nLab circle type

Context

Type theory

natural deduction metalanguage, practical foundations

judgement
hypothetical judgement, sequent
- antecedents $\vdash$ consequent, succedents

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

calculus of constructions

theory, axiom
proposition/type (propositions as types)
definition/proof/program (proofs as programs)
theorem

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

logic	set theory (internal logic of)	category theory	type theory
proposition	set	object	type
predicate	family of sets	display morphism	dependent type
proof	element	generalized element	term/program
cut rule		composition of classifying morphisms / pullback of display maps	substitution
introduction rule for implication		counit for hom-tensor adjunction	lambda
elimination rule for implication		unit for hom-tensor adjunction	application
cut elimination for implication		one of the zigzag identities for hom-tensor adjunction	beta reduction
identity elimination for implication		the other zigzag identity for hom-tensor adjunction	eta conversion
true	singleton	terminal object/(-2)-truncated object	h-level 0-type/unit type
false	empty set	initial object	empty type
proposition, truth value	subsingleton	subterminal object/(-1)-truncated object	h-proposition, mere proposition
logical conjunction	cartesian product	product	product type
disjunction	disjoint union (support of)	coproduct ((-1)-truncation of)	sum type (bracket type of)
implication	function set (into subsingleton)	internal hom (into subterminal object)	function type (into h-proposition)
negation	function set into empty set	internal hom into initial object	function type into empty type
universal quantification	indexed cartesian product (of family of subsingletons)	dependent product (of family of subterminal objects)	dependent product type (of family of h-propositions)
existential quantification	indexed disjoint union (support of)	dependent sum ((-1)-truncation of)	dependent sum type (bracket type of)
logical equivalence	bijection set	object of isomorphisms	equivalence type
	support set	support object/(-1)-truncation	propositional truncation/bracket type
		n-image of morphism into terminal object/n-truncation	n-truncation modality
equality	diagonal function/diagonal subset/diagonal relation	path space object	identity type/path type
completely presented set	set	discrete object/0-truncated object	h-level 2-type/set/h-set
set	set with equivalence relation	internal 0-groupoid	Bishop set/setoid with its pseudo-equivalence relation an actual equivalence relation
	equivalence class/quotient set	quotient	quotient type
induction		colimit	inductive type, W-type, M-type
higher induction		higher colimit	higher inductive type
-		0-truncated higher colimit	quotient inductive type
coinduction		limit	coinductive type
	preset		type without identity types
	set of truth values	subobject classifier	type of propositions
domain of discourse	universe	object classifier	type universe
modality		closure operator, (idempotent) monad	modal type theory, monad (in computer science)
linear logic		(symmetric, closed) monoidal category	linear type theory/quantum computation
proof net		string diagram	quantum circuit
(absence of) contraction rule		(absence of) diagonal	no-cloning theorem
		synthetic mathematics	domain specific embedded programming language

homotopy levels

semantics

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Idea

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

Definition

There are many ways of defining the circle type as a higher inductive type

As the generic self-identification: the homotopy-initial type $S^1$ with element $\mathrm{base}:S^1$ and a self-identification $\mathrm{loop}:\mathrm{Id}_{S^1}(\mathrm{base}, \mathrm{base})$
As the generic parallel pair of identifications: the homotopy-initial type $S^1$ with points $\mathrm{left}:S^1$ and $\mathrm{right}:S^1$ and self-identifications $\mathrm{upath}:\mathrm{Id}_{S^1}(\mathrm{left}, \mathrm{right})$ and $\mathrm{dpath}:\mathrm{Id}_{S^1}(\mathrm{left}, \mathrm{right})$

As the generic self-identification

Let $a =_A b$ denote the identification type between elements $a:A$ and $b:A$ of type $A$ , and let $y =_{x:A.B(x)}^{(a, b, p)} z$ denote the heterogeneous identification type between elements $y:B(a)$ and $z:B(b)$ of type family $x:A \vdash B(x)$ , given elements $a:A$ and $b:A$ and identification $p:a =_A b$ . Let $\mathrm{apd}_f(a, b, p)$ denote the dependent function application of the dependent function $f:\prod_{x:A} B(x)$ to the identification $p:a =_A b$

In the natural deduction formulation of dependent type theory, the circle type is given by the following inference rules:

First the rule that defines the circle type itself in some context $\Gamma$ .

type formation

\frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash S^1 \; \mathrm{type}}

Now the basic “introduction” rule, which says that the circle type consists of a base point $\mathrm{base}:S^1$ and a loop identification $\mathrm{loop}:\mathrm{base} =_{S^1} \mathrm{base}$ .

term introduction:

\frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{base}:S^1} \qquad \frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{loop}:\mathrm{base} =_{S^1} \mathrm{base}}

Induction principle

There are different induction principles associated with the circle type, depending on whether judgmental equalities or identifications are used; if the former are used, this results in strict circle types, and if the latter are used, this results in weak circle types.

