The algebraic internal groupoid model of Martin-L\"of type theory

Abstract

We extend the model structure on the category Cat(E) of internal categories studied by Everaert, Kieboom and Van der Linden to an algebraic model structure. Moreover, we show that it restricts to the category of internal groupoids. We show that in this case, the algebraic weak factorisation system that consists of the algebraic trivial cofibrations and algebraic fibrations forms a model of Martin-L\"of type theory. Taking E = Set and forgetting the algebraic structure, this recovers Hofmann and Streicher's groupoid model of Martin-L\"of type theory. Finally, we are able to provide axioms on a (2,1)-category which ensure that it gives an algebraic model of Martin-L\"of type theory. To do this, we give necessary and sufficient axioms on a 2-category K such that K Cat(E) in which E is a locally cartesian closed locos with coequalisers, a result which we believe is of independent interest.

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