θ-dependence in the small-N limit of 2d CPN-1 models

Abstract

We present a systematic numerical study of θ-dependence around θ=0 in the small-N limit of 2d CPN-1 models, aimed at clarifying the possible presence of a divergent topological susceptibility in the continuum limit. We follow a twofold strategy, based on one side on direct simulations for N = 2 and N = 3 on lattices with correlation lengths up to O(102), and on the other side on the small-N extrapolation of results obtained for N up to 9. Based on that, we provide conclusive evidence for a finite topological susceptibility at N = 3, with a continuum estimate 2 = 0.110(5). On the other hand, results obtained for N = 2 are still inconclusive: they are consistent with a logarithmically divergent continuum extrapolation, but do not yet exclude a finite continuum value, 2 0.4, with the divergence taking place for N slightly below 2 in this case. Finally, results obtained for the non-quadratic part of θ-dependence, in particular for the so-called b2 coefficient, are consistent with a θ-dependence matching that of the Dilute Instanton Gas Approximation at the point where 2 diverges.