%e analyze the possibility of the appearance of long-range correlations of states of quenched defect systems in disordered solids. For randomly distributed defects with a finite number of degenerate internal degrees of freedom such correlations are shown to appear near the defect percolation threshold if they obey certain nearest-neighbor correlation rules. The corresponding efFective Hamiltonian can be viewed as that of a generalized m-component long-range correlated %einrib-Halperin model. Our renormalization-group investigation shows, however, that it asymptotically decomposes into a set of m noninteracting one-component Weinrib-Halperin models. The coordinates of the stable fixed point of this model are determined to O(c~)
Real crystals almost unavoidably contain a finite density of dislocations. We show that this generic type of long-range correlated disorder leads to a breakdown of the conventional scenario of critical behavior and standard renormalization group techniques based on the existence of a simple, homogeneous ground state. This breakdown is due to the appearance of an inhomogeneous ground state that changes the character of the phase transition to that of a percolative phenomenon. This scenario leads to a natural explanation for the appearance of two length scales in recent high resolution small-angle scattering experiments near magnetic and structural phase transitions.
64.60.Ak,75.10.NrThe modern theory of phase transitions (PTs) in pure and weakly disordered crystals is based on the scaling hypothesis and the renormalization group (RG). It has been confirmed by a large number of experiments and numerical simulations.Therefore, the results of some recent high resolution X-ray and neutron scattering experiments for various crystals near structural and magnetic PTs were quite unexpected [1]: in contrast to the predictions of conventional scaling theory two distinct large scales were observed. The temperature dependence of the smaller scale was found to be broadly consistent with the results of the conventional theory for the correlation scale of thermal fluctuations. Quite recently explicit experimental evidence for Verneuil grown samples of SrTiO 3 [2] confirmed earlier speculations that the second, larger scale is connected with the presence of defects in a very large region near the surface.All experiments that found two length scales used crystals which were considered to be of good quality. Nevertheless, surface preparation creates a significant density of defects in a surface layer with a thickness up to several µ [1-4]. Based on this observation, Altarelli et al. suggested [5] that most of the defects are actually dislocation dipoles which induce elastic strains with a pair correlator G(r) ∼ |r| −2 . They tried to explain the critical behavior (CB) in the disordered layer as that of the Weinrib-Halperin (WH) model [6]. The coexistence of two scales was then interpreted as a simple superposition effect, with scattering from the larger scale in the disordered layer (where the CB is governed by the WH fixed point) and from the smaller scale (corresponding to conventional CB) in the bulk of the sample. However, later experiments using very thin Holmium films found clear evidence that near the magnetic PT temperature both scales coexist in the same volume fraction of the sample [7].By construction, the conventional RG procedure is not able to explain the simultaneous existence of two length scales. Not only its detailed value and temperature dependence, but even the principal theoretical basis for the origin of the second length scale appears to be unclear.In this Letter we point out the shortcomings of the RG procedure for the treatment of systems with weak, but long-range (LR) correlated disorder, the generic sit...
The critical behaviour of the generalized (anisotropic) m-component Weinrib-Halperin model is investigated. The critical exponent η and the dynamic exponent z are calculated in d = 4 - ε space dimension in a two- and one-loop approximation, respectively. Using the fermionic formulation we have derived an exact result for the correlation length exponent ν of the two-dimensional Ising model with long-range correlated quenched defects.
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.