Inhomogeneous systems with unusual critical behaviour

Iglói, Ferenc; Peschel, Ingo; Turban, L.

doi:10.1080/00018739300101544

Cited by 128 publications

(205 citation statements)

References 165 publications

(220 reference statements)

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“…(1) have been studied before in two-dimensional Ising [34], Gaussian [35] and directed walk models [36], as well as in the mean-field approximation [37]; for a review, see Ref. [38]. According to exact results the local critical behavior in these problems is in agreement with the relevance-irrelevance criterion in Eq.…”

Section: Introductionsupporting

confidence: 65%

“…The local critical behavior of the contact process at an extended surface defect seems to be similar to that of the planar Ising model with an extended surface defect, for which analytical results exist [34,[38][39][40]. In that model, in the marginal case s = 1/ν = 1, the spatial spin cor- In the contact process, the quantity which is analogous to G (r) is the density autocorrelation function C(t 2 − t 1 ) in the steady state.…”

Section: Numerical Resultsmentioning

confidence: 89%

“…The singular behavior of the surface order parameter can be calculated through a scaling theory [38]. For enhanced surface couplings, A > 0, the survival probability (surface order parameter) stays finite at the bulk critical point and it satisfies the scaling relation:…”

Section: Scaling Considerations For Relevant Inhomogeneitiesmentioning

confidence: 99%

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Nonuniversal and anomalous critical behavior of the contact process near an extended defect

Juhász

Iglói

2018

Phys. Rev. E

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We consider the contact process near an extended surface defect, where the local control parameter deviates from the bulk one by an amount of λ(l) − λ(∞) = Al −s , l being the distance from the surface. We concentrate on the marginal situation, s = 1/ν ⊥ , where ν ⊥ is the critical exponent of the spatial correlation length, and study the local critical properties of the one-dimensional model by Monte Carlo simulations. The system exhibits a rich surface critical behavior. For weaker local activation rates, A < Ac, the phase transition is continuous, having an order-parameter critical exponent, which varies continuously with A. For stronger local activation rates, A > Ac, the phase transition is of mixed order: the surface order parameter is discontinuous, at the same time the temporal correlation length diverges algebraically as the critical point is approached, but with different exponents on the two sides of the transition. The mixed-order transition regime is analogous to that observed recently at a multiple junction and can be explained by the same type of scaling theory.

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Section: Introductionsupporting

confidence: 65%

Section: Numerical Resultsmentioning

confidence: 89%

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Nonuniversal and anomalous critical behavior of the contact process near an extended defect

Juhász

Iglói

2018

Phys. Rev. E

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“…The opening angle is therefore a marginal variable in a renormalization transformation, and may enter into the expressions for the exponents. The same will happen for all other scale-invariant shapes of the boundaries [25]. However, for a given opening angle, the values of the critical exponents are expected to be universal and independent of microscopic details.…”

Section: Introductionmentioning

confidence: 99%

Critical adsorption and Casimir torque in wedges and at ridges

Palágyi

Dietrich

2004

Phys. Rev. E

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Geometrical structures of confining surfaces profoundly influence the adsorption of fluids upon approaching a critical point Tc in their bulk phase diagram, i.e., for t = (T −Tc)/Tc → ±0. Guided by general scaling considerations, we calculate, within mean-field theory, the temperature dependence of the order parameter profile in a wedge with opening angle γ < π and close to a ridge (γ > π) for T ≷ Tc and in the presence of surface fields. For a suitably defined reduced excess adsorption Γ±(γ, t → ±0) ∼ Γ±(γ)|t| β−2ν we compute the universal amplitudes Γ±(γ), which diverge as Γ±(γ → 0) ∼ 1/γ for small opening angles, vary linearly close to γ = π for γ < π, and increase exponentially for γ → 2π. There is evidence that, within mean-field theory, the ratio Γ+(γ)/Γ−(γ) is independent of γ. We also discuss the critical Casimir torque acting on the sides of the wedge as a function of the opening angle and temperature.

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“…At the very critical point the appropriate way to describe the position dependent physical quantities is to use density profiles rather then bulk and surface observables. For a number of universality classes much is known about the spatially inhomogeneous behavior, in particular in two-dimensions, where conformal invariance provides a powerful tool to study various geometries [22].…”

Section: B Profiles Of Observablesmentioning

confidence: 99%

Random transverse Ising spin chain and random walks

1998

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We study the critical and off-critical (Griffiths-McCoy) regions of the random transverse-field Ising spin chain by analytical and numerical methods and by phenomenological scaling considerations. Here we extend previous investigations to surface quantities and to the ferromagnetic phase. The surface magnetization of the model is shown to be related to the surviving probability of an adsorbing walk and several critical exponents are exactly calculated. Analyzing the structure of low energy excitations we present a phenomenological theory which explains both the scaling behavior at the critical point and the nature of Griffiths-McCoy singularities in the off-critical regions. In the numerical part of the work we used the free-fermion representation of the model and calculated the critical magnetization profiles, which are found to follow very accurately the conformal predictions for different boundary conditions. In the off-critical regions we demonstrated that the GriffithsMcCoy singularities are characterized by a single, varying exponent, the value of which is related through duality in the paramagnetic and ferromagnetic phases.

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Inhomogeneous systems with unusual critical behaviour

Cited by 128 publications

References 165 publications

Nonuniversal and anomalous critical behavior of the contact process near an extended defect

Nonuniversal and anomalous critical behavior of the contact process near an extended defect

Critical adsorption and Casimir torque in wedges and at ridges

Random transverse Ising spin chain and random walks

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