Schr\"{o}dinger Fields on the Plane with $[U(1)]^N$ Chern-Simons
  Interactions and Generalized Self-dual Solitons

A. L. Fetter; A. Leznov; A. Leznov; B. Blok; B. Konstant; Bum-Hoon Lee; C. Kim; C. R. Hagen; C. R. Hagen; C. Ting; C.-L. Ho; Chanju Kim; Choonkyu Lee; D. Arovas; D. Boyanovsky; E. B. Bogomol'nyi; E. J. Weinberg; E. J. Weinberg; F. Wilczek; F. Wilczek; F. Wilczek; G. Dunne; G. Dunne; G. Goldin; G. W. Gibbons; Hyunsoo Min; J. Fröhlich; J. Hong; J. M. Leinaas; J. Schonfeld; J. Spruck; K. Kiskis; L. S. Brown; M. Ansourian; M. Hindmarsh; M. Toda; M. Toda; M. Y. Choi; N. Read; Pyungwon Ko; R. Jackiw; R. Jackiw; R. Jackiw; R. Jackiw; R. Jackiw; R. Wang; S. C. Zhang; S. Deser; S. K. Kim; S. K. Kim; S. K. Kim; S. L. Sondhi; S. M. Girvin; S. M. Girvin; T. Vachaspati; X. G. Wen; X. G. Wen; X. G. Wen; Y. Aharonov; Y. Aharonov; Z. F. Ezawa; Z. F. Ezawa

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Schr\"{o}dinger Fields on the Plane with $[U(1)]^N$ Chern-Simons Interactions and Generalized Self-dual Solitons

Abstract

A general non-relativistic field theory on the plane with couplings to an arbitrary number of abelian Chern-Simons gauge fields is considered. Elementary excitations of the system are shown to exhibit fractional and mutual statistics. We identify the self-dual systems for which certain classical and quantal aspects of the theory can be studied in a much simplified mathematical setting. Then, specializing to the general self-dual system with two Chern-Simons gauge fields (and non-vanishing mutual statistics parameter), we present a systematic analysis for the static vortexlike classical solutions, with or without uniform background magnetic field. Relativistic generalizations are also discussed briefly.Comment: 49 pages including 4 figures, LATEX ( three LATEX figures and one PICTEX figure), SNUTP 93-14, UMN-TH-113

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Last time updated on 03/01/2020