basic constructions:
strong axioms
further
SEAR, short for Sets, Elements, And Relations, is a structural set theory with the following properties:
Being a structural set theory, SEAR differs from ZF in the following ways (which are also ways in which it is similar to ETCS):
A good description of the difference between material and structural set theory can be found at Trimble on ETCS I. However, ZFC and ETCS also differ along another axis than the material-structural. At Trimble on ETCS III the following metaphor is proposed for this dimension:
with ZFC it’s more as if you can just hop in the car and go; with ETCS you build the car engine from smaller parts with your bare hands, but in the process you become an expert mechanic, and are not so rigidly attached to a particular make and model.
Using this metaphor, SEAR can be thought of as an ETCS-car which comes preassembled with a nice slick control panel. Or, using an alternate metaphor, ZFC is like Windows, ETCS is like UNIX, and SEAR is like OS X (or maybe Ubuntu). With SEAR you get a nice familiar interface with which it is easy to do standard things, there is less cruft than you get with ZFC, and behind the scenes you have all the power of ETCS (and more). (Of course, if you like Microsoft products, then this metaphor probably does not appeal to you.)
Note that experts will probably always prefer to build their own car/OS; the goal of SEAR is to make structural set theory accessible to a wider audience. In particular, SEAR is intended to demonstrate the complete independence of structural set theory from category theory. Thus, apart from being (by default) stronger than ETCS, SEAR differs from it in the following ways:
SEAR is a theory about three kinds of things: sets, elements, and relations. Every element, and every variable that ranges over elements, is always associated to something denoting a set (which might be a constant or a variable); we say it is an element of that set. If $x$ is an element of $A$ we write $x\in A$; note that this is not an assertion which may be true or false, but a typing declaration. In formal terms, this means that SEAR is a dependently typed theory, with a type of sets, a type of elements for each set term, and a type of relations for each pair of set terms.
One consequence of this is that whenever we quantify over elements we must always quantify over elements of some set; thus we can say “for all elements $x\in A$” but not “for all elements $x$.” Another consequence is that the assertion $x=y$ is only well-formed (a precondition to its being true or false) if $x$ and $y$ are elements of the same set.
In a similar manner, every relation is always associated to an ordered pair of sets, the first called its source and the second its target (thus the fundamental relations in SEAR are binary relations). If $\varphi$ is a relation from $A$ to $B$ we write $\varphi:A\looparrowright B$. As with elements, the assertion $\varphi=\psi$ is only well-formed if $\varphi$ and $\psi$ have the same source and the same target.
Implicit in the existence of three types of things is that nothing is both a set and an element, etc., so in particular a statement such as $x=A$ is not well-formed if $x$ is an element and $A$ a set. Furthermore, SEAR does not include an equality relation between sets: even if $A$ and $B$ are both sets we do not consider $A=B$ to be well-formed. (Thus SEAR respects the principle of equivalence.)
The final piece of data that we have is a notion of when a relation $\varphi:A\looparrowright B$ holds of a pair of elements $x\in A$ and $y\in B$. We write $\varphi(x,y)$ when $\varphi$ holds of $x$ and $y$.
Now we can state the axioms of SEAR, beginning with the most basic ones.
Axiom 0 (Nontriviality): There exists a set which contains an element.
Axiom 1 (Relational comprehension): For any two sets $A$ and $B$, and any property $P$ that can obtain of an element of $A$ and an element of $B$, there exists a unique relation $\varphi:A\looparrowright B$ such that $\varphi(x,y)$ if and only if $P$ obtains of $x$ and $y$.
Here “property” is interpreted formally as “first-order formula”, which makes the axiom (like later the axiom of collection) in fact an axiom scheme.
Axiom 1 basically says that relations are what we expect them to be intuitively. It should remind the reader of the axiom of separation. The two important differences are (1) the presence of two sets and two variables, rather than one, and (2) the fact that what is produced is not a set, but a relation (a different kind of thing). The to-be-introduced Axiom 2 will enable us to make relations into (sub)sets, but first we need some terminology.
A relation $\varphi:A\looparrowright B$ is called a function from $A$ to $B$ if for any $x\in A$, there exists exactly one $y\in B$ with $\varphi(x,y)$.
We write $f:A\to B$ for such a function, and for $x\in A$ we write $f(x)$ for the resulting unique $y\in B$. Note that the uniqueness clause in Axiom 1 implies that functions are extensional: if $f,g:A\to B$ and $f(x)=g(x)$ for all $x\in A$, then $f=g$.
