A Thouless-Like Effect in the Dyson Hierarchical Model with Continuous Symmetry

Abstract

We study Dyson's classical r-component ferromagnetic hierarchical model with a long range interaction potential U(i,j)= -l(d(i,j)) d-2(i,j), where d(i,j) denotes the hierarchical distance. We prove a conjecture of Dyson, which states that the convergence of the series l1+l2+..., where ln=l(2n), is a necessary and sufficient condition of the existence of phase transition in the model under consideration, and the spontaneous magnetization vanishes at the critical point, i.e. there is no Thouless' effect. We find however that the distribution of the normalized average spin at the critical temperature Tc tends to the uniform distribution on the unit sphere in Rr as the volume tends to infinity, a phenomenon which resembles the Thouless effect.

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