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Context, Judgement, Deduction

Greta Coraglia, Ivan Di Liberti

TL;DR

This work introduces judgemental theories and their calculi as a general framework to present and study deductive systems, and offers a deep analysis of structural rules, demystifying some of their properties and putting them into context.

Abstract

We introduce judgemental theories and their calculi as a general framework to present and study deductive systems. As an exemplification of their expressivity, we approach dependent type theory and natural deduction as special kinds of judgemental theories. Our analysis sheds light on both the topics, providing a new point of view. In the case of type theory, we provide an abstract definition of type constructor featuring the usual formation, introduction, elimination and computation rules. For natural deduction we offer a deep analysis of structural rules, demystifying some of their properties, and putting them into context. We finish the paper discussing the internal logic of a topos, a predicative topos, an elementary 2-topos et similia, and show how these can be organized in judgemental theories.

Context, Judgement, Deduction

TL;DR

This work introduces judgemental theories and their calculi as a general framework to present and study deductive systems, and offers a deep analysis of structural rules, demystifying some of their properties and putting them into context.

Abstract

We introduce judgemental theories and their calculi as a general framework to present and study deductive systems. As an exemplification of their expressivity, we approach dependent type theory and natural deduction as special kinds of judgemental theories. Our analysis sheds light on both the topics, providing a new point of view. In the case of type theory, we provide an abstract definition of type constructor featuring the usual formation, introduction, elimination and computation rules. For natural deduction we offer a deep analysis of structural rules, demystifying some of their properties, and putting them into context. We finish the paper discussing the internal logic of a topos, a predicative topos, an elementary 2-topos et similia, and show how these can be organized in judgemental theories.
Paper Structure (48 sections, 13 theorems, 46 equations)

This paper contains 48 sections, 13 theorems, 46 equations.

Key Result

Theorem 1.1.2

The following are equivalent for a functor $p \colon \mathcal{E} \to \mathcal{B}$:

Theorems & Definitions (94)

  • Definition 1.0.1: Pre-judgemental theory
  • Example 1.0.3: Toy Martin-Löf type theory
  • Definition 1.0.4: Judgemental theory
  • Remark 1.0.5
  • Remark 1.0.6: Infinitary judgemental theories
  • Remark 1.0.7: Economical presentations of judgemental theories
  • Definition 1.0.12: $\sharp$-lifting
  • Remark 1.0.13
  • Remark 1.0.16
  • Definition 1.1.1
  • ...and 84 more