Axiom 2 (Tabulations): For any relation $\varphi:A\looparrowright B$, there exists a set $|\varphi|$ and functions $p:{|\varphi|}\to A$ and $q:{|\varphi|}\to B$ such that: (1) for any $x\in A$ and $y\in B$, we have $\varphi(x,y)$ if and only if there exists $r\in {|\varphi|}$ with $p(r)=x$ and $q(r)=y$, and (2) for any $r\in {|\varphi|}$ and $s\in{|\varphi|}$, if $p(r)=p(s)$ and $q(r)=q(s)$, then $r=s$.
A set $|\varphi|$ equipped with $p$ and $q$ as in Axiom 2 is called a tabulation of the relation $\varphi$. We think of $|\varphi|$ as “the set of pairs $(x,y)$ such that $\varphi(x,y)$ holds,” with $p$ and $q$ projecting $(x,y)$ to $x$ and $y$, respectively. Note that by Axiom 1, any set $R$ equipped with functions $p:R\to A$ and $q:R\to B$ satisfying (2) determines a unique relation $\varphi:A\looparrowright B$ such that $\varphi(x,y)$ holds iff there is an $r\in R$ with $p(r)=x$ and $q(r)=y$; then $R$ is a tabulation of $\varphi$.
Axioms 0, 1, and 2 alone are very powerful! Here are some things we can do with them.
There exists a set $\emptyset$ which has no elements.
By Axiom 0, there exists a set $A$. By Axiom 1, there exists a relation $\varphi:A\looparrowright A$ such that $\varphi(x,y)$ holds never. Using Axiom 2, let $\emptyset$ be a tabulation of $\varphi$.
From now on we fix a particular set $\emptyset$ having no elements. By Axiom 1, for any set $A$ there is exactly one relation $\emptyset\looparrowright A$ and exactly one relation $A\looparrowright\emptyset$.
There exists a set $1$ which has exactly one element.
By Axiom 0, there exists a set $A$ containing an element $x$. By Axiom 1, there exists a relation $\varphi:A\looparrowright A$ such that $\varphi(y,z)$ holds iff $y=x$ and $z=x$. Using Axiom 2, let $1$ be a tabulation of $\varphi$.
From now on we fix a particular set $1$ having exactly one element; we usually denote this element by $\star$. By Axiom 1, for every set $A$ there exists a unique function $f:A\to 1$, defined by $f(x)=\star$ for every $x\in A$. Likewise, to every function $g:1\to A$ there corresponds a unique element $x\in A$, by $g(\star)=x$.
We define a subset of a set $A$ to be a relation $S:1\looparrowright A$. By Axiom 1, a subset $S$ of $A$ is determined by precisely those $x\in A$ such that $S(\star,x)$. If $S(\star,x)$ we write $x\in S$. Note that this is an overloading of the notation $\in$; it can be distinguished from the previous usage because here $S$ is a relation, not a set. Note also that the previous usage $x\in A$ was a typing declaration (it says what kind of thing $x$ is when we introduce it), whereas $x\in S$ is a statement which can be either true or false.
Now Axiom 2 implies that from any subset $S$ of $A$ we can construct a set $|S|$ with a function $i:{|S|}\to A$ such that (1) $x\in S$ iff there is an $x'\in {|S|}$ with $i(x')=x$, and (2) for $x',x''\in {|S|}$, if $i(x')=i(x'')$ then $x'=x''$. A function $i$ with property (2) is called injective; in this way we set up a correspondence between subsets and injective functions. (Likewise, a function $f:A\to B$ is surjective if for any $y\in B$ there is an $x\in A$ with $f(x)=y$.) Combined with Axiom 1, this implies the following separation property.
For any property $P$ of elements of a set $A$, there exists a set $B$ and an injective function $i:B\to A$ such that for $a\in A$, we have $P(a)$ iff $a=i(b)$ for some $b\in B$.
Although the set $|S|$ is not determined uniquely by the subset $S$, it is determined up to bijection. We define an bijection to be a relation $\psi:A\looparrowright B$ such that for every $x\in A$ there is a unique $y\in B$ with $\psi(x,y)$, and for every $y\in B$ there is a unique $x\in A$ with $\psi(x,y)$. Clearly any bijection is a function, as is its opposite (defined by $\psi^o(y,x) \Leftrightarrow \psi(x,y)$), and these two properties characterize bijections. It is also easy to see that a function is a bijection iff it is both injective and surjective.
