/- Copyright (c) 2015 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn colimit_functor ⊣ Δ ⊣ limit_functor -/ import .colimits ..functor.adjoint open eq functor category is_trunc prod nat_trans namespace category definition limit_functor_adjoint [constructor] (D I : Precategory) [H : has_limits_of_shape D I] : constant_diagram D I ⊣ limit_functor D I := adjoint.mk' begin fapply natural_iso.MK, { intro dF η, induction dF with d F, esimp at *, fapply hom_limit, { exact natural_map η}, { intro i j f, exact !naturality ⬝ !id_right}}, { esimp, intro dF dF' fθ, induction dF with d F, induction dF' with d' F', induction fθ with f θ, esimp at *, apply eq_of_homotopy, intro η, apply eq_hom_limit, intro i, rewrite [assoc, limit_hom_limit_commute, -assoc, assoc (limit_morphism F i), hom_limit_commute]}, { esimp, intro dF f, induction dF with d F, esimp at *, refine !limit_nat_trans ∘n constant_nat_trans I f}, { esimp, intro dF, induction dF with d F, esimp, apply eq_of_homotopy, intro η, apply nat_trans_eq, intro i, esimp, apply hom_limit_commute}, { esimp, intro dF, induction dF with d F, esimp, apply eq_of_homotopy, intro f, symmetry, apply eq_hom_limit, intro i, reflexivity} end /- definition adjoint_colimit_functor [constructor] (D I : Precategory) [H : has_colimits_of_shape D I] : colimit_functor D I ⊣ constant_diagram D I := have H : colimit_functor D I ⊣ (constant_diagram Dᵒᵖ Iᵒᵖ)ᵒᵖ', from _, _ -/ end category