C-system of a module over a Jf-relative monad

Abstract

Let F be the category with the set of objects N and morphisms being the functions between the standard finite sets of the corresponding cardinalities. Let Jf:F→ Sets be the obvious functor from this category to the category of sets. In this paper we construct, for any relative monad RR on Jf and a left module LM over RR, a C-system C( RR, LM) and explicitly compute the action of the B-system operations on its B-sets. In the following paper it is used to provide a rigorous mathematical approach to the construction of the C-systems underlying the term models of a wide class of dependent type theories. This paper is a result of evolution of arXiv:1407.3394. However this paper is much more detailed and contains a lot of material that is not contained in arXiv:1407.3394. It also does not cover some material that is covered in arXiv:1407.3394.