nLab subtype

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
Definition

Material subtypes
Structural subtypes
Comparison between material subtypes, structural subtypes, and predicates

Operations on material and structural subtypes

Material subtypes
Structural subtypes

Decidable subtypes
See also
References

Idea

In type theory, the notion of subtypes is the analog of subsets in set theory.

In the presence of a type universe $Prop$ of propositions (alternatively denoted “ $\Omega$ ”), the subtypes of a given $A \colon Type$ may be simply be identified with the function type from $A$ to $Prop$ :

Sub(A) \;\; = \;\; Prop_A \;\; \equiv \;\; A \to Prop \;\; \equiv \;\; A \to \Omega \,.

In topos-semantics, $Prop$ is interpreted as the subobject classifier and subtypes as subobjects.

Notice that with $Prop$ itself being a subtype of a type universe $Type$ , the subtypes of $A$ are thus a special case of the $A$ -dependent types

Type_A \;\; \equiv \;\; A \to Type \,,

namely those whose fiber type over $a \colon A$ is the proposition asserting that “ $a$ is contained in the subtype”.

This is equivalent to other definitions of subtypes, which one can make sense of also in the absence of a Prop-universe.

Notice here that in set theory, there are in fact two notions of subsets:

In material set theory, a subset of a set $A$ is a set $B$ with the property that for all $x$ , if $x \in B$ , then $x \in A$ , which by the definition of power set in material set theory, is the same thing as an element $B \in \mathcal{P}(A)$ .
In structural set theory, a subset of a set $A$ is a set $B$ with an injection $i \colon B \hookrightarrow A$ .

In dependent type theory, a similar distinction can be made between the two notions of subtypes, resulting in material subtypes and structural subtypes.

Definition

Material subtypes

We work with a Russell type of all propositions $\Omega$ .

Definition

The power set of a type $A$ is defined as the function type from $A$ to the Russell type of all propositions $\Omega$ , $\mathcal{P}(A) \coloneqq A \to \Omega$ .

The power set of a type $A$ is always a set because its codomain, the Russell type of all propositions $\Omega$ , is a set due to the univalence axiom or propositional extensionality.

Definition

A material subtype on $A$ is an element of the power set $B:\mathcal{P}(A)$ .

Definition

The local membership relation $x \in_A B$ between elements $x:A$ and material subtypes $B:\mathcal{P}(A)$ is defined as

x \in_A B \coloneqq B(x)

Theorem

Given a type $A$ and a subtype $P:A \to \mathrm{Prop}$ , one can construct a subtype $[P]_0:[A] \to \mathrm{Prop}$ of the set truncation of $A$ such that for all $x:A$ , $P(x) = [P]_0([x]_0)$ .

Proof

By propositional extensionality, the type of propositions $\mathrm{Prop}$ is a set, and by the universal property of set truncations, given any type $A$ , set $B$ , and function $f:A \to B$ , one can construct a unique function $u:[A]_0 \to B$ such that for all $x:A$ , $f(x) = u([x]_0)$ . This is just the special case of the universal property of set truncations where the codomain is the set of propositions.

Structural subtypes

Definition

A structural subtype of $A$ is a type $B$ with an embedding $i:B \hookrightarrow A$ . $A$ is a supertype of $B$ .

Comparison between material subtypes, structural subtypes, and predicates

material subtype	predicate	structural subtype
$B:\mathcal{P}(A)$	$x:A \vdash x \in_A B \coloneqq B(x)$	$\sum_{x:A} x \in_A B$
$\lambda x:A.B(x):\mathcal{P}(A)$	$x:A \vdash B(x) \qquad x:A \vdash p(x):\mathrm{isProp}(B(x))$	$\sum_{x:A} B(x)$
$\left(\lambda x:A.\sum_{y:B} i(y) =_A x\right):\mathcal{P}(A)$	$x:A \vdash \sum_{y:B} i(y) =_A x$	$B \qquad i:B \hookrightarrow A$

Operations on material and structural subtypes

Material subtypes

Definition

Given a type $A$ , the improper material subtype on $A$ is the material subtype $\Im_A:\mathcal{P}(A)$ such that for all elements $x:A$ , $x \in_A \Im_A$ is contractible.

