Emergence of a non trivial fluctuating phase in the XY model on regular networks

Abstract

We study an XY-rotor model on regular one dimensional lattices by varying the number of neighbours. The parameter 2γ1 is defined. γ=2 corresponds to mean field and γ=1 to nearest neighbours coupling. We find that for γ<1.5 the system does not exhibit a phase transition, while for γ > 1.5 the mean field second order transition is recovered. For the critical value γ=γc=1.5, the systems can be in a non trivial fluctuating phase for whichthe magnetisation shows important fluctuations in a given temperature range, implying an infinite susceptibility. For all values of γ the magnetisation is computed analytically in the low temperatures range and the magnetised versus non-magnetised state which depends on the value of γ is recovered, confirming the critical value γc=1.5.