非互易系统的广义布里渊区

Habib Ammari, Silvio Barandun, Ping Liu, Alexander Uhlmann
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摘要

最近,人们发现,具有实次周期性的弗洛克-布洛赫变换无法捕捉非互易系统的光谱特性。本文旨在引入广义布里渊区(generalisedBrillouin zone)的概念,允许准周期性为复数,以纠正这一问题。本文证明,布里渊区向复数平面的这种移动解释了特征模的单向空间衰减,并导致正确的频谱收敛特性。本文的结果明确并严格证明了有限结构的频谱特性如何与相应的半无限或无限周期晶格的频谱特性相关联,并给出了如何将赫米蒂理论扩展到非互易环境的明确特征。基于我们的理论,我们描述了开放边界条件和周期边界条件下的广义布里渊区。我们的结果与物理文献一致,并对 $k$-Toeplitz 矩阵的情况给出了明确的概括。
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Generalised Brillouin Zone for Non-Reciprocal Systems
Recently, it has been observed that the Floquet-Bloch transform with real quasiperiodicities fails to capture the spectral properties of non-reciprocal systems. The aim of this paper is to introduce the notion of a generalised Brillouin zone by allowing the quasiperiodicities to be complex in order to rectify this. It is proved that this shift of the Brillouin zone into the complex plane accounts for the unidirectional spatial decay of the eigenmodes and leads to correct spectral convergence properties. The results in this paper clarify and prove rigorously how the spectral properties of a finite structure are associated with those of the corresponding semi-infinitely or infinitely periodic lattices and give explicit characterisations of how to extend the Hermitian theory to non-reciprocal settings. Based on our theory, we characterise the generalised Brillouin zone for both open boundary conditions and periodic boundary conditions. Our results are consistent with the physical literature and give explicit generalisations to the $k$-Toeplitz matrix cases.
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