Anderson self-duality of topological modular forms, its differential-geometric manifestations, and vertex operator algebras
| Autor: | Tachikawa, Yuji, Yamashita, Mayuko |
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| Rok vydání: | 2023 |
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| Druh dokumentu: | Working Paper |
| Popis: | We construct a morphism of spectra from $\mathrm{KO}((q))/\mathrm{TMF}$ to $\Sigma^{-20}I_{\mathbb{Z}} \mathrm{TMF}$, which we show to be an equivalence and to implement the Anderson self-duality of $\mathrm{TMF}$. This morphism is then used to define another morphism from $\mathrm{TMF}$ to $\Sigma^{-20}I_{\mathbb{Z}}(\mathrm{MSpin}/\mathrm{MString})$, which induces a differential geometric pairing and captures not only the invariant of Bunke and Naumann but also a finer invariant which detects subtle Anderson dual pairs of elements of $\pi_\bullet\mathrm{TMF}$. Our analysis leads to conjectures concerning certain self-dual vertex operator superalgebras and some specific torsion classes in $\pi_\bullet\mathrm{TMF}$. This paper is written as an article in mathematics, but much of the discussions in it was originally motivated by a study in heterotic string theory. As such, we have a separate appendix for physicists, in which the contents of the paper are summarized and translated into a language more amenable to them. In physics terms, our result allows us to compute the discrete part of the Green-Schwarz coupling of the $B$-field in a couple of subtle hitherto-unexplored cases. Comment: 93 pages; v2: major revision. one Appendix was kindly provided by Sanath Devalapurkar |
| Databáze: | arXiv |
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