For example, it is easy to see that if $A$ and $B$ both have no elements, there is a unique bijection between them; thus an empty set $\emptyset$ is determined up to unique bijection. Likewise, if $A$ and $B$ both contain a unique element, then there is a unique bijection between them; thus a set $1$ with one element is also determined up to unique bijection.
If $|\varphi|$ and ${|\varphi|}'$ are two tabulations of the same relation $\varphi:A\looparrowright B$, then there is a bijection between $|\varphi|$ and ${|\varphi|}'$.
By Axiom 1, define $B:{|\varphi|} \looparrowright {|\varphi|}'$ such that $B(x,y)$ holds precisely when $p(x)=p'(y)$ and $q(x)=q'(y)$. The properties of tabulations immediately imply that $B$ is a bijection.
If $|S|$ and ${|S|}'$ are two tabulations of the same subset $S\subseteq A$, then there is a bijection between $|S|$ and ${|S|}'$.
The composite of two relations $\varphi:A\looparrowright B$ and $\psi:B\looparrowright C$ is defined to be the relation $\psi\varphi:A\looparrowright C$ (also written $\psi\circ\varphi$) such that $\psi\varphi(x,z)$ holds of $x\in A$ and $z\in C$ iff there is a $y\in B$ with $\varphi(x,y)$ and $\psi(y,z)$. The identity relation $id_A:A\looparrowright A$ is defined by $id_A(x,y) \Leftrightarrow x=y$.
Composition of relations is associative ($\chi(\psi\varphi)=(\chi\psi)\varphi$), and identity relations are identities for composition ($\id_B\circ \varphi = \varphi = \varphi\circ\id_A$). The composite of functions is a function, and the identity relation is a function. The composite of bijections is a bijection, and a relation $\varphi:A\looparrowright B$ is a bijection iff there is a relation $\psi:B\looparrowright A$ such that $\psi\varphi = id_A$ and $\varphi\psi=id_B$.
Just as in naive set theory.
Informally speaking, we have two categories whose objects are the sets: in Rel the morphisms are the relations, while in Set the morphisms are the functions. Formally, all we can say is that these are “meta-categories,” in the sense that from any model of the first-order axioms of SEAR we can construct them as models of the first-order axioms of a category. (This is not that different from the status of large categories such as $Set$ in material set theories such as ZF. We could also speak about “proper classes” as is done in ZF using first-order formulas.) See also the section on Universes, below.
In both of these (meta-)categories, the isomorphisms are the bijections. We have also already observed that $\emptyset$ and $1$ are an initial object and a terminal object in $Set$, respectively, and that $\emptyset$ is both initial and terminal in $Rel$.
For sets $A$ and $B$, let $\top:A\looparrowright B$ denote the relation such that $\top(x,y)$ holds always. A tabulation of $\top$ is denoted $A\times B$; it is a set equipped with functions $p:A\times B \to A$ and $q:A\times B\to B$ such that for any $x\in A$ and $y\in B$, there exists a unique $z\in A\times B$ with $p(z)=x$ and $q(z)=y$. It is called the cartesian product of $A$ and $B$.
For any sets $A$ and $B$, $A\times B$ is a product of $A$ and $B$ in the category $Set$.
Just as in naive set theory.
In particular, $Set$ has products.
The category $Set$ has finite limits.
It remains to construct the equalizer of two functions $f,g:A\to B$. Let $S$ be the subset of $A$ so that $x\in S$ just when $f(x)=g(x)$; then ${|S|}\to A$ is easily shown to be an equalizer of $f$ and $g$.
For any function $f:A\to B$ we have $f = m e$, where $m:im(f)\hookrightarrow B$ is an injection and $e:A\twoheadrightarrow im(f)$ is a surjection. A set $im(f)$ equipped with such $m$ and $e$ is unique up to bijection and is called the image of $f$.
Let $im(f)$ be $|S|$ where $S$ is defined by $y\in S$ iff there exists an $x\in A$ with $f(x)=y$. By definition, we have an injection $m:im(f)\hookrightarrow B$. And for any $x\in A$, clearly $f(x)\in S$, so there is a unique $y\in im(f)$ with $m(y)=f(x)$; we define $e(x)=y$. It is easy to verify the rest.
Similarly, we can define the union and intersection of subsets of $A$ in the usual way: we have $x\in S\cup T$ iff $x\in S$ or $x\in T$, and $x\in S\cap T$ iff $x\in S$ and $x\in T$.
