Geometric Formula for 2d Ising Zeros: Examples & Numerics

Iñaki Garay, Etera R. Livine
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Abstract

A geometric formula for the zeros of the partition function of the inhomogeneous 2d Ising model was recently proposed in terms of the angles of 2d triangulations embedded in the flat 3d space. Here we proceed to an analytical check of this formula on the cubic graph, dual to a double pyramid, and provide a thorough numerical check by generating random 2d planar triangulations. Our method is to generate Delaunay triangulations of the 2-sphere then performing random local rescalings. For every 2d triangulations, we compute the corresponding Ising couplings from the triangle angles and the dihedral angles, and check directly that the Ising partition function vanishes for these couplings (and grows in modulus in their neighborhood). In particular, we lift an ambiguity of the original formula on the sign of the dihedral angles and establish a convention in terms of convexity/concavity. Finally, we extend our numerical analysis to 2d toroidal triangulations and show that the geometric formula does not work and will need to be generalized, as originally expected, in order to accommodate for non-trivial topologies.
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2d Ising 零点几何公式:示例与数值
最近,有人根据嵌入平面三维空间的二维三角形的角度,提出了同质二维伊辛模型分区函数零点的几何公式。在此,我们着手在立方图(双金字塔的对偶图)上对该公式进行分析检验,并通过随机生成 2d 平面三角剖分进行全面的数值检验。我们的方法是生成 2 球面的 Delaunay 三角剖分,然后进行随机局部重缩放。对于每个 2d 三角形,我们根据三角形角度和二面角计算相应的伊辛耦合,并直接检验这些耦合的伊辛分割函数是否消失(并且在其邻域内模量增长)。特别是,我们消除了原始公式中关于二面角符号的歧义,并建立了凸性/凹性的约定。最后,我们将数值分析扩展到二维环状三角形,并证明几何公式并不适用,需要按照最初的预期加以推广,以适应非三维拓扑结构。
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