Exact completion category theory , a branch of mathematics , the exact completionconstructs a Barr-exact category from any finitely complete category . It is used to form the effective topos and other realizability toposes .Construction Let C be a category with finite limits. Then the exact completion of C has for its objects pseudo-equivalence relations in C . A pseudo-equivalence relation is like an equivalence relation except that it need not be jointly monic. An object in C ex X 0 and X 1 and two parallel morphisms x 0 and x 1 from X 1 to X 0 such that there exist a reflexivity morphism r from X 0 to X 1 such that x 0 r = x 1 r = 1X 0 s from X 1 to itself such that x 0 s = x 1 and x 1 s = x 0 ; and a transitivity morphism t from X 1 × x 1 , X 0 , x 0 X 1 to X 1 such that x 0 t = x 0 p and x 1 t = x 1 q , where p and q are the two projections of the aforementioned pullback . A morphism from to in C ex equivalence class of morphisms f 0 from X 0 to Y 0 such that there exists a morphism f 1 from X 1 to Y 1 such that y 0 f 1 = f 0 x 0 and y 1 f 1 = f 0 x 1 , with two such morphisms f 0 and g 0 being equivalent if there exists a morphism e from X 0 to Y 1 such that y 0 e = f 0 and y 1 e = g 0 .Examples
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