2001
DOI: 10.1103/physrevlett.86.787
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Experimental Observation of the Topological Structure of Exceptional Points

Abstract: We report on a microwave cavity experiment where exceptional points (EPs), which are square root singularities of the eigenvalues as function of a complex interaction parameter, are encircled in the laboratory. The real and imaginary parts of an eigenvalue are given by the frequency and width of a resonance and the eigenvectors by the field distributions. Repulsion of eigenvalues--always associated with EPs--implies frequency anticrossing (crossing) whenever width crossing (anticrossing) is present. The eigenv… Show more

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Cited by 693 publications
(714 citation statements)
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“…Marginally, let us point out the possible methodical relevance of the present regularization of the level crossing at ε 0 = 0 for an improvement of our future understanding of some models in non-quantum domains of physics where the very similar "exceptional-point" singularities have been observed inside the intervals of variability of relevant parameters [18,23].…”
Section: Discussionmentioning
confidence: 99%
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“…Marginally, let us point out the possible methodical relevance of the present regularization of the level crossing at ε 0 = 0 for an improvement of our future understanding of some models in non-quantum domains of physics where the very similar "exceptional-point" singularities have been observed inside the intervals of variability of relevant parameters [18,23].…”
Section: Discussionmentioning
confidence: 99%
“…Such a feature is characteristic for the non-diagonalizable (usually called Jordan-block) limits of non-Hermitian operators [17]. In the spectra of differential operators these points are also known as "Bender-Wu singularities" [24], as the points of an "unavoided level-crossing" [8] or simply as "exceptional points" [18]. In our present paper, their properties will only be derived via a limiting transition ε 0 → 0 + from the regular domain.…”
Section: A 2 Larger Hilbert Spaces Rmentioning
confidence: 99%
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“…In a system with many coupled modes, the emergence of multiple EPs and their interactions can occur under system parameter variation [25][26][27]. Their interactions and the associated topological properties have been studied in both microwave cavities [25,26] and acoustics systems [27]. For systems with continuous spectra, various PT -symmetric photonic crystals (PCs) have been considered by studying their complex band structures.…”
Section: Introductionmentioning
confidence: 99%
“…For example, a system with asymmetric loss is equivalent to a PT -symmetric system with a background of uniform loss, and so no gain is required to achieve an EP [3,[21][22][23][24]. In a system with many coupled modes, the emergence of multiple EPs and their interactions can occur under system parameter variation [25][26][27]. Their interactions and the associated topological properties have been studied in both microwave cavities [25,26] and acoustics systems [27].…”
Section: Introductionmentioning
confidence: 99%