多体系统的计算和量子模拟理论

研究方向

我们致力于发展和应用高效数值方法和超冷原子量子模拟,探索多体系统的呈现宏观性质,特别是相变和临界现象。研究内容主要包括:

  • 蒙特卡洛方法
  • 相变和临界现象
  • 量子模拟理论

相关论文

  • Zhang, P., Zhang, L. & Deng, Y. Modified Bethe-Peierls boundary condition for ultracold atoms with spin-orbit coupling. Physical Review A 86, 053608 (2012).
  • Xu, Y. -D., Liu, Q. -Q. & Deng, Y. Monte Carlo study of the universal area distribution of clusters in the honeycomb O( n ) loop model. Chinese Physics B 21, 070211 (2012).
  • Hu, H., ote, H. & Deng, Y. Percolation in the canonical ensemble. Journal of Physics A: Mathematical and Theoretical 45, 494006 (2012).
  • Wu, F., Deng, Y. & ev, N. Phase diagram of the toric code model in a parallel magnetic field. Physical Review B 85, 195104 (2012).
  • Lv, J. -P., Yang, X. & Deng, Y. Scaling of cluster heterogeneity in the two-dimensional Potts model. Physical Review E 86, 022105 (2012).
  • Zhou, Z., Yang, J., Deng, Y. & Ziff, R. Shortest-path fractal dimension for percolation in two and three dimensions. Physical Review E 86, 061101 (2012).
  • Liu, Q., Deng, Y., Garoni, T. & Blote, H. The O(n) loop model on a three-dimensional lattice. Nuclear Physics B 859, 107-128 (2012).