Contents

 Definition

In cohesive type theory

In cohesive type theory, the axiom of real cohesion states that there is a terminal Archimedean ordered field $\mathbb{R}$ such that the shape of $\mathbb{R}$ is a contractible type. Note that if the type theory has quotient sets, as in type theory with coequalizer types and set truncations, then the terminal Archimedean ordered field $\mathbb{R}$ is sequentially Cauchy complete, and if the type theory is impredicative or otherwise contains the Dedekind real numbers, then $\mathbb{R}$ is equivalent to the Dedekind real numbers and thus Dedekind complete.

This is equivalent in strength to axiom $\mathbb{R} \flat$, which says that there is a terminal Archimedean ordered field $\mathbb{R}$ such that every crisp type $T$ is discrete if and only if every function from $\mathbb{R}$ into $\mathrm{Disc}(T)$ is a constant function. $\mathrm{Disc}$ is a modality which takes types in the crisp mode to its corresponding discrete type in the cohesive mode, and a discrete type $A$ in the cohesive mode is one for which the canonical function $\flat(-):A \to \flat A$ is an equivalence of types.

Since in the terminal Archimedean ordered field, $\neg (0 =_{\mathbb{R}} 1)$, the proofs of the equivalence of sufficient cohesion and axiom C2 also applies for real cohesion and axiom $\mathbb{R} \flat$. Thus, by adapting Shulman 2018‘s proof for axiom C2 to axiom $\mathbb{R} \flat$, we have that Axiom $\mathbb{R} \flat$ implies that every function from $\mathbb{R}$ into a discrete type $A$ is a constant function; conversely, if every function from $\mathbb{R}$ to a discrete type $A$ is constant, then it holds for the discrete types which are in the image of the $\mathrm{Disc}$ modality. Finally, by adapting Aberlé 2024’s proof for sufficient cohesion to real cohesion, we have that the axiom of real cohesion holds if and only if every function from $\mathbb{R}$ into a discrete type $A$ is a constant function.

Properties

 Related concepts

• axiom of cohesion

• axiom of punctual cohesion

• axiom of sufficient cohesion

References

• Mike Shulman, Brouwer’s fixed-point theorem in real-cohesive homotopy type theory, Mathematical Structures in Computer Science Vol 28 (6) (2018): 856-941 (arXiv:1509.07584, doi:10.1017/S0960129517000147)

• Mike Shulman, Homotopy type theory: the logic of space, New Spaces in Mathematics: Formal and Conceptual Reflections, ed. Gabriel Catren and Mathieu Anel, Cambridge University Press, 2021 (arXiv:1703.03007, doi:10.1017/9781108854429)

• C.B. Aberlé, Parametricity via Cohesion [arXiv:2404.03825]