We discuss the analytic properties of the Callan-Symanzik beta -function beta (g) associated with the zero-momentum four-point coupling g in the two-dimensional phi (4) model with O(N) symmetry. Using renormalization-group arguments, we derive the asymptotic behaviour of beta (g) at the fixed point g*. We argue that beta'(g) = beta'(g*)+ O(g - g*(1/7)) for N = 1 and beta'(g) = beta'(g*) + O(1/logg - g*) for N greater than or equal to 3. Our claim is supported by an explicit calculation in the Ising lattice model and by a 1/N calculation for the two-dimensional phi (4) theory. We discuss how these non-analytic corrections may give rise to a slow convergence of the perturbative expansion in powers of g.
Non-analyticity of the Callan-Symanzik beta-function of two-dimensional O(N) models / P., Calabrese; M., Caselle; A., Celi; Pelissetto, Andrea; E., Vicari. - In: JOURNAL OF PHYSICS. A, MATHEMATICAL AND GENERAL. - ISSN 0305-4470. - STAMPA. - 33:(2000), pp. 8155-8170. [10.1088/0305-4470/33/46/301]
Non-analyticity of the Callan-Symanzik beta-function of two-dimensional O(N) models
PELISSETTO, Andrea;
2000
Abstract
We discuss the analytic properties of the Callan-Symanzik beta -function beta (g) associated with the zero-momentum four-point coupling g in the two-dimensional phi (4) model with O(N) symmetry. Using renormalization-group arguments, we derive the asymptotic behaviour of beta (g) at the fixed point g*. We argue that beta'(g) = beta'(g*)+ O(g - g*(1/7)) for N = 1 and beta'(g) = beta'(g*) + O(1/logg - g*) for N greater than or equal to 3. Our claim is supported by an explicit calculation in the Ising lattice model and by a 1/N calculation for the two-dimensional phi (4) theory. We discuss how these non-analytic corrections may give rise to a slow convergence of the perturbative expansion in powers of g.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
