大 N$ 时 SU(N)$ 铁磁性中的三临界点和新出现的温度尺度

Alexios P. Polychronakos, Konstantinos Sfetsos
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引用次数: 0

摘要

研究了作者最近提出的非阿贝尔铁磁体,该铁磁体由$SU(N)$基本表示中的原子组成,研究的极限是$N$变得很大,其尺度为原子数$n$的平方根。该模型显示了额外的相,以及两个不同的温度标度,它们的相关系数为 $N(//)\ln N$。顺磁相分为 "致密 "相和 "稀释 "相,两者之间存在三阶转变,并导致尺度参数$n/N^2$和温度的三重临界点,而铁磁相则表现出额外的结构,在更大的温度尺度上出现了一个新的顺磁-铁磁蜕变相。这些相可以共存,随着温度的变化而变得稳定或畸变。我们还研究了一个广义模型,在该模型中,$SU(N)$等效态的数量以非对称的权重进入分区函数,例如,当系统中存在量规不变性时,该模型也表现出类似的相位,在完全量规不变的情况下,致密-稀释相位转变成为二阶相位。
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Triple critical point and emerging temperature scales in $SU(N)$ ferromagnetism at large $N$
The non-Abelian ferromagnet recently introduced by the authors, consisting of atoms in the fundamental representation of $SU(N)$, is studied in the limit where $N$ becomes large and scales as the square root of the number of atoms $n$. This model exhibits additional phases, as well as two different temperature scales related by a factor $N\!/\!\ln N$. The paramagnetic phase splits into a "dense" and a "dilute" phase, separated by a third-order transition and leading to a triple critical point in the scale parameter $n/N^2$ and the temperature, while the ferromagnetic phase exhibits additional structure, and a new paramagnetic-ferromagnetic metastable phase appears at the larger temperature scale. These phases can coexist, becoming stable or metastable as temperature varies. A generalized model in which the number of $SU(N)$-equivalent states enters the partition function with a nontrivial weight, relevant, e.g., when there is gauge invariance in the system, is also studied and shown to manifest similar phases, with the dense-dilute phase transition becoming second-order in the fully gauge invariant case.
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