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Markov numbers and Lagrangian cell complexes in the complex projective plane

dc.creatorEvans, Jonathan David
dc.creatorSmith, Ivan
dc.date.accessioned2017-06-11
dc.date.accessioned2018-11-24T23:27:20Z
dc.date.available2017-09-01T14:23:53Z
dc.date.available2018-11-24T23:27:20Z
dc.date.issued2018
dc.identifierhttps://www.repository.cam.ac.uk/handle/1810/266995
dc.identifier.urihttp://repository.aust.edu.ng/xmlui/handle/123456789/3965
dc.description.abstractWe study Lagrangian embeddings of a class of two-dimensional cell complexes L_p,q into the complex projective plane. These cell complexes, which we call pinwheels, arise naturally in algebraic geometry as vanishing cycles for quotient singularities of type 1/p² (pq -- 1, 1) (Wahl singularities). We show that if a pinwheel admits a Lagrangian embedding into CP² then p is a Markov number and we completely characterise q. We also show that a collection of Lagrangian pinwheels Lpᵢ;qᵢ , i = 1,...,N, cannot be made disjoint unless N ≤ 3 and the pᵢ form part of a Markov triple. These results are the symplectic analogue of a theorem of Hacking and Prokhorov, which classifies complex surfaces with quotient singularities admitting a Q- Gorenstein smoothing whose general fibre is CP².
dc.languageen
dc.publisherMathematical sciences publishers
dc.publisherGEOMETRY & TOPOLOGY
dc.titleMarkov numbers and Lagrangian cell complexes in the complex projective plane
dc.typeArticle


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