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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@article{365901, author = {Lindstrom, Ulf and Rocek, Martin and von Unge, Rikard and Hadasz, Leszek}, article_location = {CERN}, article_number = {06}, keywords = {noncommutative solitons; moduli spaces; kahler geometry}, language = {eng}, issn = {1029-8479}, journal = {Journal of High Energy Physics}, title = {Noncommutative multisolitons: moduli spaces, quantization, finite theta effects and stability}, url = {http://jhep.cern.ch/stdsearch?paper=06(2001)040}, volume = {2001}, year = {2001} }
TY - JOUR ID - 365901 AU - Lindstrom, Ulf - Rocek, Martin - von Unge, Rikard - Hadasz, Leszek PY - 2001 TI - Noncommutative multisolitons: moduli spaces, quantization, finite theta effects and stability JF - Journal of High Energy Physics VL - 2001 IS - 06 SP - 040 EP - 040 SN - 10298479 KW - noncommutative solitons KW - moduli spaces KW - kahler geometry UR - http://jhep.cern.ch/stdsearch?paper=06(2001)040 N2 - 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. ER -
LINDSTROM, Ulf, Martin ROCEK, Rikard VON UNGE and Leszek HADASZ. Noncommutative multisolitons: moduli spaces, quantization, finite theta effects and stability. \textit{Journal of High Energy Physics}. CERN, 2001, vol.~2001, No~06, p.~040-61. ISSN~1029-8479.
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