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Super McShane identity

The authors derive a McShane identity for once-punctured super tori. Relying upon earlier work on super Teichmüller theory by the last two-named authors, they further develop the supergeometry of these surfaces and establish asymptotic growth rate of their length spectra.

10 nodes9 linksoverview previewSuper McShane identity
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Super McShane identity10 visible / 10 total nodes / 12 links
Co-authorshipCo-authorshipCo-authorshipAuthorshipAuthorshipAuthorshipTopic signalTopic signalTopic signalTopic signalTopic signalTopic signalWSuper McShane identitypreprint / 2021AYi HuangResearcherARobert C. PennerResearcherAAnton M. ZeitlinResearcherThep-th13268 worksTmath-ph7974 worksTmath.MP7972 worksTmath.DG4490 worksTmath.GT2393 worksTmath.QA1454 works
PaperSignal 109 links

Super McShane identity

preprint / 2021

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