The induction principle for strict circle types states that if:

For all $x:S^1$ we have a type $C(x)$
For any term $c_\mathrm{base}:C(\mathrm{base})$ and any heterogeneous identification $c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}$ that $c_\mathrm{base}$ is equal to itself across $\mathrm{loop}$

then we have a dependent function $c:\prod_{x:S^1} C(x)$ such that evaluating $c$ at $\mathrm{base}$ results in $c_\mathrm{base}$ and applying $c$ across $\mathrm{loop}$ results in $c_\mathrm{loop}$ .

c(\mathrm{base}) \equiv c_\mathrm{base} \qquad \mathrm{apd}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv c_\mathrm{loop}

The induction principle for weak circle types states that if:

For all $x:S^1$ we have a type $C(x)$
For any term $c_\mathrm{base}:C(\mathrm{base})$ and any heterogeneous identification $c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}$ that $c_\mathrm{base}$ is equal to itself across $\mathrm{loop}$

there exists a dependent function $c:\prod_{x:S^1} C(x)$ and an identification $p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}$ such that applying $c$ across $\mathrm{loop}$ is equal to $c_\mathrm{loop}$ across $p$ .

\mathrm{ap}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C(\mathrm{base}).z =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}

These are both formalized via the elimination and computation rules for the circle type:

Elimination rules for the circle type:

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop}):\prod_{x:S^1} C(x)}

Computation rules for the strict circle type

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})(\mathrm{base}) \equiv c_\mathrm{base}:C(\mathrm{base})}

Judgmental path constructors

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \mathrm{apd}_{\mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})}(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}

Propositional path constructors

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \beta_{S^1}^{\mathrm{loop}}(c_\mathrm{base}, c_\mathrm{loop}):\mathrm{apd}_{\mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})}(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}} c_\mathrm{loop}}

Computation rules for the weak circle type

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \beta_{S^1}^{\mathrm{base}}(c_\mathrm{base}, c_\mathrm{loop}):\mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}}

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \beta_{S^1}^{\mathrm{loop}}(c_\mathrm{base}, c_\mathrm{loop}):\mathrm{apd}_{\mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})}(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C(\mathrm{base}).z =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} z}^{(\mathrm{ind}_{S^1}(c_\mathrm{base}, c_\mathrm{loop})(\mathrm{base}), c_\mathrm{base}, \beta_{S^1}^{\mathrm{base}}(c_\mathrm{base}, c_\mathrm{loop}))} c_\mathrm{loop}}

For weak circle types, we can package the elimination and propositional computation rules together using dependent sum types to get a single rule for the induction principle of the circle type:

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \mathrm{ind}_{S^1}^{x:S^1.C(x)}(c_\mathrm{base}, c_\mathrm{loop}):\sum_{c:\prod_{x:S^1} C(x)} \sum_{p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}} \mathrm{apd}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C(\mathrm{base}).z =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}}

Since the circle type is a positive type, it is not necessary to include a uniqueness rule for the induction principle circle types, since the propositional uniqueness rule can be proven from the the other inference rules for the circle type. Nevertheless, one can include the uniqueness rule in the combined single induction rule by turning the dependent sum type into a uniqueness quantifier, resulting in the dependent universal property of the circle type.

\frac{\Gamma, x:S^1 \vdash C(x) \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C(\mathrm{base}) \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} c_\mathrm{base}}{\Gamma \vdash \mathrm{ind}_{S^1}^{x:S^1.C(x)}(c_\mathrm{base}, c_\mathrm{loop}):\exists!c:\prod_{x:S^1} C(x).\sum_{p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}} \mathrm{apd}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C(\mathrm{base}).z =_{x:S^1.C(x)}^{(\mathrm{base}, \mathrm{base}, \mathrm{loop})} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}}

Recursion principle

In general, given a type $C$ , by the weakening rule of dependent type theory, one can form the constant type family $C$ indexed by $x:S^1$ ; then one can get the recursion principle of the circle type from the induction principle on $C$ regarded as a constant type family:

The recursion principle for strict circle types states that if:

