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Romhányi, Judit; Totsuka, Keisuke; Penc, Karlo

doi:10.1103/physrevb.83.024413

Cited by 45 publications

(48 citation statements)

References 47 publications

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“…The natural way to do this is to perform a standard Holstein-Primakoff expansion for the 4-fold spins and a bond-wave expansion 18,19 for the 3-fold dimers. The corresponding quadratic theory is presented in Sec.…”

Section: Main Results and Organization Of The Articlementioning

confidence: 99%

“…So we refine our treatment to include the quadratic fluctuations around the variational state, by performing a semi-classical spin wave expansion for the 4-fold sites and a bond-wave expansion 18,19 for the J 33 -dimers. Figure 6 shows the unit cell of the lattice and the orthogonal variational state around which we expand.…”

Section: A Linear Spin+bond-wave Theorymentioning

confidence: 99%

“…These bosons will be denoted by {s, t 1 , t 0 , t −1 } i and {s 6). The spin operators of the two sites of each dimer have the following bosonic representation 18,19 …”

Section: A Linear Spin+bond-wave Theorymentioning

confidence: 99%

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Quantum magnetism on the Cairo pentagonal lattice

2012

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We present an extensive analytical and numerical study of the antiferromagnetic Heisenberg model on the Cairo pentagonal lattice, the dual of the Shastry-Sutherland lattice with a close realization in the S = 5/2 compound Bi2Fe4O9. We consider a model with two exchange couplings suggested by the symmetry of the lattice, and investigate the nature of the ground state as a function of their ratio x and the spin S. After establishing the classical phase diagram we switch on quantum mechanics in a gradual way that highlights the different role of quantum fluctuations on the two inequivalent sites of the lattice. The most important findings for S = 1/2 include: (i) a surprising interplay between a collinear and a four-sublattice orthogonal phase due to an underlying order-by-disorder mechanism at small x (related to an emergent J1-J2 effective model with J2 ≫ J1), and (ii) a non-magnetic and possibly spin-nematic phase with d-wave symmetry at intermediate x.

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Section: Main Results and Organization Of The Articlementioning

confidence: 99%

Section: A Linear Spin+bond-wave Theorymentioning

confidence: 99%

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Quantum magnetism on the Cairo pentagonal lattice

2012

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“…The lattice geometry of SrCu 2 (BO 3 ) 2 is also responsible for ensuring that the excited states of the magnet-called triplons-are almost flat across the Brillouin zone [14][15][16] . The predominant contribution to the weak dispersion of these modes is due to subleading magnetic exchange couplings which are antisymmetric Dzyaloshinskii-Moriya (DM) interactions 17,18 . These DM interactions are responsible for complex hopping amplitudes of the triplons which may then pick up Berry phases around closed paths.…”

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Topological triplon modes and bound states in a Shastry–Sutherland magnet

McClarty¹,

Krüger²,

Guidi³

et al. 2017

Nature Phys

103

102

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The twin discoveries of the quantum Hall e ect 1 , in the 1980s, and of topological band insulators 2 , in the 2000s, were landmarks in physics that enriched our view of the electronic properties of solids. In a nutshell, these discoveries have taught us that quantum mechanical wavefunctions in crystalline solids may carry nontrivial topological invariants which have ramifications for the observable physics. One of the side e ects of the recent topological insulator revolution has been that such physics is much more widespread than was appreciated ten years ago. For example, while topological insulators were originally studied in the context of electron wavefunctions, recent work has initiated a hunt for topological insulators in bosonic systems: in photonic crystals [3][4][5][6] , in the vibrational modes of crystals 7 , and in the excitations of ordered magnets 8 . Using inelastic neutron scattering along with theoretical calculations, we demonstrate that, in a weak magnetic field, the dimerized quantum magnet SrCu 2 (BO 3 ) 2 is a bosonic topological insulator with topologically protected chiral edge modes of triplon excitations.The quantum magnet SrCu 2 (BO 3 ) 2 is famous in the magnetism community 9 especially for its rich in-field phase diagram reflected in a series of magnetization plateaux 10,11 . The material is composed of layers of strongly interacting S = 1/2 copper moments arranged on the lattice illustrated in Fig. 1. Nearest-neighbour moments bind together in pairs (dimers), forming quantum mechanical singlets. Neighbouring dimers have an orthogonal arrangement ( Fig. 1).Most magnetic materials undergo a transition into long-range magnetic order, so the fact that the ground state of this material is both interacting and with only short-range correlations is remarkable: a consequence of the frustrating effect of the Shastry-Sutherland lattice geometry 12,13 . The lattice geometry of SrCu 2 (BO 3 ) 2 is also responsible for ensuring that the excited states of the magnet-called triplons-are almost flat across the Brillouin zone [14][15][16] . The predominant contribution to the weak dispersion of these modes is due to subleading magnetic exchange couplings which are antisymmetric Dzyaloshinskii-Moriya (DM) interactions 17,18 . These DM interactions are responsible for complex hopping amplitudes of the triplons which may then pick up Berry phases around closed paths. Their role is therefore similar to that of spin-orbit coupling in electronic topological insulators. Based on a theoretical model of non-interacting triplons, Romhanyi et al.19 predicted that in a small magnetic field the triplon bands of SrCu 2 (BO 3 ) 2 acquire a nontrivial topological invariant, called a Chern number, which implies the existence of chiral magnetic edge states.In this Letter, we present new inelastic neutron scattering (INS) results exploring the low-energy magnetic excitations of SrCu 2 (BO 3 ) 2 in small magnetic fields of up to 2.8 T perpendicular to the dimer planes. This provides unprecedented insight into the nat...

