Linked-Cluster Expansion of the Ising Model

High order perturbation study of the frustrated quantum Ising chain

In this paper, using high order perturbative series expansion method, the critical exponents of the order parameter and susceptibility in transition from ferromagnetic to disordered phases for 1D quantum Ising model in transverse field, with ferromagnetic nearest neighbor and anti-ferromagnetic next to nearest neighbor interactions, are calculated. It is found that for small value of the frustr...

A cluster expansion approach to renormalization group transformations

The renormalization group (RG) approach is largely responsible for the considerable success which has been achieved in developing a quantitative theory of phase transitions. This work treats the rigorous definition of the RG map for classical Ising-type lattice systems. A cluster expansion is used to justify this definition in the infinite volume limit at high temperature.

Improved Peierls Argument for High-Dimensional Ising Models

We consider the low temperature expansion for the Ising model on Z d , d ≥ 2, with ferromagnetic nearest neighbor interactions in terms of Peierls contours. We prove that the expansion converges for all temperatures smaller than Cd(log d) −1 , which is the correct order in d.

ar X iv : h ep - l at / 9 40 30 09 v 1 9 M ar 1 99 4 Correlation Function in Ising Models

We simulated the fourier transform of the correlation function of the Ising model in two and three dimensions using a single cluster algorithm with improved estimators. The simulations are in agreement with series expansion and the available exact results in d = 2, which shows, that the cluster algorithm can succesfully be applied for correlations. We show as a further result that our data do n...

Adaptive cluster expansion for the inverse Ising problem: convergence, algorithm and tests