We have a type $C$
For any term $c_\mathrm{base}:C$ and any identification $c_\mathrm{loop}:c_\mathrm{base} =_{C} c_\mathrm{base}$ that $c_\mathrm{base}$ is equal to itself

then we have a function $c:S^1 \to C$ such that evaluating $c$ at $\mathrm{base}$ results in $c_\mathrm{base}$ and applying $c$ across $\mathrm{loop}$ results in $c_\mathrm{loop}$ .

c(\mathrm{base}) \equiv c_\mathrm{base} \qquad \mathrm{ap}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv c_\mathrm{loop}

The recursion principle for weak circle types states that if:

We have a type $C$
For any term $c_\mathrm{base}:C$ and any identification $c_\mathrm{loop}:c_\mathrm{base} =_{C} c_\mathrm{base}$ that $c_\mathrm{base}$ is equal to itself

there exists a function $c:S^1 \to C$ and an identification $p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}$ such that applying $c$ across $\mathrm{loop}$ is equal to $c_\mathrm{loop}$ across $p$ .

\mathrm{ap}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C.z =_{C} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}

The recursion principle for weak circle types can be presented as a single rule via the use of a dependent sum type:

\frac{\Gamma \vdash C \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{C} c_\mathrm{base}}{\Gamma \vdash \mathrm{rec}_{S^1}^{C}(c_\mathrm{base}, c_\mathrm{loop}):\sum_{c:S^1 \to C} \sum_{p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}} \mathrm{ap}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C.z =_{C} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}}

and similarly, the (non-dependent) universal property of the circle type is presented as a single rule by replacing the dependent sum type in the recursion principle with a uniqueness quantifier

\frac{\Gamma \vdash C \; \mathrm{type} \quad \Gamma \vdash c_\mathrm{base}:C \quad \Gamma \vdash c_\mathrm{loop}:c_\mathrm{base} =_{C} c_\mathrm{base}}{\Gamma \vdash \mathrm{rec}_{S^1}^{C}(c_\mathrm{base}, c_\mathrm{loop}):\exists!c:S^1 \to C.\sum_{p:c(\mathrm{base}) =_{C(\mathrm{base})} c_\mathrm{base}} \mathrm{ap}_c(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{z:C.z =_{C} z}^{(c(\mathrm{base}), c_\mathrm{base}, p)} c_\mathrm{loop}}

Large recursion principle

There is also a large recursion principle which allows one to construct a family of types indexed by the circle type from a type and an autoequivalence:

The large recursion principle for circle types states that if:

We have a type $A$
We have an autoequivalence $e:A \simeq A$

then we have a type family $x:S^1 \vdash C(x)$ such that $C(\mathrm{base})$ results in $A$ and transport across $\mathrm{loop}$ results in $e$ .

C(\mathrm{base}) \equiv A \qquad \mathrm{tr}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv e

Usually, the second computation principle is given by a typal equality, similarly to the recursion and induction principles

\beta_{S^1}^{\mathrm{loop},A}(e):\mathrm{tr}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{A \simeq A} e

There are also typal computation rules for the type as well, which postulate an equivalence of types instead of a judgmental equality, with

\beta_{S^1}^{\mathrm{base},A}(e):C(\mathrm{base}) \simeq A \qquad \beta_{S^1}^{\mathrm{base},A}(e) \circ \mathrm{tr}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \circ \beta_{S^1}^{\mathrm{base},A}(e)^{-1} \equiv \circ e

Similarly, the second computation principle can be given by a typal equality, similarly to the recursion and induction principles:

\beta_{S^1}^{\mathrm{loop},A}(e):\beta_{S^1}^{\mathrm{base},A}(e) \circ \mathrm{tr}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \circ \beta_{S^1}^{\mathrm{base},A}(e)^{-1} =_{A \simeq A} e

If one is working in a dependent type theory with type variables which has identity types between types, then one can also use identifications of types instead of equivalences of types to express large recursion of the circle type:

We have a type $A$
We have an self-identification of types $p:A = A$

then we have a type family $x:S^1 \vdash C(x)$ such that $C(\mathrm{base})$ results in $A$ and the action on identifications across $\mathrm{loop}$ results in $p$ :

C(\mathrm{base}) \equiv A \qquad \mathrm{ap}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv p

Usually, the second computation principle is given by a typal equality, similarly to the recursion and induction principles

\beta_{S^1}^{\mathrm{loop},A}(p):\mathrm{tr}_{S^1}^C(\mathrm{base}, \mathrm{base}, \mathrm{loop}) =_{A = A} p

