二維易辛模型考慮次近鄰交互作用其相變化及淬火動力學

於圖形處理單元(GPU) 環境中使用平行演算法及蒙地卡羅演算法模擬了二維方格易辛模型並考慮次近鄰之交互作用，其中最近鄰(J1) 與次近鄰(J2) 之交互作用皆為反鐵磁性且互為競爭關係，本篇展現了如何計算出臨界指數與交互作用比例(J2/J1) 之關係，及利用Metropolis演算法模擬非平衡淬火至臨界溫度並計算出動力學指數。

關鍵字

古典蒙地卡羅演算法；有限尺度效應；圖形處理單元；二維方格易辛模型考慮次近鄰之交互作用；淬火動力學； Kibble-Zurek機制

並列摘要

We perform the Monte Carlo simulations of the J1 −J2 (frustrated) Ising model on a square lattice with competing coupling J1 > 0 (nearest-neighbor, anti-ferromagnetic) and J2 > 0 (next-nearest neighbor, also anti-ferromagnetic) using the graphic processing unit (GPU). In this thesis, we present the critical exponents evolution as one tunes J2/J1 and the extraction of the dynamical exponent using non-equilibrium quenching with Metropolis algorithm to the critical point.

並列關鍵字

Classical Monte Carlo ； finite-size scaling ； GPU ； J1−J2 Ising model ； quench dynamics ； Kibble-Zurek mechanism

參考文獻

[13] Leo P. Kadanoff. Statistical Physics: Statics, Dynamics and Remormalization. World Scientific Pub Co Inc, Singapore ; River Edge, N.J, July 2000.

[21] David P. Landau and Kurt Binder. A Guide to Monte Carlo Simulations in Statistical Physics. Cambridge University Press, September 2009.

[1] Songbo Jin, Arnab Sen, and Anders W. Sandvik. Ashkin-teller criticality and pseudofirst-order behavior in a frustrated Ising model on the square lattice. Physical Review Letters, 108(4):045702, January 2012.

[2] Songbo Jin, Arnab Sen, Wenan Guo, and Anders Sandvik. Phase transitions in the frustrated Ising model on the square lattice. Physical Review B, 87(14), April 2013.

[3] A. Kalz, A. Honecker, S. Fuchs, and T. Pruschke. Phase diagram of the Ising square lattice with competing interactions. The European Physical Journal B, 65(4):533–

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二維易辛模型考慮次近鄰交互作用其相變化及淬火動力學

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