Complete analyticity for 2D Ising completed

We study the behavior of the two-dimensional nearest neighbor ferromagnetic Ising model under an external magnetic fieldh. We extend to every subcritical value of the temperature a result previously proven by Martirosyan at low enough temperature, and which roughly states that for finite systems with — boundary conditions under a positive external field, the boundary effect dominates in the bulk if the linear size of the system is of orderB/h withB small enough, while ifB is large enough, then the external field dominates in the bulk. As a consequence we are able to complete the proof that “complete analyticity for nice sets” holds for every value of the temperature and external field in the interior of the uniqueness region in the phase diagram of the model.The main tools used are the results and techniques developed to study large deviations for the block magnetization in the absence of the magnetic field, and recently extended to all temperatures below the critical one by Ioffe.

[1]  D. Ioffe Large deviations for the 2D ising model: A lower bound without cluster expansions , 1994 .

[2]  T. Liggett Interacting Particle Systems , 1985 .

[3]  D. Ioffe Exact large deviation bounds up toTc for the Ising model in two dimensions , 1995 .

[4]  Steven Orey,et al.  Large Deviations for the Empirical Field of a Gibbs Measure , 1988 .

[5]  O. Lanford ENTROPY AND EQUILIBRIUM STATES IN CLASSICAL STATISTICAL MECHANICS , 1973 .

[6]  R. Dobrushin,et al.  Completely Analytical Gibbs Fields , 1985 .

[7]  C. Pfister Large deviations and phase separation in the two-dimensional Ising model , 1991 .

[8]  Roberto H. Schonmann Exponential convergence under mixing , 1989 .

[9]  S. Shlosman Uniqueness and half-space nonuniqueness of gibbs states in Czech models , 1986 .

[10]  D. Abraham,et al.  Diagonal interface in the two-dimensional Ising ferromagnet , 1977 .

[11]  F. Martinelli,et al.  For 2-D lattice spin systems weak mixing implies strong mixing , 1994 .

[12]  Stefano Olla,et al.  Large deviations for Gibbs random fields , 1988 .

[13]  Coexistence of infinite (*)-clusters II. Ising percolation in two dimensions , 1993 .

[14]  R. Dobrushin,et al.  Constructive Criterion for the Uniqueness of Gibbs Field , 1985 .

[15]  J. Chayes,et al.  Exponential decay of connectivities in the two-dimensional ising model , 1987 .

[16]  D. Stroock,et al.  The logarithmic sobolev inequality for discrete spin systems on a lattice , 1992 .

[17]  S. Shlosman,et al.  Constrained variational problem with applications to the Ising model , 1996 .

[18]  R. L. Dobrushin,et al.  Wulff Construction: A Global Shape from Local Interaction , 1992 .

[19]  Horng-Tzer Yau,et al.  Spectral gap and logarithmic Sobolev inequality for Kawasaki and Glauber dynamics , 1993 .

[20]  R. Dobrushin,et al.  Completely analytical interactions: Constructive description , 1987 .

[21]  F. Martinelli,et al.  Approach to equilibrium of Glauber dynamics in the one phase region , 1994 .

[22]  R. Schonmann Slow droplet-driven relaxation of stochastic Ising models in the vicinity of the phase coexistence region , 1994 .

[23]  F. Martinelli,et al.  Approach to equilibrium of Glauber dynamics in the one phase region , 1994 .