Forskjeller

Her vises forskjeller mellom den valgte versjonen og den nåværende versjonen av dokumentet.

--- seminar:top [2019-06-11]
markussz [Spring 2019 - Upcoming Talks]
+++ seminar:top [2019-07-13]
gereonq [Spring 2019 - Upcoming Talks]
@@ Linje 7: / Linje 7: @@
 ===== Spring 2019 - Upcoming Talks =====
-<infoboks fill|June 17, 13:15 - 14:15, room 734, Sentralbygg 2>
+<infoboks fill|August 5, 13:15 - 14:15, room 734, Sentralbygg 2>
-** Joachim Kock, Universitat Autònoma de Barcelona: //Infinity operads as polynomial monads//**
+**Benjamin Collas (University of Bayreuth): //TBA//**
 ----
-**Abstract:** I'll present a new model for ∞-operads, namely as analytic monads. In the ∞-world (unlike what happens in the classical case), analytic functors are polynomial, and therefore the theory can be developed within the setting of polynomial functors. I'll talk about some of the features of this theory, and explain a nerve theorem, which 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 David Gepner and Rune Haugseng.
+**Abstract:** TBA
 </infoboks>
-<infoboks fill|August 5, 13:15 - 14:15, room 734, Sentralbygg 2>
-**Benjamin Collas (University of Bayreuth): //TBA//**
+<infoboks fill|August 12, 13:15 - 14:15, room 734, Sentralbygg 2>
+**Tomer Schlank (Hebrew University, Jerusalem): //TBA//**
 ----
@@ Linje 66: / Linje 67: @@
 </infoboks>
+<infoboks fill|June 17, 13:15 - 14:15, room 734, Sentralbygg 2>
+** Joachim Kock, Universitat Autònoma de Barcelona: //Infinity operads as polynomial monads//**
+----
+**Abstract:** I'll present a new model for ∞-operads, namely as analytic monads. In the ∞-world (unlike what happens in the classical case), analytic functors are polynomial, and therefore the theory can be developed within the setting of polynomial functors. I'll talk about some of the features of this theory, and explain a nerve theorem, which 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 David Gepner and Rune Haugseng.
+</infoboks>