circle type



Type theory

natural deduction metalanguage, practical foundations

  1. type formation rule
  2. term introduction rule
  3. term elimination rule
  4. computation rule

type theory (dependent, intensional, observational type theory, homotopy type theory)

syntax object language

computational trinitarianism =
propositions as types +programs as proofs +relation type theory/category theory

logiccategory theorytype theory
trueterminal object/(-2)-truncated objecth-level 0-type/unit type
falseinitial objectempty type
proposition(-1)-truncated objecth-proposition, mere proposition
proofgeneralized elementprogram
cut rulecomposition of classifying morphisms / pullback of display mapssubstitution
cut elimination for implicationcounit for hom-tensor adjunctionbeta reduction
introduction rule for implicationunit for hom-tensor adjunctioneta conversion
logical conjunctionproductproduct type
disjunctioncoproduct ((-1)-truncation of)sum type (bracket type of)
implicationinternal homfunction type
negationinternal hom into initial objectfunction type into empty type
universal quantificationdependent productdependent product type
existential quantificationdependent sum ((-1)-truncation of)dependent sum type (bracket type of)
equivalencepath space objectidentity type/path type
equivalence classquotientquotient type
inductioncolimitinductive type, W-type, M-type
higher inductionhigher colimithigher inductive type
-0-truncated higher colimitquotient inductive type
coinductionlimitcoinductive type
completely presented setdiscrete object/0-truncated objecth-level 2-type/preset/h-set
setinternal 0-groupoidBishop set/setoid
universeobject classifiertype of types
modalityclosure operator, (idempotent) monadmodal type theory, monad (in computer science)
linear logic(symmetric, closed) monoidal categorylinear type theory/quantum computation
proof netstring diagramquantum circuit
(absence of) contraction rule(absence of) diagonalno-cloning theorem
synthetic mathematicsdomain specific embedded programming language

homotopy levels




The circle type is an axiomatization of the homotopy type of the (shape of) the circle in the context of homotopy type theory.


As a higher inductive type, the circle is given by

Inductive Circle : Type
  | base : Circle
  | loop : Id Circle base base

This says that the type is inductive constructed from a terms in the circle, whose interpretation is as the base point of the circle, together with a term in the identity type of paths between these two terms, which interprets as the 1-cell of the circle

baseloopbase base \stackrel{loop}{\to} base \,

a non-constant path from the base point to itself.

As a suspension

The circle type could also be defined as the suspension type Σ2\Sigma \mathbf{2} of the type of booleans 2\mathbf{2}.

See also


A formalization of the shape homotopy type ʃS 1Bʃ S^1 \simeq \mathbf{B}\mathbb{Z} of the circle as a higher inductive type in homotopy type theory, along with a proof that ΩʃS 1\Omega ʃS^1\simeq {\mathbb{Z}} (and hence π 1(ʃS 1)\pi_1(ʃS^1) \simeq \mathbb{Z}):

The proof is formalized therein using the Agda proof assistant. See also

Last revised on July 12, 2021 at 14:33:23. See the history of this page for a list of all contributions to it.