Tuesday, January 8, 2013

1301.0941 (A. Kalz et al.)

Topological floating phase in a spatially anisotropic frustrated Ising
model
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A. Kalz, G. Chitov
We present new results for the ordering process of a two-dimensional Ising model with anisotropic frustrating next-nearest-neighbor interactions. We concentrate on a specific wide temperature and parameter region to confirm the existence of two particular phases of the model. The first phase is an incommensurate algebraically-ordered (floating) phase emerging at the transition from the paramagnetic high-temperature phase. Then the model undergoes a transition to an antiferromagnetically ordered second phase with diagonal ferromagnetic stripes (ordering wave vector $\vec q = (\pi/2, \pi/2)$). We analyze the unconventional features appearing in several observables, e.g., energy, structure factors, and correlation functions by means of extensive Monte-Carlo simulations and examine carefully the influence of the lattice sizes. For the analytical study of the intermediate phase the Villain-Bak theory is adapted for the present model. Combining both the numerical and analytical work we present the quantitative phase diagram of the model, and, in particular, argue in favor of an intermediate topological floating phase.
View original: http://arxiv.org/abs/1301.0941

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