Identity types and weak factorization systems in Cauchy complete categories
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It has been known that categorical interpretations of dependent type theory with Sigma- and Id-types induce weak factorization systems. When one has a weak factorization system (L, R) on a category C in hand, it is then natural to ask whether or not (L, R) harbors an interpretation of dependent type theory with Sigma- and Id- (and possibly Pi-) types. Using the framework of display map categories to phrase this question more precisely, one would ask whether or not there exists a class D of morphisms of C such that the retract closure of D is the class R and the pair (C, D) forms a display map category modeling Sigma- and Id- (and possibly Pi-) types. In this paper, we show, with the hypothesis that C is Cauchy complete, that there exists such a class D if and only if (C,R) itself forms a display map category modeling Sigma- and Id- (and possibly Pi-) types. Thus, we reduce the search space of our original question from a potentially proper class to a singleton.
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