…

As the generic parallel pair of identifications

In the natural deduction formulation of dependent type theory, the circle type is given by the following inference rules:

First the rule that defines the circle type itself in some context $\Gamma$ .

type formation

\frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash S^1 \; \mathrm{type}}

Now the basic “introduction” rule, which says that the circle type consists of two endpoints $\mathrm{left}:S^1$ and $\mathrm{right}:S^1$ and a pair of parallel identifications $\mathrm{upath}:\mathrm{left} =_{S^1} \mathrm{right}$ and $\mathrm{dpath}:\mathrm{left} =_{S^1} \mathrm{right}$ .

term introduction:

\frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{left}:S^1} \qquad \frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{right}:S^1} \qquad \frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{upath}:\mathrm{left} =_{S^1} \mathrm{right}} \qquad \frac{\Gamma \; \mathrm{ctx}}{\Gamma \vdash \mathrm{dpath}:\mathrm{left} =_{S^1} \mathrm{right}}

Induction principle

The induction principle for strict circle types states that if:

For all $x:S^1$ we have a type $C(x)$
For any term $c_\mathrm{left}:C(\mathrm{left})$ and $c_\mathrm{right}:C(\mathrm{right})$ and any two heterogeneous identifications $c_\mathrm{upath}:c_\mathrm{left} =_{x:S^1.C(x)}^{(\mathrm{left}, \mathrm{right}, \mathrm{upath})} c_\mathrm{right}$ and $c_\mathrm{dpath}:c_\mathrm{left} =_{x:S^1.C(x)}^{(\mathrm{left}, \mathrm{right}, \mathrm{dpath})} c_\mathrm{right}$ that $c_\mathrm{left}$ is identified with $c_\mathrm{right}$ itself across $\mathrm{upath}$ and $\mathrm{dpath}$

then we have a dependent function $c:\prod_{x:S^1} C(x)$ such that evaluating $c$ at $\mathrm{left}$ and $\mathrm{right}$ results in $c_\mathrm{left}$ and $c_\mathrm{right}$ and applying $c$ across $\mathrm{upath}$ and $\mathrm{dpath}$ results in $c_\mathrm{upath}$ and $c_\mathrm{dpath}$ respectively.

c(\mathrm{left}) \equiv c_\mathrm{left} \qquad c(\mathrm{right}) \equiv c_\mathrm{right} \qquad \mathrm{apd}_c(\mathrm{left}, \mathrm{right}, \mathrm{upath}) \equiv c_\mathrm{upath} \qquad \mathrm{apd}_c(\mathrm{left}, \mathrm{right}, \mathrm{dpath}) \equiv c_\mathrm{dpath}

Recursion principle

The recursion principle for strict circle types states that if:

We have a type $C$
For any term $c_\mathrm{left}:C$ and $c_\mathrm{right}:C$ and any two identifications $c_\mathrm{upath}:c_\mathrm{left} =_{C} c_\mathrm{right}$ and $c_\mathrm{dpath}:c_\mathrm{left} =_{C} c_\mathrm{right}$ that $c_\mathrm{left}$ is identified with $c_\mathrm{right}$

then we have a function $c:S^1 \to C$ such that evaluating $c$ at $\mathrm{left}$ and $\mathrm{right}$ results in $c_\mathrm{left}$ and $c_\mathrm{right}$ and applying $c$ across $\mathrm{upath}$ and $\mathrm{dpath}$ results in $c_\mathrm{upath}$ and $c_\mathrm{dpath}$ respectively.

c(\mathrm{left}) \equiv c_\mathrm{left} \qquad c(\mathrm{right}) \equiv c_\mathrm{right} \qquad \mathrm{apd}_c(\mathrm{left}, \mathrm{right}, \mathrm{upath}) \equiv c_\mathrm{upath} \qquad \mathrm{apd}_c(\mathrm{left}, \mathrm{right}, \mathrm{dpath}) \equiv c_\mathrm{dpath}

Properties

Relation to axiom K

Theorem

Suppose that the strict circle type, defined using a single element and a single self-identification, has an identification $K:\mathrm{refl}_{S^1}(\mathrm{base}) = \mathrm{loop}$ . Then every type is a set.

