A quantum magnetic analogue to the critical point of water

J. Larrea Jiménez, S. P. G. Crone, E. Fogh, M. E. Zayed, R. Lortz, E. Pomjakushina, K. Conder, A. M. Läuchli, L. Weber, S. Wessel, A. Honecker, B. Normand, Ch. Rüegg, P. Corboz, H. M. Rønnow () and F. Mila
Additional contact information
J. Larrea Jiménez: University of São Paulo
S. P. G. Crone: University of Amsterdam
E. Fogh: Ecole Polytechnique Fédérale de Lausanne (EPFL)
M. E. Zayed: Carnegie Mellon University in Qatar
R. Lortz: Hong Kong University of Science and Technology
E. Pomjakushina: Paul Scherrer Institute
K. Conder: Paul Scherrer Institute
A. M. Läuchli: Universität Innsbruck
L. Weber: RWTH Aachen University
S. Wessel: RWTH Aachen University
A. Honecker: Laboratoire de Physique Théorique et Modélisation, CNRS UMR 8089, CY Cergy Paris Université
B. Normand: Ecole Polytechnique Fédérale de Lausanne (EPFL)
Ch. Rüegg: Ecole Polytechnique Fédérale de Lausanne (EPFL)
P. Corboz: University of Amsterdam
H. M. Rønnow: Ecole Polytechnique Fédérale de Lausanne (EPFL)
F. Mila: Ecole Polytechnique Fédérale de Lausanne (EPFL)

Nature, 2021, vol. 592, issue 7854, 370-375

Abstract: Abstract At the liquid–gas phase transition in water, the density has a discontinuity at atmospheric pressure; however, the line of these first-order transitions defined by increasing the applied pressure terminates at the critical point1, a concept ubiquitous in statistical thermodynamics2. In correlated quantum materials, it was predicted3 and then confirmed experimentally4,5 that a critical point terminates the line of Mott metal–insulator transitions, which are also first-order with a discontinuous charge carrier density. In quantum spin systems, continuous quantum phase transitions6 have been controlled by pressure7,8, applied magnetic field9,10 and disorder11, but discontinuous quantum phase transitions have received less attention. The geometrically frustrated quantum antiferromagnet SrCu2(BO3)2 constitutes a near-exact realization of the paradigmatic Shastry–Sutherland model12–14 and displays exotic phenomena including magnetization plateaus15, low-lying bound-state excitations16, anomalous thermodynamics17 and discontinuous quantum phase transitions18,19. Here we control both the pressure and the magnetic field applied to SrCu2(BO3)2 to provide evidence of critical-point physics in a pure spin system. We use high-precision specific-heat measurements to demonstrate that, as in water, the pressure–temperature phase diagram has a first-order transition line that separates phases with different local magnetic energy densities, and that terminates at an Ising critical point. We provide a quantitative explanation of our data using recently developed finite-temperature tensor-network methods17,20–22. These results further our understanding of first-order quantum phase transitions in quantum magnetism, with potential applications in materials where anisotropic spin interactions produce the topological properties23,24 that are useful for spintronic applications.

Date: 2021
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DOI: 10.1038/s41586-021-03411-8

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