Describing model categories througth homotopy tiny objects

Abstract

Let C be a V-enriched model category. We say that an object x of C is homotopy tiny if the total right derived functor of C(x, -) : C → V preserves homotopy weighted colimits. Let C0 be a full subcategory of C all of whose objects are homotopy tiny. Our main result says that the homotopy category of the category generated by C0 under weak equivalences and homotopy weighted colimits is equivalent to the homotopy category of the category V C0op of V-enriched presheaves on C0 with values in V. If C is generated by C0, then C is Quillen equivalent to V C0op. Two special cases of our theorem are Schwede-Shipley's theorem on stable model categories and Elmendorf's theorem on equivariant spaces.