2015
DOI: 10.1103/physrevlett.114.116101
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Nature of Long-Range Order in Stripe-Forming Systems with Long-Range Repulsive Interactions

Abstract: We study two dimensional stripe forming systems with competing repulsive interactions decaying as r(-α). We derive an effective Hamiltonian with a short-range part and a generalized dipolar interaction which depends on the exponent α. An approximate map of this model to a known XY model with dipolar interactions allows us to conclude that, for α<2 long-range orientational order of stripes can exist in two dimensions, and establish the universality class of the models. When α≥2 no long-range order is possible, … Show more

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Cited by 32 publications
(23 citation statements)
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“…A particularly interesting and poorly understood phenomenon is that of periodic stripe formation [29,30,37,39]. In a series of papers, this phenomenon was studied in Ising and related models with short range attractive and long range repulsive interactions.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…A particularly interesting and poorly understood phenomenon is that of periodic stripe formation [29,30,37,39]. In a series of papers, this phenomenon was studied in Ising and related models with short range attractive and long range repulsive interactions.…”
Section: Introduction and Main Resultsmentioning
confidence: 99%
“…All the literature we are aware of supports the absence of long-range positional order of domains at finite temperature171821, thus suggesting that not even a kind of staggered magnetization associated with the striped pattern is expected to display the 2D-Ising critical behaviour (nor the MF critical behaviour foreseen by Wasilevsky1112). In the prevailing understanding of critical phenomena the fulfilment of equation (2) and other scaling relations is associated directly with spontaneous breaking of a specific symmetry of the Hamiltonian in b =0.…”
Section: Resultsmentioning
confidence: 89%
“…Concrete realizations of this model involve either Coulomb repulsion ( α =1) or dipole–dipole antiferromagnetic interaction ( α =3) that competes with a ferromagnetic short-ranged interaction22. This competition leads to the formation of a striped ground state whose elementary excitations are described by an elastic-like Hamiltonian associated with the displacement of domain walls—as a result of the subtle interplay between the two interactions1721. The experimental results presented in the next subsections refer to a ferromagnetic model system representative of the Hamiltonian (1) with α =3 (refs 18, 19, 27, 33, 34, 35, 36).…”
Section: Resultsmentioning
confidence: 99%
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