# Benno van den Berg: Uniform Kan fibrations in simplicial sets

**Time: **
Wed 2019-11-06 10.00 - 12.00

**Location: **
Kräftriket, house 5, room 16

**Participating: **
Benno van den Berg, University of Amsterdam

### Abstract

An important question in homotopy type theory is whether the existence of a model of univalent type theory in simplicial sets (and a model structure) can be proven constructively (say, in CZF with some inaccessibles). One approach would be to take the usual definition of a (trivial) Kan fibration as one's starting point and see how far one gets: this is the approach followed by Henry, Gambino, Szumilo and Sattler in recent work. It turns out that you can get quite far, but some issues remain (especially around the interpretation of Pi-types and coherence). Together with Eric Faber, I am pursuing a different approach in which we add uniformity conditions to the notion of a Kan fibration (as in the cubical sets model). The idea is that classically these conditions can always be satisfied, but not necessarily constructively. This has also been tried by Gambino and Sattler in earlier work, but in our view there are quite a few conditions missing in their definition of a uniform Kan fibration. In this talk, I will try to explain what our definition is, why we believe our definition is better (the idea is that we can prove, constructively, that it is "local"), and how far we are right now.