Phase Transitions in a Rigorously Solvable Model

Abstract: Phase transitions in dependence on temperature, T, and applied magnetic field are determined in a one-dimensional spinX-Y-model with partial account of next-nearest neighbour interaction (characterized by the parameter a) a t final N and N + 00, where N is the spin number. The analytic behaviour of the fundamental thermodynamic characteristics of the system is investigated a t high and low temperatures in different regions of the (a, H ) plane.The same calculations are made a t N + 00 for the X-Y-Model, contai… Show more

“…The symbol "=" stands for the similarity between this correlation and the corresponding one for the model in [5], the symbol "-" means difference. Let US study the critical behaviour of (some of) the thermodynamic quantities in case 1, see (23) and ( 2 2 ) .…”

“…1 and 2. We give in Table 1 [5]; the symbol f J, means that the unequality direction is changed (usually a t H = H i , ). From the numerical data we mark the following correlations:…”

“…A series of analytical and numerical results for the thermodynamic properties of the rigorously solvable (quadratic in Fermi creation and annihilation operators) part of the 1D X-Y model with an infinite radius of interaction in longitudinal magnetic field has been recently obtained [ 5 ] . The critical exponents for a T = 0 phase transition in this model can be expressed by one parameter only and the scaling laws are obeyed.…”

“…From (17) we get is an increasing function, lim &k = H a t H ---f co). However, in many cases ~( k ) proves to be a non-monotonic function but always It is of interest to mention that where is the dispersion function of the rigorously solvable part of the 1D X -Y model with an infinite radius of interaction in a longitudinal magnetic field [5].…”

“…Here and above the indices "1" or "2" are related to the corresponding law of interaction (22), ''ppt" nieans phase transition point. Since H:, and H & for the model (13) coincide with the critical values of H for the interactions like ( 2 2 ) for the model in [ 5 ] , we can compare formally the relevant quantities a t equal values of p and H (columns 4 to 8). Qualitatively the results of this comparison are shown in column 9.…”

One‐dimensional ising model with an infinite radius of interaction in a transverse magnetic field. Some thermodynamic properties of the rigorously solvable part

“…The symbol "=" stands for the similarity between this correlation and the corresponding one for the model in [5], the symbol "-" means difference. Let US study the critical behaviour of (some of) the thermodynamic quantities in case 1, see (23) and ( 2 2 ) .…”

“…1 and 2. We give in Table 1 [5]; the symbol f J, means that the unequality direction is changed (usually a t H = H i , ). From the numerical data we mark the following correlations:…”

“…A series of analytical and numerical results for the thermodynamic properties of the rigorously solvable (quadratic in Fermi creation and annihilation operators) part of the 1D X-Y model with an infinite radius of interaction in longitudinal magnetic field has been recently obtained [ 5 ] . The critical exponents for a T = 0 phase transition in this model can be expressed by one parameter only and the scaling laws are obeyed.…”

“…From (17) we get is an increasing function, lim &k = H a t H ---f co). However, in many cases ~( k ) proves to be a non-monotonic function but always It is of interest to mention that where is the dispersion function of the rigorously solvable part of the 1D X -Y model with an infinite radius of interaction in a longitudinal magnetic field [5].…”

“…Here and above the indices "1" or "2" are related to the corresponding law of interaction (22), ''ppt" nieans phase transition point. Since H:, and H & for the model (13) coincide with the critical values of H for the interactions like ( 2 2 ) for the model in [ 5 ] , we can compare formally the relevant quantities a t equal values of p and H (columns 4 to 8). Qualitatively the results of this comparison are shown in column 9.…”

One‐dimensional ising model with an infinite radius of interaction in a transverse magnetic field. Some thermodynamic properties of the rigorously solvable part

Numerical computations on a rigorously solvable model

Transverse correlations in the inhomogeneous one-dimensional XY-model at infinite temperature