Variational cohomology and topological solitons in Yang-Mills-Chern-Simons theories
| Autor: | Winterroth, Ekkehart |
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| Rok vydání: | 2021 |
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| Druh dokumentu: | Working Paper |
| Popis: | In cohomological formulations of the calculus of variations obstructions to the existence of (global) solutions of the Euler--Lagrange equations can arise in principle. It seems, however, quite common to assume that such obstructions always vanish, at least in the cases of interest in theoretical physics. This is not so: for Yang--Mills--Chern--Simons theories in odd dimensions $> 5$ we find a non trivial obstruction which leads to a quite strong non existence theorem for topological solitons/instantons. Applied to holographic QCD this reveals then a possible mathematical inconsistency. For solitons in the important Sakai--Sugimoto model this inconsistency takes the form that their $\mathfrak{u}_1$-component cannot decay sufficiently fast to ``extend to infinity'' like the $\mathfrak{su}_n$--component. Comment: 43 pages, rewrite of introductory part regarding variational cohomology, some minor corrections and modifications, two references added |
| Databáze: | arXiv |
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