Proof

For all types $A$ , terms $x:A$ , and self-identifications $p:x =_A x$ , by the recursion principle of the strict circle type, we have the function $\mathrm{rec}_{S^1}(x, p):S^1 \to A$ such that $\mathrm{rec}_{S^1}(x, p)(\mathrm{base}) \equiv x$ and $\mathrm{ap}_{\mathrm{rec}_{S^1}^A(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv p$ . We also have by definition of $\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}$ that

\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{refl}_{S^1}(\mathrm{base})) \equiv \mathrm{refl}_{A}(\mathrm{rec}_{S^1}(x, p)(\mathrm{base})) \equiv \mathrm{refl}_A(x)

By applying $\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base})$ to $K$ , we have identification

\mathrm{ap}_{\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base})}(\mathrm{refl}_{S^1}(\mathrm{base}), \mathrm{loop}, K):\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{refl}_{S^1}(\mathrm{base})) = \mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{loop})

which reduces down to

\mathrm{ap}_{\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base})}(\mathrm{refl}_{S^1}(\mathrm{base}), \mathrm{loop}, K):\mathrm{refl}_{A}(x) = p

which is precisely axiom K for type $A$ . Thus every type $A$ is a set.

Theorem

Suppose that the loop of the circle is judgmentally equal to reflexivity of the base of the circle $\mathrm{refl}_{S^1}(\mathrm{base}) \equiv \mathrm{loop}:\mathrm{base} =_{S^1} \mathrm{base}$ . Then the judgmental K rule holds.

Proof

\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{refl}_{S^1}(\mathrm{base})) \equiv \mathrm{refl}_{A}(\mathrm{rec}_{S^1}(x, p)(\mathrm{base})) \equiv \mathrm{refl}_A(x)

Since functions preserve judgmental equality, by applying the function $\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base})$ to the judgmental equality $\mathrm{refl}_{S^1}(\mathrm{base}) \equiv \mathrm{loop}:\mathrm{base} =_{S^1} \mathrm{base}$ , we have a judgmental equality

\mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{loop}) \equiv \mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{base}, \mathrm{base}, \mathrm{refl}_{S^1}(\mathrm{base})):x =_A x

which reduces down to

p \equiv \mathrm{refl}_A(x):x =_A x

which is precisely the judgmental K rule for type $A$ .

Relation to UIP

Theorem

Suppose that the strict circle type, defined using two elements and a pair of parallel identifications, has an identification $\mathrm{UIP}:\mathrm{upath} = \mathrm{dpath}$ . Then every type is a set.

Proof

For all types $A$ , terms $x:A$ and $y:A$ , and identifications $p:x =_A y$ and $q:x =_A y$ , by the recursion principle of the strict circle type defined this way, we have the function $\mathrm{rec}_{S^1}(x, y, p, q):S^1 \to A$ such that

\mathrm{rec}_{S^1}(x, y, p, q)(\mathrm{left}) \equiv x \qquad \mathrm{rec}_{S^1}(x, y, p, q)(\mathrm{right}) \equiv y

\mathrm{ap}_{\mathrm{rec}_{S^1}^A(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{upath}) \equiv p \qquad \mathrm{ap}_{\mathrm{rec}_{S^1}^A(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{dpath}) \equiv q

By applying $\mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right})$ to $\mathrm{UIP}$ , we have the identification

\mathrm{ap}_{\mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right})}(\mathrm{upath}, \mathrm{dpath}, \mathrm{UIP}):\mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{upath}) = \mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{left}, \mathrm{right}, \mathrm{dpath})

which reduces down to

\mathrm{ap}_{\mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right})}(\mathrm{upath}, \mathrm{dpath}, \mathrm{UIP}):p = q

which is precisely the uniqueness of identity proofs for type $A$ . Thus every type $A$ is a set.

Theorem

Suppose that the two parallal identifications of the strict circle type are judgmentally equal to each other of the base of the circle $\mathrm{upath} \equiv \mathrm{dpath}:\mathrm{left} =_{S^1} \mathrm{right}$ . Then the judgmental uniqueness of identity proofs holds.

Proof

\mathrm{rec}_{S^1}(x, y, p, q)(\mathrm{left}) \equiv x \qquad \mathrm{rec}_{S^1}(x, y, p, q)(\mathrm{right}) \equiv y

\mathrm{ap}_{\mathrm{rec}_{S^1}^A(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{upath}) \equiv p \qquad \mathrm{ap}_{\mathrm{rec}_{S^1}^A(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{dpath}) \equiv q

By the congruence rules of judgmental equality applied to the function $\mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right})$ to $\mathrm{UIP}$ , we have the judgmental equality

p \equiv \mathrm{ap}_{\mathrm{rec}_{S^1}(x, y, p, q)}(\mathrm{left}, \mathrm{right}, \mathrm{upath}) \equiv \mathrm{ap}_{\mathrm{rec}_{S^1}(x, p)}(\mathrm{left}, \mathrm{right}, \mathrm{dpath}) \equiv q

which is precisely the judgmental uniqueness of identity proofs for type $A$ .

