Magnetic properties of the frustrated Ising chain

Pub Date : 2024-02-22 DOI:10.1063/10.0024328
D. V. Laptiev, O. O. Kryvchikov, Yu. V. Savin, V. V. Slavin
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Abstract

Using the Kramers–Wannier transfer matrix method, we studied several decorated Ising chains. The exact expressions for thermodynamic characteristics, including the ground state characteristics, were obtained. We considered several modeling chains with different signs and absolute values of exchange constants for the nearest- and the next-nearest neighbors. For these models, we calculated the magnetization curves. The critical values of magnetic fields and corresponding magnetization plateau parameters were obtained. Analytic expressions for the ground state entropy were obtained for the chains with different interaction constants. The dependencies of the number of states with minimum energy (the degeneration of the ground state) as the function of the number of particles were found. It was shown that these dependencies are expressed in terms of well-known numerical sequences, namely Lucas numbers and Pell numbers, which, in the limit of a large number of particles, are proportional to the powers of the golden and silver sections. Therefore, the ground state entropy (per particle) of the systems under consideration can be described in terms of these sections and, therefore, is nonzero.
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受挫伊辛链的磁特性
我们利用克拉默-万尼尔转移矩阵法研究了几种装饰伊辛链。我们得到了包括基态特性在内的热力学特性的精确表达式。我们考虑了几种具有不同符号和绝对值的最近邻和次近邻交换常数的模型链。对于这些模型,我们计算了磁化曲线。我们得到了磁场临界值和相应的磁化高原参数。对于具有不同相互作用常数的链,我们得到了基态熵的解析表达式。发现了具有最小能量的状态数(基态退化)与粒子数的函数关系。结果表明,这些依赖关系用著名的数字序列(即卢卡斯数和佩尔数)来表示,在粒子数量较多的情况下,它们与黄金分割和白银分割的幂成正比。因此,我们所研究的系统的基态熵(每个粒子)可以用这些截面来描述,因此不为零。
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