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Topological Recursion and TQFTs

dc.date.accessioned2019-10-24T15:14:34Z
dc.date.available2019-10-24T15:14:34Z
dc.date.issued2016
dc.identifier.urihttp://publications.mfo.de/handle/mfo/3514
dc.description.abstractThe topological recursion is an ubiquitous structure in enumerative geometry of surfaces and topological quantum field theories. Since its invention in the context of matrix models, it has been found or conjectured to compute intersection numbers in the moduli space of curves, topological string amplitudes, asymptotics of knot invariants, and more generally semiclassical expansion in topological quantum field theories. This workshop brought together mathematicians and theoretical physicists with various background to understand better the underlying geometry, learn about recent advances (notably on quantisation of spectral curves, topological strings and quantum gauge theories, and geometry of moduli spaces) and discuss the hot topics in the area.
dc.titleTopological Recursion and TQFTs
dc.identifier.doi10.14760/OWR-2016-9
local.series.idOWR-2016-9
local.subject.msc14
local.subject.msc37
local.subject.msc51
local.subject.msc53
local.subject.msc4N
local.subject.msc81
local.sortindex954
local.date-range14 Feb - 20 Feb 2016
local.workshopcode1607a
local.workshoptitleTopological Recursion and TQFTs
local.organizersGaetan Borot, Bonn; Leonid Chekhov, Moscow; Bertrand Eynard, Gif-sur-Yvette; Katrin Wendland, Freiburg
local.report-nameWorkshop Report 2016,9
local.opc-photo-id1607a
local.publishers-doi10.4171/OWR/2016/9
local.ems-referenceBorot Gaëtan, Chekhov Leonid, Eynard Bertrand, Wendland Katrin: Topological Recursion and TQFTs. Oberwolfach Rep. 13 (2016), 387-448. doi: 10.4171/OWR/2016/9


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