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Петербургский топологический семинар им. В. А. Рохлина
29 мая 2017 г. 17:15–19:00, г. Санкт-Петербург, ПОМИ, комн. 311 (наб. р. Фонтанки, 27)
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Knot exterior with all possible meridional essential surfaces
Ж. М. Ногейра University of Coimbra
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Аннотация:
Since the work of Haken and Waldhausen, it is common to study
3-manifolds, and knot exteriors in particular, by their
decomposition into submanifolds. A very important class
of surfaces used in these decompositions are the essential
surfaces. A particularly interesting occurrence is
the existence of knots with the property that their exteriors
have closed essential surfaces of arbitrarily high genus,
which were originally given on a classic paper by Lyon.
In this talk we will show the first examples of a stronger
phenomenon: We show the existence of infinitely many knots
where each exterior contains meridional essential surfaces
of independently unbounded genus and number of boundary
components. In particular, we construct examples of knot
exteriors where each of which has all possible compact
orientable surfaces embedded as meridional essential surfaces.
Язык доклада: английский
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