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“…5(c). The systematic analysis including all anisotropic interactions (intra-and interdimer DM interactions and g-tensor anisotropy [52][53][54]) is left for future investigation.…”

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confidence: 99%

Crystals of Bound States in the Magnetization Plateaus of the Shastry-Sutherland Model

2014

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Using infinite projected entangled-pair states (iPEPS), we show that the Shastry-Sutherland model in an external magnetic field has low-magnetization plateaus which, in contrast to previous predictions, correspond to crystals of bound states of triplets, and not to crystals of triplets. The first sizable plateaus appear at magnetization 1/8, 2/15 and 1/6, in agreement with experiments on the orthogonal-dimer antiferromagnet SrCu2(BO3)2, and they can be naturally understood as regular patterns of bound states, including the intriguing 2/15 one. We also show that, even in a confined geometry, two triplets bind into a localized bound state with Sz = 2. Finally, we discuss the role of competing domain-wall and supersolid phases as well as that of additional anisotropic interactions. PACS numbers: 75.10.Jm, 75.40.Mg, 75.10.Kt, Predicting the phases of frustrated spin systems is one of the major challenges in theoretical condensed matter physics [1]. A famous example is the Shastry-Sutherland model (SSM) [2], which is believed to accurately capture the physics of the orthogonal-dimer antiferromagnet SrCu 2 (BO 3 ) 2 . A big effort has been invested in understanding the appearance of various magnetization plateaus observed in experiments [3][4][5][6][7][8][9][10][11][12][13]. Early on it was found that the SSM has almost localized triplet excitations [5,14] which suggests that each plateau corresponds to a particular crystal of localized triplets. This viewpoint has been supported by many analytical and (approximate) numerical studies over the last 15 years [14][15][16][17][18][19][20][21][22][23][24][25].The SSM is given by the Hamiltonianwhere the i, j bonds with coupling strength J build an array of orthogonal dimers while the bonds with coupling J denote inter-dimer couplings, and h the strength of the external magnetic field. The main result of this Letter is that -in contrast to the standard belief -the plateaus are not crystals of S z = 1 triplets (see Fig. 1(a)), but of S z = 2 bound states of triplets, which form a pinwheel pattern as shown in Fig. 1(b), and which are shown to be stable even if they are localized. Bound states have previously been predicted to be relevant in the dilute limit of excitations [16,[26][27][28][29], but not for the formation of crystals. The only hint so far that bound states can form crystals was found in a one-dimensional analog -a SSM spin tube [30]. It is also shown that the crystals formed by the bound states naturally explain the sequence of magnetization plateaus observed in SrCu 2 (BO 3 ) 2 . In particular, the 2/15 plateau is made of a simple and regular pattern of bound states, in contrast to the more complicated patterns of triplets which were previously suggested [12,21,24].Method -Our results have been obtained with infinite projected entangled-pair states (iPEPS) -a variational tensornetwork ansatz to represent a two-dimensional wave function in the thermodynamic limit [31][32][33]. It consists of a cell of tensors which is periodically repeated on the lattice, where ...

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Effect of Dzyaloshinskii-Moriya interactions on the phase diagram and magnetic excitations of SrCu2(BO3)
Judit Romhányi
¹
,
Keisuke Totsuka
²
,
Karlo Penc
³

Cited by 45 publications

References 47 publications

Quantum magnetism on the Cairo pentagonal lattice

Quantum magnetism on the Cairo pentagonal lattice

Topological triplon modes and bound states in a Shastry–Sutherland magnet

Crystals of Bound States in the Magnetization Plateaus of the Shastry-Sutherland Model

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Effect of Dzyaloshinskii-Moriya interactions on the phase diagram and magnetic excitations of SrCu2(BO3)Judit Romhányi1, Keisuke Totsuka2, Karlo Penc3

Cited by 45 publications

References 47 publications

Quantum magnetism on the Cairo pentagonal lattice

Quantum magnetism on the Cairo pentagonal lattice

Topological triplon modes and bound states in a Shastry–Sutherland magnet

Crystals of Bound States in the Magnetization Plateaus of the Shastry-Sutherland Model

Contact Info

Product

Resources

About

Effect of Dzyaloshinskii-Moriya interactions on the phase diagram and magnetic excitations of SrCu2(BO3)
Judit Romhányi
¹
,
Keisuke Totsuka
²
,
Karlo Penc
³