Fizika Nizkikh Temperatur: Volume 31, Number 8-9 (August 2005), p. 952-967    ( to contents , go back )

Ordering in two-dimensional Ising models with competing interactions

Gennady Y. Chitov

Department 7.1-Theoretical Physics, University of Saarland, Saarbrücken D-66041, Germany
Department of Physics and Astronomy, Laurentian University, Sudbury, ON, P3E 2C6 Canada

Claudius Gros

Department 7.1-Theoretical Physics, University of Saarland, Saarbrücken D-66041, Germany
Institute for Theoretical Physics, Frankfurt University, Frankfurt 60438, Germany
pos Анотація:

Received February 28, 2005


We study the 2D Ising model on a square lattice with additional non-equal diagonal next-nearest neighbor interactions. The cases of classical and quantum (transverse) models are considered. Possible phases and their locations in the space of three Ising couplings are analyzed. In particular, incommensurate phases occurring only at non-equal diagonal couplings, are predicted. We also analyze a spin-pseudospin model comprised of the quantum Ising model coupled to XY spin chains in a particular region of interactions, corresponding to the Ising sector’s super-antiferromagnetic (SAF) ground state. The spin-SAF transition in the coupled Ising-XY model into a phase with co-existent SAF Ising (pseudospin) long-range order and a spin gap is considered. Along with destruction of the quantum critical point of the Ising sector, the phase diagram of the Ising-XY model can also demonstrate a re-entrance of the spin-SAF phase. A detailed study of the latter is presented. The mechanism of the re-entrance, due to interplay of interactions in the coupled model, and the conditions of its appearance are established. Applications of the spin-SAF theory for the transition in the quarter-filled ladder compound NaV2O5 are discussed.

71.10.Fd - Lattice fermion models (Hubbard model, etc.)
71.10.Hf - Non-Fermi-liquid ground states, electron phase diagrams and phase transitions in model systems
75.30.Et - Exchange and superexchange interactions (see also 71.70.-d Level splitting and interactions)
64.60.-i - General studies of phase transitions (see also 63.70.+h Statistical mechanics of lattice vibrations and displacive phase transitions; for critical phenomena in solid surfaces and interfaces, and in magnetism, see 68.35.Rh, and 75.40.-s, respectively)
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