反铁磁性
六边形晶格
蒙特卡罗方法
而量子蒙特卡罗
凝聚态物理
量子自旋液体
格子(音乐)
量子
物理
变分蒙特卡罗
统计物理学
量子力学
数学
自旋极化
声学
统计
电子
作者
Wen-Jun Hu,Shou-Shu Gong,D. N. Sheng
出处
期刊:Physical review
[American Physical Society]
日期:2016-08-15
卷期号:94 (7)
被引量:61
标识
DOI:10.1103/physrevb.94.075131
摘要
By using Gutzwiller projected fermionic wave functions and variational Monte Carlo technique, we study the spin-1/2 Heisenberg model with the first-neighbor (J1), second-neighbor (J2), and additional scalar chiral interaction J??Si???(Sj??Sk) on the triangular lattice. In the nonmagnetic phase of the J1???J2 triangular model with 0.08???J2/J1???0.16, recent density-matrix renormalization group (DMRG) studies [Zhu and White, Phys. Rev. B 92, 041105(R) (2015) and Hu, Gong, Zhu, and Sheng, Phys. Rev. B 92, 140403(R) (2015)] find a possible gapped spin liquid with the signal of a competition between a chiral and a Z2 spin liquid. Motivated by the DMRG results, we consider the chiral interaction J??Si???(Sj??Sk) as a perturbation for this nonmagnetic phase. We find that with growing J??, the gapless U(1) Dirac spin liquid, which has the best variational energy for J??=0, exhibits the energy instability towards a gapped spin liquid with nontrivial magnetic fluxes and nonzero chiral order. We calculate topological Chern number and ground-state degeneracy, both of which identify this flux state as the chiral spin liquid with fractionalized Chern number C=1/2 and twofold topological degeneracy. Our results indicate a positive direction to stabilize a chiral spin liquid near the nonmagnetic phase of the J1???J2triangular model.
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