Definition

Given a type $A$ , there is a binary operation $(-)\cap(-):\mathcal{P}(A) \times \mathcal{P}(A) \to \mathcal{P}(A)$ on the power set of $A$ called the binary intersection, such that for all material subtypes $B:\mathcal{P}(A)$ and $C:\mathcal{P}(A)$ , $B \cap C$ is defined as

(B \cap C)(x) \coloneqq (x \in_A B) \wedge (x \in_A C)

for all $x:A$ , where $A \wedge B \coloneqq [A \times B]$ is the disjunction of two types and $[T]$ is the propositional truncation of $T$ .

Definition

Given a type $A$ and a type $I$ , there is an function $\bigcap:(I \to \mathcal{P}(A)) \to \mathcal{P}(A)$ called the $I$ -indexed intersection, such that for all families of material subtypes $B:I \to \mathcal{P}(A)$ , $\bigcap_{i:I} B(i)$ is defined as

\left(\bigcap_{i:I} B(i)\right)(x) \coloneqq \forall i:I.x \in_A B(i)

for all $x:A$ , where

\forall x:A.B(x) \coloneqq \left[\prod_{x:A} B(x)\right]

is the universal quantification of a type family and $[T]$ is the propositional truncation of $T$ .

Definition

Given a type $A$ , the empty material subtype on $A$ is the material subtype $\emptyset_A:\mathcal{P}(A)$ such that for all elements $x:A$ , $x \in_A \emptyset_A$ is equivalent to the empty type.

Definition

Given a type $A$ , there is a binary operation $(-)\cup(-):\mathcal{P}(A) \times \mathcal{P}(A) \to \mathcal{P}(A)$ on the power set of $A$ called the binary union, such that for all material subtypes $B:\mathcal{P}(A)$ and $C:\mathcal{P}(A)$ , $B \cup C$ is defined as

(B \cup C)(x) \coloneqq (x \in_A B) \vee (x \in_A C)

for all $x:A$ , where $A \vee B \coloneqq [A + B]$ is the disjunction of two types and $[T]$ is the propositional truncation of $T$ .

Definition

Given a type $A$ and a type $I$ , there is an function $\bigcup:(I \to \mathcal{P}(A)) \to \mathcal{P}(A)$ called the $I$ -indexed union, such that for all families of material subtypes $B:I \to \mathcal{P}(A)$ , $\bigcup_{i:I} B(i)$ is defined as

\left(\bigcup_{i:I} B(i)\right)(x) \coloneqq \exists i:I.x \in_A B(i)

for all $x:A$ , where

\exists x:A.B(x) \coloneqq \left[\sum_{x:A} B(x)\right]

is the existential quantification of a type family and $[T]$ is the propositional truncation of $T$ .

Definition

Given a type $A$ , there is a binary relation $B:\mathcal{P}(A), C:\mathcal{P}(A) \vdash B \subseteq_A C$ on the power set of $A$ called the subtype inclusion relation, such that for all material subtypes $B:\mathcal{P}(A)$ and $C:\mathcal{P}(A)$ , $B \subseteq_A C$ is defined as

B \subseteq_A C \coloneqq \prod_{x:A} (x \in_A B) \to (x \in_A C)

Definition

Given a type $A$ , there is a binary relation $B:\mathcal{P}(A), C:\mathcal{P}(A) \vdash \mathrm{Eq}_A(B, C)$ on the power set of $A$ called observational equality, such that for all material subtypes $B:\mathcal{P}(A)$ and $C:\mathcal{P}(A)$ , $\mathrm{Eq}_{\mathcal{P}(A)}(B, C)$ is defined as

\mathrm{Eq}_{\mathcal{P}(A)}(B, C) \coloneqq \prod_{x:A} (x \in_A B) \simeq (x \in_A C)

Proposition

Axiom of extensionality: Given a type $A$ , for all subtypes $B:\mathcal{P}(A)$ and $C:\mathcal{P}(A)$ , there is an equivalence of types between $B =_{\mathcal{P}(A)} C$ and $\mathrm{Eq}_{\mathcal{P}(A)}(B, C)$ .

Proof

For all $x:A$ and $B:\mathcal{P}(A)$ , since $x \in_A B$ is propositions, by the introduction rules of the Russell type of all propositions, $x \in_A B:\Omega$ . The univalence axiom for $\Omega$ states that $(x \in_A B) \simeq (x \in_A C)$ is equivalent to $(x \in_A B) =_\Omega (x \in_A C)$ . Thus, $\mathrm{Eq}_{\mathcal{P}(A)}(B, C)$ is equivalent to $\prod_{x:A} (x \in_A B) =_\Omega (x \in_A C)$ . But by function extensionality, there is an equivalence of types between $B =_{\mathcal{P}(A)} C$ and $\prod_{x:A} (x \in_A B) =_\Omega (x \in_A C)$ ; hence there is an equivalence of types between $B =_{\mathcal{P}(A)} C$ and $\mathrm{Eq}_{\mathcal{P}(A)}(B, C)$ .

