K. Hess\, M. Kedziorek\, E. Riehl\, and B. Shipley have dev eloped methods to induce model structures from an adjunction which they ap ply to prove the existence of injective and projective model structures on categories of diagrams in accessible model categories. In this talk\, I w ill explain how to adapt their proof to an enriched setting\, in order to prove the existence of injective and projective model structures on some e nriched diagram categories. I will talk in particular about the case of en riched diagrams from a small simplicial category to the category of pointe d simplicial sets\, and then generalize it by replacing the category of po inted simplicial sets by other symmetric monoidal categories\, which are l ocally presentable bases and accessible model categories.

LOCATION:CM 0 12 https://plan.epfl.ch/?room=CM012 STATUS:CONFIRMED END:VEVENT END:VCALENDAR