Ising's roots and the transfer-matrix eigenvalues

arXiv - PHYS - History and Philosophy of Physics Pub Date : 2024-05-09 DOI:arxiv-2405.05703

Reinhard Folk, Yurij Holovatch

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Abstract

Today, the Ising model is an archetype describing collective ordering processes. And, as such, it is widely known in physics and far beyond. Less known is the fact that the thesis defended by Ernst Ising 100 years ago (in 1924) contained not only the solution of what we call now the `classical 1D Ising model' but also other problems. Some of these problems, as well as the method of their solution, are the subject of this note. In particular, we discuss the combinatorial method Ernst Ising used to calculate the partition function for a chain of elementary magnets. In the thermodynamic limit, this method leads to the result that the partition function is given by the roots of a certain polynomial. We explicitly show that `Ising's roots' that arise within the combinatorial treatment are also recovered by the eigenvalues of the transfer matrix, a concept that was introduced much later. Moreover, we discuss the generalization of the two-state model to a three-state one presented in Ising's thesis, but not included in his famous paper of 1925 ( \i E. Ising, Z. Physik {\bf 31} (1925) 253}). The latter model can be considered as a forerunner of the now abundant models with many-component order parameters.

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伊辛根和转移矩阵特征值

如今，伊辛模型已成为描述集体有序过程的原型。因此，它在物理学及其他领域广为人知。更不为人知的是，恩斯特-伊辛在 100 年前（1924 年）的论文答辩中不仅提出了我们现在所说的 "经典 1Diosing模型 "的解决方案，还提出了其他问题。其中一些问题以及它们的解决方法是本论文的主题。我们将特别讨论恩斯特-伊辛用来计算基本磁体链的分区函数的组合方法。在热力学极限中，这种方法得出的结果是，分区函数是由某个多项式的根给出的。我们明确地表明，在组合处理中出现的 "伊辛根 "也可以通过转移矩阵的特征值来恢复，而转移矩阵是后来才引入的概念。此外，我们还讨论了将两态模型推广到三态模型的问题，这在伊辛的论文中已经提出，但没有包括在他1925年的著名论文中（\i E. Ising, Z.Physik {/bf 31} (1925) 253}）。后一个模型可以看作是现在大量的多分量阶次参数模型的前身。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - PHYS - History and Philosophy of Physics

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