Definition

Given a type $A$ , a singleton subtype on $A$ is a material subtype $S:\mathcal{P}(A)$ such that there exists a unique $x:A$ such that $x \in S$ :

\mathrm{isSingleton}(S) \coloneqq \exists!x:A.x \in S

Definition

Given a type $T$ , there is a binary function $(-) \times (-):\mathcal{P}(T) \times \mathcal{P}(T) \to \mathcal{P}(T \times T)$ called the cartesian product of subtypes, defined by

(A \times B)(a, b) \coloneqq (a \in_T A) \wedge (b \in_T B)

for all elements $a:T$ , $b:T$ and subtypes $A:\mathcal{P}(T)$ and $B:\mathcal{P}(T)$ .

Structural subtypes

Definition

Given a type $T$ , $T$ is the improper structural subtype, with embedding given by the identity function on $T$ .

Definition

Given a type $T$ and structural subtypes $R$ and $S$ with embeddings $i_R:R \hookrightarrow T$ and $i_S:S \hookrightarrow T$ , the binary intersection of $R$ and $S$ is the pullback of the two embeddings into $T$ , or equivalently the dependent sum type

R \cap S \coloneqq \sum_{r:R} \sum_{s:S} i_R(r) =_T i_S(s)

Definition

Given a type $T$ , an index type $I$ , and a family of structural subtypes $(R(i))_{i:I}$ with a family of embeddings $i_R:\prod_{i:I} R(i) \hookrightarrow T$ , the $I$ -indexed intersection of $(R(i))_{i:I}$ is the dependent pullback of the embeddings into $T$ , or equivalently the dependent sum type

\bigcap_{i:I} R(i) \coloneqq \sum_{t:T} \prod_{i:I} \sum_{r:R(i)} i_R(i, r) =_T t

By definition of dependent pullback, the intersection of a family of structural subsets is a wide span, with dependent function

\lambda j:I.\lambda p:\bigcap_{i:I} R(i).\pi_1(\pi_2(p)(j)):\prod_{j:I} \left(\bigcap_{i:I} R(i)\right) \to R(j)

Definition

Given a type $T$ , the empty type is the empty structural subtype, with embedding given by any function from the empty type to $T$ .

Definition

Given a type $T$ and structural subtypes $R$ and $S$ with embeddings $i_R:R \hookrightarrow T$ and $i_S:S \hookrightarrow T$ , the binary union of $R$ and $S$ is the pushout type

R \cup S \coloneqq R \sqcup^{R \cap S}_{\pi_1 ; \pi_1' \circ \pi_2} S

where $\pi_1$ and $\pi_2$ are the first and second projection functions for the first dependent sum type and $\pi_1'$ is the first projection function for the second dependent sum type for the intersection as defined above ( $\sum_{r:R} \sum_{s:S} i_R(r) =_T i_S(s)$ )

Definition

Given a type $T$ , an index type $I$ , and a family of structural subtypes $(R(i))_{i:I}$ with a family of embeddings $i_R:\prod_{i:I} R(i) \hookrightarrow T$ , the $I$ -indexed union of $(R(i))_{i:I}$ is the dependent pushout of the dependent pullback

\lambda j.\lambda p.\pi_1(\pi_2(p)(j)):\prod_{j:I} \left(\bigcap_{i:I} R(i)\right) \to R(j)

of the embeddings into $T$ ,

\bigcup_{i:I} R(i) \coloneqq \bigsqcup_{i:I}^{\bigcap_{i:I} R(i), \lambda j.\lambda p.\pi_1(\pi_2(p)(j))} R(i)

Definition

Given a type $T$ , a singleton subtype of $T$ is a contractible type $S$ with an embedding $i:S \hookrightarrow T$ .

Definition

Given a type $T$ and structural subtypes $R$ and $S$ with embeddings $i_R:R \hookrightarrow T$ and $i_S:S \hookrightarrow T$ , the cartesian product of $R$ and $S$ is simply the product $R \times S$ . The associated embedding $i_{R \times S}:(R \times S) \hookrightarrow (T \times T)$ is defined by

i_{R \times S}(a) \coloneqq (i_R(\pi_1(a)), i_S(\pi_2(a)))

for all $a:R \times S$ , where $\pi_1$ and $\pi_2$ are the first and second product projection functions defined in the inference rules of the negative product type $R \times S$ .