Types equivalent to the circle type

The circle type is equivalent to the following types

The suspension type $\Sigma \mathrm{Bool}$ of the type of booleans.
The coequalizer type of any two endofunctions on the unit type

\mathbf{1} \rightrightarrows \mathbf{1} \to S^1

Following synthetic homotopy theory, the coequalizer type of the pair of functions on the line type

A^1\underoverset{\quad s \quad}{\mathrm{id}_{A^1}}{\rightrightarrows}A^1 \to S^1

Given a univalent universe $U$ , the type of $U$ -small $\mathbb{Z}$ -torsors. One can then prove that this type satisfies the same induction principle (propositionally). This is due to Dan Grayson.

Induction principle without heterogeneous identifications

There is a version of the induction principle which uses a type $C$ and a function $f:C \to S^1$ instead of a type family $P(x)$ indexed by $x:S^1$ . It has the benefit of not requiring that one has first defined heterogeneous identification types, whether as an inductive family of types or by using transport.

The induction principle of the circle type says that given a type $C$ and a function $f:C \to S^1$ , as well as

an element $c_\mathrm{base}:C$
identifications $c_\mathrm{loop}:c_\mathrm{base} =_C c_\mathrm{base}$ and $p_\mathrm{base}:f(c_\mathrm{base}) =_{S^1} \mathrm{base}$ such that $\mathrm{ap}_f(c_\mathrm{loop})$ , $p_\mathrm{base}$ , $p_\mathrm{base}$ , and $\mathrm{loop}$ form a square

\begin{array}{c} & f(c_\mathrm{base}) & \overset{\mathrm{ap}_{f}(c_\mathrm{loop})}= & f(c_\mathrm{base}) & \\ p_\mathrm{base} & \Vert & & \Vert & p_\mathrm{base}\\ & \mathrm{base} & \underset{\mathrm{loop}}= & \mathrm{base} & \\ \end{array}

an identification saying that the square commutes

p_\mathrm{loop}:\mathrm{ap}_f(c_\mathrm{loop}) \bullet p_\mathrm{base} =_{f(c_\mathrm{base}) =_{S^1} \mathrm{loop}} p_\mathrm{base} \bullet \mathrm{loop}

one can construct

a function

g:S^1 \to C

a homotopy witnessing that $g$ is a section of $f$ :

\mathrm{sec}_g:\prod_{x:S^1} f(g(x)) =_{S^1} x

such that

g(\mathrm{base}) \equiv c_\mathrm{base} \quad \mathrm{sec}_g(\mathrm{base}) \equiv p_\mathrm{base} \quad \mathrm{ap}_{g}(\mathrm{loop}) \equiv c_\mathrm{loop}

\mathrm{ind}_{=}\left(\lambda x:S^1.\mathrm{refl}_{f(g(x)) =_{S^1} x}(\mathrm{sec}_g(x)), \mathrm{base}, \mathrm{base}, \mathrm{loop}\right) \equiv p_\mathrm{loop}

The last condition needs some explanation. Since $g$ is a section of $f$ , the composite $f \circ g$ is the identity function on the circle type, up to identification. Now, given any identity function on the circle type $i:S^1 \to S^1$ with homotopy

j:\prod_{x:S^1} i(x) =_{S^1} x

we have the following square for all $x:S^1$ , $y:S^1$ , and $q:x =_{S^1} y$ :

\begin{array}{c} & i(x) & \overset{\mathrm{ap}_{i}(q)}= & i(y) & \\ j(x) & \Vert & & \Vert & j(y)\\ & x & \underset{q}= & y & \\ \end{array}

This square commutes via the J rule: it suffices to construct an element of

\mathrm{ap}_{i}(\mathrm{refl}_{S^1}(x)) \bullet j(x) =_{i(x) =_{S^1} x} j(x) \bullet \mathrm{refl}_{S^1}(x)

But $\mathrm{ap}_{i}(\mathrm{refl}_{S^1}(x)) \bullet j(x)$ reduces down to $j(x)$ via

\mathrm{ap}_{i}(\mathrm{refl}_{S^1}(x)) \bullet j(x) \equiv \mathrm{refl}_{S^1}(i(x)) \bullet j(x) \equiv j(x)

and similarly $j(x) \bullet \mathrm{refl}_{S^1}(x)$ reduces down to $j(x)$ , so just take reflexivity of $j(x)$ .

