of Superconductivity (Perseus Books, 1983).
Kishigi, K., Nakano, M., Machida, K. & Hori, Y. dHvA effect with quantum interference oscillation due to magnetic breakdown. J. Phys. Soc. Jpn 64, 3043–3059 (1995).
Pal, H. K., Piechon, F., Fuchs, J.-N., Goerbig, M. & Montambaux, G. Chemical asymmetry and quantum oscillations in insulators. Phys. Rev. B 94, 125140 (2016).
Dzero, M., Sun, K., Galitski, V. & Coleman, P. Topological Kondo insulators. Phys. Rev. Lett. 104, 106408 (2010).
Knolle, J. & Cooper, N. R. Quantum oscillations without a Fermi surface and the anomalous de Haas–van Alphen effect. Phys. Rev. Lett. 115, 146401 (2015).
Knolle, J. & Cooper, N. R. Anomalous de Haas–van Alphen effect in InAs/GaSb quantum wells. Phys. Rev. Lett. 118, 176801 (2017).
Virosztek, A. & Ruvalds, J. Nested Fermi-liquid theory. Phys. Rev. B 42, 4064–4074 (1990).
Blaha, P., Schwarz, K., Madsen, G. K. H., Kvasnicka, D. & Luitz, J. WIEN2k, An Augmented Plane Wave + Local Orbitals Program for Calculating Crystal Properties (Karlheinz Schwarz, Techn. Universität Wien, 2001).
Perdew, J. P., Burke, S. & Ernzerhof, M. Generalized gradient approximation made simple. Phys. Rev. Lett. 77, 3865–3868 (1996).
We acknowledge enlightening discussions with Y.-B. Kim and A. McCollam. We also acknowledge the support of the HFML-RU/FOM, member of the European Magnetic Field Laboratory (EMFL). A portion of this work was supported by the Engineering and Physical Sciences Research Council (grant no. EP/K016709/1).
The authors declare no competing financial interests.
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Pezzini, S., van Delft, M., Schoop, L. et al. Unconventional mass enhancement around the Dirac nodal loop in ZrSiS. Nat. Phys. 14, 178–183 (2018). https://doi.org/10.1038/nphys4306
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