Solving quantum rotor model with different Monte Carlo techniques

We systematically test the performance of several Monte Carlo update schemes for the（2+1）d XY phase transition of quantum rotor model.By comparing the local Metropolis（LM）,LM plus over-relaxation（OR）,Wolff-cluster（WC）,hybrid Monte Carlo（HM）,hybrid Monte Carlo with Fourier acceleration（FA） schemes,it is clear that among the five different update schemes,at the quantum critical point,the WC and FA schemes acquire the smallest autocorrelation time and cost the least amount of CPU hours in achieving the same level of relative error,and FA enjoys a further advantage of easily implementable for more complicated interactions such as the long-range ones.These results bestow one with the necessary knowledge of extending the quantum rotor model,which plays the role of ferromagnetic/antiferromagnetic critical bosons or Z2 topological order,to more realistic and yet challenging models such as Fermi surface Yukawa-coupled to quantum rotor models.