So the naturality square is inductively defined by

\mathrm{ind}_{=}\left(\lambda x:S^1.\mathrm{refl}_{i(x) =_{S^1} x}(j(x)), x, y, q\right):\mathrm{ap}_{i}(q) \bullet j(y) =_{i(x) =_{S^1} y} j(x) \bullet q

When $i \coloneqq f \circ g$ , $j \coloneqq \mathrm{sec}_g$ , $x \coloneqq \mathrm{base}$ , $y \coloneqq \mathrm{base}$ , and $q \coloneqq \mathrm{loop}$ , this results in the identification

\mathrm{ind}_{=}\left(\lambda x:S^1.\mathrm{refl}_{f(g(x)) =_{S^1} x}(\mathrm{sec}_g(x)), \mathrm{base}, \mathrm{base}, \mathrm{loop}\right)

which is of the same type as $p_\mathrm{loop}$ due to the judgmental equalities in the other computation rules.

One gets back the usual induction principle of the interval type when $C \equiv \sum_{x:S^1} P(x)$ and $f \equiv \pi_1$ the first projection function of the dependent sum type, and one gets back the recursion principle of the interval type when $C \equiv S^1 \times P$ and $f \equiv \pi_1$ the first projection function of the product type.

Extensionality principle of the circle type

The extensionality principle of the circle type says that there is an equivalence of types between the identification type $\mathrm{base} =_{S^1} \mathrm{base}$ and the type of integers $\mathbb{Z}$ :

\mathrm{ext}_{S^1}:(\mathrm{base} =_{S^1} \mathrm{base}) \simeq \mathbb{Z}

Equivalently, that the loop space type $\Omega(S^1, \mathrm{base})$ is equivalent to the integers.

Thus, the extensionality principle of the circle type implies that the integers and thus the natural numbers are contractible types if axiom K or uniqueness of identity proofs hold for the entire type theory. If the extensionality principle of the natural numbers also hold in the type theory, then every type is contractible.

One can prove the extensionality principle of the circle type, given a univalent universe where the circle is small relative to the universe. The HoTT book provides a number of such proofs.

If one doesn’t have a type of integers or a type universe, then the extensionality principle of the circle type says that the identity types $\mathrm{base} =_{S^1} \mathrm{base}$ satisfy the dependent universal property of the integers type with respect to the element $\mathrm{refl}_{S^1}(\mathrm{base}):\mathrm{base} =_{S^1} \mathrm{base}$ and the equivalence

\lambda p:\mathrm{base} =_{S^1} \mathrm{base}.p \bullet \mathrm{loop}:(\mathrm{base} =_{S^1} \mathrm{base}) \simeq (\mathrm{base} =_{S^1} \mathrm{base})

This is a special case of the extensionality principle of coequalizer types and pushout types as detailed in Kraus and Raumer (2019).

The large recursion principle of the circle type also implies the extensionality principle of the circle type.

The circle type and infinity

The extensionality principle of the circle type says that the loop space of the circle at its base point $\Omega(S^1, \mathrm{base})$ is a denumerable set. However, there is a weaker axiom that one can add to the circle type: that $\Omega(S^1, \mathrm{base})$ is an infinite type.

By the recursion principle of the natural numbers, there is a function

\mathrm{rec}_{\mathbb{N}}(\mathrm{refl}_{S^1}(\mathrm{base}), \lambda l:\Omega(S^1, \mathrm{base}).l \bullet \mathrm{loop}):\mathbb{N} \to \Omega(S^1, \mathrm{base})

which takes zero to reflexivity of $\mathrm{base}$ and the successor function to concatenation of a self-identification by $\mathrm{loop}$ . That $\Omega(S^1, \mathrm{base})$ is an infinite set, states that the above function is an embedding of types,

\mathrm{inf}_{S^1}:\mathrm{isEmbed}\left(\mathrm{rec}_{\mathbb{N}}(\mathrm{refl}_{S^1}(\mathrm{base}), \lambda l:\Omega(S^1, \mathrm{base}).l \bullet \mathrm{loop})\right)

or equivalently that application of the above function is an equivalence for all natural numbers $m:\mathbb{N}$ , $n:\mathbb{N}$

