LINDSTROM, Ulf, Martin ROCEK, Rikard VON UNGE and Leszek HADASZ. Noncommutative multisolitons: moduli spaces, quantization, finite theta effects and stability. Journal of High Energy Physics. CERN, 2001, vol. 2001, No 06, p. 040-61. ISSN 1029-8479.
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Basic information
Original name Noncommutative multisolitons: moduli spaces, quantization, finite theta effects and stability
Authors LINDSTROM, Ulf, Martin ROCEK, Rikard VON UNGE and Leszek HADASZ.
Edition Journal of High Energy Physics, CERN, 2001, 1029-8479.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10301 Atomic, molecular and chemical physics
Country of publisher Czech Republic
Confidentiality degree is not subject to a state or trade secret
WWW URL
Impact factor Impact factor: 8.664
RIV identification code RIV/00216224:14310/01:00004298
Organization unit Faculty of Science
Keywords in English noncommutative solitons; moduli spaces; kahler geometry
Tags kahler geometry, moduli spaces, noncommutative solitons
Changed by Changed by: prof. Rikard von Unge, Ph.D., učo 33259. Changed: 3/7/2001 17:46.
Abstract
We find the N-soliton solution at infinite theta, as well as the metric on the moduli space corresponding to spatial displacements of the solitons. We use a perturbative expansion to incorporate the leading 1/theta corrections, and find an effective short range attraction between solitons. We study the stability of various solutions. We discuss the finite theta corrections to scattering, and find metastable orbits. Upon quantization of the two-soliton moduli space, for any finite theta, we find an s-wave bound state.
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MSM 143100006, plan (intention)Name: Kvantová teorie pole, teorie strun, kvantová teorie gravitace
Investor: Ministry of Education, Youth and Sports of the CR, Quantum Field Theory, String Theory, Quantum Theory of Gravity
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