Effects of power-law correlated disorder on a 3D XY model

Sammanfattning: This thesis investigates the effects of power-law correlated disorder on a three-dimensional XY model and the Weinrib-Halperin disorder relevance criterion’s pre-dictive ability. Ising models are used as a map to realise disorder couplings. Simula-tions are conducted using hybrid Monte Carlo method constituting Metropolis’ andWolff’s algorithms. Two cases using two-dimensional and three-dimensional Isinggenerated disorder corresponding to (d + 1)- and d-dimensional models are tested.In addition, a superficial scaling analysis is performed to highlight the change ofuniversality class.It is shown that magnetisation, response functions and Binder ratio along withits temperature derivative display stark differences from the pure XY model case.The results agree with the Weinrib-Halperin criterion in terms of predicting achange of universality class but show a discrepancy in both qualitative and nu-merical results. The main new result is that power-law correlated disorder canintroduce two phase transitions at different critical couplings. This is in disagree-ment with prior established theory and predicts new physics to be investigated insuperconductors and superfluids with correlated disorder.