# Two-Level Type Theory and Applications

**Authors:** Danil Annenkov, Paolo Capriotti, Nicolai Kraus, Christian Sattler

arXiv: 1705.03307 · 2023-06-13

## TL;DR

This paper introduces two-level type theory (2LTT), combining homotopy type theory with a traditional type theory to formalize meta-theoretic results and incorporate additional axioms, enabling advanced categorical and homotopical constructions.

## Contribution

It defines 2LTT, a novel framework combining two type theories, and develops tools for its application in homotopy theory and higher category theory.

## Key findings

- Formalization of semisimplicial types in 2LTT
- Framework for adding axioms to HoTT via 2LTT
- Initial development of Reedy fibrant diagrams and (∞,1)-categories

## Abstract

We define and develop two-level type theory (2LTT), a version of Martin-L\"of type theory which combines two different type theories. We refer to them as the inner and the outer type theory. In our case of interest, the inner theory is homotopy type theory (HoTT) which may include univalent universes and higher inductive types. The outer theory is a traditional form of type theory validating uniqueness of identity proofs (UIP). One point of view on it is as internalised meta-theory of the inner type theory.   There are two motivations for 2LTT. Firstly, there are certain results about HoTT which are of meta-theoretic nature, such as the statement that semisimplicial types up to level $n$ can be constructed in HoTT for any externally fixed natural number $n$. Such results cannot be expressed in HoTT itself, but they can be formalised and proved in 2LTT, where $n$ will be a variable in the outer theory. This point of view is inspired by observations about conservativity of presheaf models.   Secondly, 2LTT is a framework which is suitable for formulating additional axioms that one might want to add to HoTT. This idea is heavily inspired by Voevodsky's Homotopy Type System (HTS), which constitutes one specific instance of a 2LTT. HTS has an axiom ensuring that the type of natural numbers behaves like the external natural numbers, which allows the construction of a universe of semisimplicial types. In 2LTT, this axiom can be stated simply be asking the inner and outer natural numbers to be isomorphic.   After defining 2LTT, we set up a collection of tools with the goal of making 2LTT a convenient language for future developments. As a first such application, we develop the theory of Reedy fibrant diagrams in the style of Shulman. Continuing this line of thought, we suggest a definition of (infinity,1)-category and give some examples.

## Full text

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## References

66 references — full list in the complete paper: https://tomesphere.com/paper/1705.03307/full.md

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Source: https://tomesphere.com/paper/1705.03307