Phenomenological renormalization group methods

Abstract: Some renormalization group approaches have been proposed during the last few years which are close in spirit to the Nightingale phenomenological procedure. In essence, by exploiting the nite size scaling hypothesis, the approximate critical behavior of model on in nite lattice is obtained through the exact computation of some thermal quantities of the model on nite clusters. In this work some of these methods are reviewed, namely the mean eld renormalization group, the e ective eld renormalization group and th… Show more

“…In this paper, we apply the mean field RG (MFRG) method [16,17] to treat the critical properties of the anisotropic XY model on a semi-infinite lattice. The MFRG approach is based on the comparison of two clusters of different sizes, each of them simulating the infinite system.…”

“…(6), (8) and (10) for the one-spin cluster with Eqs. (7), (9) and (11) for the two-spin cluster with the MFRG ideas [16,17] we obtain the following set of equations:…”

The Semi-Infinite Quantum Spin-1/2 XY Model

“…In this paper, we apply the mean field RG (MFRG) method [16,17] to treat the critical properties of the anisotropic XY model on a semi-infinite lattice. The MFRG approach is based on the comparison of two clusters of different sizes, each of them simulating the infinite system.…”

“…(6), (8) and (10) for the one-spin cluster with Eqs. (7), (9) and (11) for the two-spin cluster with the MFRG ideas [16,17] we obtain the following set of equations:…”

The Semi-Infinite Quantum Spin-1/2 XY Model

“…This method was proposed some time ago [11] and has been successfully applied to classical systems (both static and dynamic properties have been studied), like Ising, Potts, or BlumeCapel models [12]. The second is just the generalization of the usual bond-moving Migdal-Kadanoff [13] approximation to antiferromagnetic quantum systems.…”

Real-space renormalization group study of the anisotropic antiferromagnetic Heisenberg model on a square lattice

“…The Fe 1−q Al q system in the bcc structure shows an interesting magnetic behavior since its critical temperature decreases with q = 1 − c but shows a kind of plateau for low Al concentrations. Theoretical studies [5,6], using mean field renormalization group [7] and Bogoliubov inequality [8] approaches have been used to explain this behavior by taking a simple Ising Hamiltonian. Sato and Arrot [9] obtained the magnetization by assuming a ferromagnetic exchange between nearest-neighbor Fe atoms and an antiferromagnetic superexchange between two Fe atoms separated by an Al atom.…”

The magnetic properties of disordered Fe–Al alloy system