Conditions de Kan sur les nerfs des ω-cat\'egories

Abstract

We show that the Street nerve of a strict ω-category C is a Kan complex (respectively a quasi-category) if and only if the n-cells of C for n≥ 1 (respectively n> 1) are weakly invertible. Moreover, we equip N(C) with a structure of saturated complicial set where the n-simplices correspond to morphisms from the nth oriental to C sending the unique non-trivial n-cell of the domain to a weakly invertible cell of C.