Yong-Gwan Ji scite author profile

We first investigate spectral properties of the Neumann-Poincaré (NP) operator for the Lamé system of elasto-statics. We show that the elasto-static NP operator can be symmetrized in the same way as that for Laplace operator. We then show that even if elasto-static NP operator is not compact even on smooth domains, its spectrum consists of eigenvalues which accumulates to two numbers determined by Lamé constants. We then derive explicitly eigenvalues and eigenfunctions on disks and ellipses. We then investigate resonance occurring at eigenvalues and anomalous localized resonance at accumulation points of eigenvalues. We show on ellipses that cloaking by anomalous localized resonance takes place at accumulation points of eigenvalues.

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Spectral properties of the Neumann-Poincaré operator and cloaking by anomalous localized resonance for the elasto-static system

Ando¹,

Ji²,

Kang³

et al. 2015

Preprint

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Spectral structure of the Neumann–Poincaré operator on tori

Ando

Kang

et al. 2019

Ann. Inst. H. Poincaré C Anal. Non Linéaire

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This is a survey of accumulated spectral analysis observations spanning more than a century, referring to the double layer potential integral equation, also known as Neumann-Poincaré operator. The very notion of spectral analysis has evolved along this path. Indeed, the quest for solving this specific singular integral equation, originally aimed at elucidating classical potential theory problems, has inspired and shaped the development of theoretical spectral analysis of linear transforms in XX-th century. We briefly touch some marking discoveries into the subject, with ample bibliographical references to both old, sometimes forgotten, texts and new contributions. It is remarkable that applications of the spectral analysis of the Neumann-Poincaré operator are still uncovered nowadays, with spectacular impacts on applied science. A few modern ramifications along these lines are depicted in our survey. Prerequisites of potential theoryWe recall in this section some terminology and basic facts of Newtonian potential theory. Details can be found in [6,56]. We warn the reader that there is no consensus in the vast literature on the subject of signs and constants in the definitions of potentials. We hope this will not be a cause of confusion.

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A concavity condition for existence of a negative value in Neumann-Poincaré spectrum in three dimensions

Kang

2019

Proc. Amer. Math. Soc.

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Neutral inclusions, weakly neutral inclusions, and an over-determined problem for confocal ellipsoids

Ji¹,

Kang²,

Li³

et al. 2020

Preprint

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An inclusion is said to be neutral to uniform fields if upon insertion into a homogenous medium with a uniform field it does not perturb the uniform field at all. It is said to be weakly neutral if it perturbs the uniform field mildly. Such inclusions are of interest in relation to invisibility cloaking and effective medium theory. There have been some attempts lately to construct or to show existence of such inclusions in the form of core-shell structure or a single inclusion with the imperfect bonding parameter attached to its boundary. The purpose of this paper is to review recent progress in such attempts. We also discuss about the over-determined problem for confocal ellipsoids which is closely related with the neutral inclusion, and its equivalent formulation in terms of Newtonian potentials. The main body of this paper consists of reviews on known results, but some new results are also included.

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Yong-Gwan Ji

Spectral properties of the Neumann–Poincaré operator and cloaking by anomalous localized resonance for the elasto-static system

Spectral properties of the Neumann-Poincaré operator and cloaking by anomalous localized resonance for the elasto-static system

Spectral structure of the Neumann–Poincaré operator on tori

A concavity condition for existence of a negative value in Neumann-Poincaré spectrum in three dimensions

Neutral inclusions, weakly neutral inclusions, and an over-determined problem for confocal ellipsoids

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