Model ∞-categories III: the fundamental theorem
Abstract
We prove that a model structure on a relative ∞-category (M,W) gives an efficient and computable way of accessing the hom-spaces homM[[W-1]](x,y) in the localization. More precisely, we show that when the source x ∈ M is *cofibrant* and the target y ∈ M is *fibrant*, then this hom-space is a "quotient" of the hom-space homM(x,y) by either of a *left homotopy relation* or a *right homotopy relation*.
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