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Lee, Youngae
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Periodic Maxwell-Chern-Simons vortices with concentrating property

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dc.contributor.author Ao, Weiwei ko
dc.contributor.author Kwon, Ohsang ko
dc.contributor.author Lee, Youngae ko
dc.date.available 2021-08-12T08:32:54Z -
dc.date.created 2021-07-27 ko
dc.date.issued 2021-12 ko
dc.identifier.citation MATHEMATISCHE ANNALEN, v.381, no.3-4, pp.1885 - 1942 ko
dc.identifier.issn 0025-5831 ko
dc.identifier.uri https://scholarworks.unist.ac.kr/handle/201301/53451 -
dc.description.abstract In order to study electrically and magnetically charged vortices in fractional quantum Hall effect and anyonic superconductivity, the Maxwell-Chern-Simons (MCS) model was introduced by Lee et al. (Phys Lett B 252:79-83, 1990) as a unified system of the classical Abelian-Higgs model (AH) and the Chern-Simons (CS) model. In this article, the first goal is to obtain the uniform (CS) limit result of (MCS) model with respect to the Chern-Simons parameter, without any restriction on either a particular class of solutions or the number of vortex points, as the Chern-Simons mass scale tends to infinity. The most important step for this purpose is to derive the relation between the Higgs field and the neutral scalar field. Our (CS) limit result also provides the critical clue to answer the open problems raised by Ricciardi and Tarantello (Comm Pure Appl Math 53:811-851, 2000) and Tarantello (Milan J Math 72:29-80, 2004), and we succeed to establish the existence of periodic Maxwell-Chern-Simons vortices satisfying the concentrating property of the density of superconductive electron pairs. Furthermore, we expect that the (CS) limit analysis in this paper would help to study the stability, multiplicity, and bubbling phenomena for solutions of the (MCS) model. ko
dc.language 영어 ko
dc.publisher SPRINGER HEIDELBERG ko
dc.title Periodic Maxwell-Chern-Simons vortices with concentrating property ko
dc.type ARTICLE ko
dc.identifier.scopusid 2-s2.0-85089259287 ko
dc.identifier.wosid 000557344200001 ko
dc.type.rims ART ko
dc.identifier.doi 10.1007/s00208-020-02057-7 ko
dc.identifier.url https://link.springer.com/article/10.1007%2Fs00208-020-02057-7 ko
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