\mathrm{inf}_{S^1}:\prod_{m:\mathbb{N}} \prod_{n:\mathbb{N}} \mathrm{isEquiv}\left(\mathrm{ap}_{\mathrm{rec}_{\mathbb{N}}(\mathrm{refl}_{S^1}(\mathrm{base}), \lambda l:\Omega(S^1, \mathrm{base}).l \bullet \mathrm{loop})}(m, n)\right)

If one doesn’t have a natural numbers type, the loop space $\Omega(S^1, \mathrm{base})$ of the circle type at its base point $\mathrm{base}:S^1$ is an infinite set if and only if $\Omega(S^1, \mathrm{base})$ is equivalent to the sum type $\Omega(S^1, \mathrm{base}) + \Omega(S^1, \mathrm{base})$ .

\mathrm{inf}_{S^1}:\Omega(S^1, \mathrm{base}) \simeq (\Omega(S^1, \mathrm{base}) + \Omega(S^1, \mathrm{base}))

See Rasekh 21 for proving this statement in the presence of the univalence axiom.

Kuratowski-finiteness

The circle type is Kuratowski-finite. (Cf Frumin et al. 18)

H-space structures on the circle type

The type of H-spaces on the circle type is a contractible type.

Related concepts

circle, unit circle, circle group, circle object
interval type
line type
minimal simplicial circle
suspension type
sphere type
homotopy groups of spheres
Jordan curve
lemniscate type?

References

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

Dan Licata, Mike Shulman, Calculating the Fundamental Group of the Circle in Homotopy Type Theory, LICS ‘13: Proceedings of the 2013 28th Annual ACM/IEEE Symposium on Logic in Computer Science June 2013 (arXiv:1301.3443, doi:10.1109/LICS.2013.28)

blog announcements:

A formal proof that $\pi_1(S^1) = \mathbb{Z}$

A simpler proof that $\pi_1(S^1) = \mathbb{Z}$

Formalization in proof assistants:

in Coq:

The HoTT Coq library: theories/hit/Circle.v

in Agda:

The HoTT Agda library: homotopy/LoopSpaceCircle.agda

Exposition and review:

Univalent Foundations Project, §8.1 Homotopy Type Theory – Univalent Foundations of Mathematics (2013) [web, pdf]
Egbert Rijke, Introduction to Homotopy Type Theory, Cambridge Studies in Advanced Mathematics, Cambridge University Press (arXiv:2212.11082)

Alternative construction of the circle type as the type of $\mathbb{Z}$ -torsors:

Marc Bezem, Ulrik Buchholtz, Daniel Grayson, Michael Shulman, Construction of the Circle in UniMath, Journal of Pure and Applied Algebra Volume 225, Issue 10, October 2021, 106687 (arXiv:1910.01856)

Alternative construction of the circle type as a coequalizer:

Mike Shulman, Section 9 of 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)

For the fact that the type of H-space structures on a circle type is contractible:

Ulrik Buchholtz, J. Daniel Christensen, Jarl G. Taxerås Flaten, Egbert Rijke, Central H-spaces and banded types [arXiv:2301.02636]

For the fact that the circle type is Kuratowski-finite:

Dan Frumin, Herman Geuvers, Léon Gondelman, Niels van der Weide, Finite Sets in Homotopy Type Theory, in CPP 2018: Proceedings of the 7th ACM SIGPLAN International Conference on Certified Programs and Proofs (2018) 201–214 [doi:10.1145/3167085, pdf]

For the fact that one can construct a natural numbers type from the circle type:

Nima Rasekh, Every Elementary Higher Topos has a Natural Number Object, Theory and Applications of Categories 37 13 (2021) 337-377. (arXiv:1809.01734, tac:37-13)

For the induction principle of the identity types of the circle type:

Nicolai Kraus, Jakob von Raumer, Path Spaces of Higher Inductive Types in Homotopy Type Theory. [arXiv:1901.06022]

Last revised on May 21, 2025 at 12:48:23. See the history of this page for a list of all contributions to it.

nLab circle type

Context

Type theory

Contents

Idea

Definition

As the generic self-identification

Induction principle

Recursion principle

Large recursion principle

As the generic parallel pair of identifications

Induction principle

Recursion principle

Properties

Relation to axiom K

Theorem

Proof

Theorem

Proof

Relation to UIP

Theorem

Proof

Theorem

Proof

Types equivalent to the circle type

Induction principle without heterogeneous identifications

Extensionality principle of the circle type

The circle type and infinity

Kuratowski-finiteness

H-space structures on the circle type

Related concepts

References