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PRODID:-//Memento EPFL//
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SUMMARY:Infinity-operads as polynomial monads
DTSTART:20190212T101500
DTEND:20190212T111500
DTSTAMP:20260407T063941Z
UID:194612fb1c14185d314cb8ccc76f7236d6ee13eac3dfb8b34338a420
CATEGORIES:Conferences - Seminars
DESCRIPTION:Joachim Kock\nI’ll present a new model for ∞-operads\, nam
 ely as analytic monads. In the ∞-world (unlike what happens in the class
 ical case)\, analytic functors are polynomial\, and therefore the theory c
 an be developed within the setting of polynomial functors. I’ll talk abo
 ut some of the features of this theory\, and explain a nerve theorem\, whi
 ch implies that the ∞-category of analytic monads is equivalent to the 
 ∞-category of dendroidal Segal spaces of Cisinski and Moerdijk\, one of 
 the known equivalent models for ∞-operads.  This is joint work with Dav
 id Gepner and Rune Haugseng.
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STATUS:CONFIRMED
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