Decidable subtypes

Given a Russell type of propositions, a subtype $P:A \to \mathrm{Prop}$ is a decidable subtype if for all $x:A$ , $P(x)$ satisfies the law of excluded middle

\mathrm{isDecidable}(P) \equiv \prod_{x:A} P(x) \vee \neg P(x)

Similarly, given a Tarski type of propositions, a subtype $P:A \to \mathrm{Prop}$ is a decidable subtype if for all $x:A$ , $P(x)$ satisfies the law of excluded middle

\mathrm{isDecidable}(P) \equiv \prod_{x:A} \mathrm{El}(P(x) \vee \neg P(x))

For all types $A$ , there exists an equivalence between the type of decidable subtypes of $A$ and the type of boolean-valued functions of $A$

\mathrm{toDecidSub}:\left(A \to \mathrm{Bool}\right) \simeq \left(\sum_{P:A \to \mathrm{Prop}} \mathrm{isDecidable}(P)\right)

The membership relation of decidable subsets is defined by whether the boolean-valued function evaluations is true

x \in P \coloneqq \mathrm{toDecidSub}^{-1}(P)(x) =_\mathrm{true}

Decidable subtypes are closed under the empty subtype, the improper subtype, and unions with a disjoint singleton subtype:

The empty subtype and improper subtype are given by

\emptyset_A \coloneqq \mathrm{toDecidSub}(\lambda x:A.\mathrm{false}) \qquad \im_A \coloneqq \mathrm{toDecidSub}(\lambda x:A.\mathrm{true})

Singleton subtypes correspond to boolean-valued functions for which there exists a unique $x:A$ such that $f(x)$ is true, and is given by

\sum_{f:A \to \mathrm{bool}} \exists!x:A.f(x) =_\mathrm{bool} \mathrm{true}

Unions of decidable subtypes correspond to lambda abstraction of the disjunction of boolean-valued function evaluations

P \cup Q \coloneqq \mathrm{toDecidSub}(\lambda x:A.\mathrm{toDecidSub}^{-1}(P)(x) \vee \mathrm{toDecidSub}^{-1}(Q)(x))

and intersections of decidable subtypes correspond to lambda abstraction of the conjunction of boolean-valued function evaluations

P \cap Q \coloneqq \mathrm{toDecidSub}(\lambda x:A.\mathrm{toDecidSub}^{-1}(P)(x) \wedge \mathrm{toDecidSub}^{-1}(Q)(x))

Two decidable subtypes are disjoint if their intersection is the empty subtype.

References

Martin Hofmann, Benjamin Pierce, Positive Subtyping, Information and Computation 126 1 (1996) 11-33 [doi:10.1006/inco.1996.0031]

(including early discussion of lenses in computer science)
Univalent Foundations Project, p. 111 of: Homotopy Type Theory – Univalent Foundations of Mathematics (2013) [web, pdf]
Egbert Rijke, §12.2 in: Introduction to Homotopy Type Theory (2019) [web, pdf, GitHub]
Martín Escardó, The subtype classifier and other classifiers, in: Introduction to Univalent Foundations of Mathematics with Agda [arXiv:1911.00580, webpage]
Felix Cherubini, Thierry Coquand, Matthias Hutzler, A Foundation for Synthetic Algebraic Geometry (2023) [arXiv:2307.00073]

(in the context of synthetic algebraic geometry)

In Agda:

UniMath project, foundation-core.subtypes.html
Ettore Aldrovandi, Subtypes, §4 in: Propositions, Sets and Logic–Ⅱ [web]

In Lean:

Kyle Miller, pp. 22 in: Doing math the Lean way, Berkeley Lean Seminar (2020) [pdf, pdf]

Last revised on February 11, 2024 at 18:22:14. See the history of this page for a list of all contributions to it.

nLab subtype

Context

Type theory

Contents

Idea

Definition

Material subtypes

Definition

Definition

Definition

Theorem

Proof

Structural subtypes

Definition

Comparison between material subtypes, structural subtypes, and predicates

Operations on material and structural subtypes

Material subtypes

Definition

Definition

Definition

Definition

Definition

Definition

Definition

Definition

Proposition

Proof

Definition

Definition

Structural subtypes

Definition

Definition

Definition

Definition

Definition

Definition

Definition

Definition

Decidable subtypes

See also

References