2015
DOI: 10.1103/physreve.91.052109
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Three-dimensional antiferromagneticCPN1models

Abstract: We investigate the critical behavior of three-dimensional antiferromagnetic CP N−1 (ACP N−1 ) models in cubic lattices, which are characterized by a global U(N ) symmetry and a local U(1) gauge symmetry. Assuming that critical fluctuations are associated with a staggered gauge-invariant (hermitian traceless matrix) order parameter, we determine the corresponding Landau-GinzburgWilson (LGW) model. For N = 3 this mapping allows us to conclude that the three-component ACP 2 model undergoes a continuous transition… Show more

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Cited by 33 publications
(45 citation statements)
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“…If statistical fluctuations are small-this is the basic assumption-the transition is of first order also in three dimensions. In this approach, continuous transitions may still occur, but they require a fine tuning of the microscopic parameters, leading to the effective cancellation of the cubic term [56].…”
Section: The Gauge-invariant Lgw Frameworkmentioning
confidence: 99%
“…If statistical fluctuations are small-this is the basic assumption-the transition is of first order also in three dimensions. In this approach, continuous transitions may still occur, but they require a fine tuning of the microscopic parameters, leading to the effective cancellation of the cubic term [56].…”
Section: The Gauge-invariant Lgw Frameworkmentioning
confidence: 99%
“…They are obtained from the results reported in Refs. [58,[68][69][70][71]. The RG analysis of the continuum AH field theory, see, e.g., Refs.…”
Section: Phase Diagram Along the κ = ∞ Linementioning
confidence: 99%
“…The physics of AFM low-energy excitations is most transparent upon a mapping onto two sub-lattices [32][33][34][35][36] denoted A and B with antiparallel spins (cf. Fig.…”
Section: Afm Magnonic Dirac Dynamicsmentioning
confidence: 99%
“…The ordering in each sublattice is FM but a translation by a lattice vector transforms S(r + a) → − S(r), meaning that the translational invariance is broken. Thus, the AFM Heisenberg system is mappable onto an antiferromagnetic (AFM) CP 1 model 36 . Note, the AFM Hamiltonian is still invariant under the combined time-reversal (T ) and sub-lattice exchange (I ), a fact underlying the degeneracy of the two chiral magnon modes.…”
Section: Afm Magnonic Dirac Dynamicsmentioning
confidence: 99%
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