Kuramoto variables as eigenvalues of unitary matrices

arXiv - PHYS - Pattern Formation and Solitons Pub Date : 2024-08-07 DOI:arxiv-2408.04035
Marcel Novaes, Marcus A. M. de Aguiar
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Abstract

We generalize the Kuramoto model by interpreting the $N$ variables on the unit circle as eigenvalues of a $N$-dimensional unitary matrix $U$, in three versions: general unitary, symmetric unitary and special orthogonal. The time evolution is generated by $N^2$ coupled differential equations for the matrix elements of $U$, and synchronization happens when $U$ evolves into a multiple of the identity. The Ott-Antonsen ansatz is related to the Poisson kernels that are so useful in quantum transport, and we prove it in the case of identical natural frequencies. When the coupling constant is a matrix, we find some surprising new dynamical behaviors.
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作为单元矩阵特征值的仓本变量
我们将单位圆上的 N$ 变量解释为 N$ 维单元矩阵 $U$ 的特征值,从而推广了仓本模型,该矩阵有三个版本:一般单元矩阵、对称单元矩阵和特殊正交矩阵。时间演化是由 $U$ 矩阵元素的 $N^2$ 耦合微分方程产生的,当 $U$ 演化为同一性的倍数时,同步就发生了。奥特-安东森解析式与在量子传输中非常有用的泊松核有关,我们在相同自然频率的情况下证明了它。当耦合常数是一个矩阵时,我们发现了一些令人惊讶的新动力学行为。
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arXiv - PHYS - Pattern Formation and Solitons
arXiv - PHYS - Pattern Formation and Solitons
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