Critical behavior at<i>m</i>-axial Lifshitz points: Field-theory analysis and ε-expansion results

Diehl, H. W.; Shpot, M. A.

doi:10.1103/physrevb.62.12338

Cited by 68 publications

(169 citation statements)

References 42 publications

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confidence: 99%

“…The RG analysis by Mergulhão and Carneiro has been used in a attempt to extend the calculation for all m. Using the fact that the quartic momenta scale including σ and the quadratic external momenta scales are equal Diehl and Shpot considered the anisotropic problem for general m [31,32]. In their first work [31], they worked directly in position space. After that, using a hybrid approach, going to coordinate or momentum space using the free propagator (scaling function) in coordinate space to make the transition according to the necessity, they calculated the critical exponents using a minimal subtraction procedure which sets the external quartic momenta scales to zero.…”

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Renormalization-group picture of the Lifshitz critical behavior

Leite

2003

Phys. Rev. B

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New field theoretic renormalization group methods are developed to describe in a unified fashion the critical exponents of an m-fold Lifshitz point at the two-loop order in the anisotropic (m = d) and isotropic (m = d close to 8) situations. The general theory is illustrated for the N -vector φ 4 model describing a d-dimensional system. A new regularization and renormalization procedure is presented for both types of Lifshitz behavior. The anisotropic cases are formulated with two independent renormalization group transformations. The description of the isotropic behavior requires only one type of renormalization group transformation. We point out the conceptual advantages implicit in this picture and show how this framework is related to other previous renormalization group treatments for the Lifshitz problem. The Feynman diagrams of arbitrary loop-order can be performed analytically provided these integrals are considered to be homogeneous functions of the external momenta scales.

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Renormalization-group picture of the Lifshitz critical behavior

Leite

2003

Phys. Rev. B

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“…A well-known model is the Anisotropic Next Nearest Neighbour-interaction Ising (ANNNI) model. There have been a great deal of work on the static critical proprties at the Lifshitz point; recent references include Frisch, Kimball and Binder [7], Diehl, Shpot and Zia [8], Shpot and Diehl [9], Leite [10], Pleimling and Henkel [11]. There have been few studies on the dynamical properties at the Lifshitz point; see, e.g., Huber [12], Folk and Selke [13], Selke [14], and Selke [15].…”

Section: Equation Of Motion For Our Systemmentioning

confidence: 99%

Scaling in a temperature quench in systems with a Lifshitz point: nonconserved and conserved order parameters

Basu

Bhattacharjee

2004

J. Phys. A: Math. Gen.

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We study the growth of an N -component (including N = 1) order parameter when a system with a Lifshitz point is quenched from the homogeneous disordered state to the ordered states. We study the scaling behaviours of the structure factors for both the non-conserved and conserved order parameters in the long time limit after a quench through the Lifshitz point by using the large-N and renormalisation group (RG) methods. We construct the analogues of Allen-Cahn and Lifshitz-Slyzov growth laws for nonconserved and conserved order parameters which agree with our RG results for N = 1. By extending our large-N methods to the anisotropic Lifshitz point we show that the anisotropy is relevant for the growth of the nonconserved order parameter, but irrelevant for the conserved case in the large-N limit. We discuss the effects of mode coupling terms on scaling of the structure factor for the conserved order parameter case. We also consider the ordering dynamics after a quench through an off-Lifshitz point. In a large-N set up we calculate the form of the structure factors of a non-conserved order parameter when a system is quenched from the homogeneous paramegnetic to the modulated phase. We show that after a quench from the paramegnetic to the modulated phase the form of the structure factor violates the standard form of dynamical scaling. Our results compare favourably with the available numerical results.

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“…Recent investigations of the associated critical exponents for the m-axial Lifshitz universality class have been put forward using numerical Monte Carlo simulations [3] and fieldtheoretic approaches [4][5][6]. Within the perturbative ǫ L -expansion, there are two proposals in order to unravel the higher loop structure of this sort of critical behavior.…”

Section: Introductionmentioning

confidence: 99%

“…Within the perturbative ǫ L -expansion, there are two proposals in order to unravel the higher loop structure of this sort of critical behavior. One of them makes use of a semi-analytic ǫ L -expansion for the critical exponents, where some loop integrals are evaluated through numerical integration [4]. Another alternative is the purely analytical treatment of all loop integrals involved, such that new renormalization group as well as ǫ Lexpansion ideas have been developed in order to determine those critical indices [5,6].…”

Section: Introductionmentioning

confidence: 99%

Specific-heat amplitude ratio for anisotropic Lifshitz critical behaviors

Leite

2003

Phys. Rev. B

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We determine the specific heat amplitude ratio near a m-axial Lifshitz point and show its universal character. Using a recent renormalization group picture along with new field-theoretical ǫ L -expansion techniques, we established this amplitude ratio at one-loop order. We estimate the numerical value of this amplitude ratio for m = 1 and d = 3. The result is in very good agreement with its experimental measurement on the magnetic material M nP . It is shown that in the limit m → 0 it trivially reduces to the Ising-like amplitude ratio.

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Critical behavior atm-axial Lifshitz points: Field-theory analysis and ε-expansion results

Cited by 68 publications

References 42 publications

Renormalization-group picture of the Lifshitz critical behavior

Renormalization-group picture of the Lifshitz critical behavior

Scaling in a temperature quench in systems with a Lifshitz point: nonconserved and conserved order parameters

Specific-heat amplitude ratio for anisotropic Lifshitz critical behaviors

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