$Set$ is a well-pointed Heyting category and $Rel$ is a division allegory.
Left to the reader.
In structural set theory, sets cannot contain other sets (or relations), so we cannot strictly speaking have “the set of subsets of a set $A$.” What we generally do instead is have a set $P A$ each of whose elements is associated to a subset of $A$ in a bijective way. This association happens via a specified relation between $A$ and $P A$.
Axiom 3 (power sets): For any set $A$, there exists a set $P A$ and a relation $\epsilon:A\looparrowright P A$ such that for any subset $S$ of $A$, there exists a unique $s\in P A$ with the property that for any $x\in A$, we have $x\in S$ iff $\epsilon(x,s)$.
As in both material set theory and ETCS, many useful consequences flow from this axiom. We first observe that the property of $P A$ stated for subsets actually implies an analogous property for all relations.
For any relation $R:B\looparrowright A$, there exists a unique function $f_R:B\to P A$ such that $R(y,x)$ if and only if $\epsilon(x,f_R(y))$. It follows that $Set$ is a topos (and $Rel$ is a power allegory).
We simply define $f_R$ elementwise; for each $y$ we define $f_R(y)$ to be the unique element of $P A$ such that $\epsilon(x,f_R(y))$ holds iff $R(y,x)$ holds. Extensionality of functions implies that it is unique.
As usual, power sets also imply the existence of function sets.
For any two sets $A$ and $B$, there exists a set $B^A$ and a function $ev:B^A \times A\to B$ such that for any function $f:A\to B$ there exists a unique element $s_f\in B^A$ such that $ev(s_f,a)=f(a)$ for all $a\in A$. It follows that $Set$ is a cartesian closed category.
We take $B^A$ to be a tabulation of the subset of $P(A\times B)$ containing only the functions. More precisely, define $F\subseteq P(A\times B)$ such that $s\in F$ iff for every $x\in A$, there exists a unique $y\in B$ such that $\epsilon((x,y),s)$, and let $B^A = {|F|}$.
The correspondences in Theorems and are “meta-bijections,” but by a standard Yoneda lemma argument they can be converted into actual bijections as defined above in SEAR. This produces bijections such as $C^{A\times B} \cong (C^A)^B$ and $P(A\times B) \cong (P A)^B$.
We now construct quotient sets. Of course, by an equivalence relation on a set $A$ we mean a relation $R:A\looparrowright A$ which is reflexive, transitive, and symmetric.
If $R$ is an equivalence relation on $A$, then there is a surjective function $q:A\twoheadrightarrow B$ such that $R(x,y)$ holds iff $q(x)=q(y)$.
$R$ induces a function $f_R:A\to P A$ as above; let $B$ be $im(f_R)$ and $q$ the surjective part of the image factorization. If $R(x,y)$ holds, then by symmetry and transitivity, $R(x,z)\Leftrightarrow R(y,z)$ for all $z$; hence $f_R(x)=f_R(y)$ and so $q(x)=q(y)$. Conversely, if $q(x)=q(y)$, then $f_R(x)=f_R(y)$; but $y\in f_R(y)$ by reflexivity, hence $y\in f_R(x)$ and thus $R(x,y)$ holds.
Such a $B$, which is easily seen to be unique up to bijection, is called a quotient of $R$ and often written $A/R$.
Likewise, given sets $A$ and $B$, let $A\sqcup B={|S|}$, where $S$ is the subset of $P A \times P B$ consisting of the pairs $(\{x\},\{\})$ for $x\in A$ and $(\{\},\{y\})$ for $y\in B$. (Of course, here we are identifying elements of $P A \times P B$ with ordered pairs of subsets of $A$ and $B$ via the projections of the product and the defining relations $\epsilon_A$ and $\epsilon_B$.) We have evident injections $A\to A\sqcup B$ and $B\to A\sqcup B$ which are jointly surjective and have disjoint image; we call $A\sqcup B$ the disjoint union of $A$ and $B$.
In particular, it follows that $Set$ is a pretopos (as is any topos).
Axiom 4 (Infinity): There exists a set $N$, containing an element $o$, and a function $s:N\to N$ such that $s(n)\neq o$ for any $n\in N$ and $s(n) = s(m)$ only if $n = m$ for any $n, m\in N$.
It is easy to deduce any of the usual consequences of the axiom of infinity. The set $N$ is not asserted to be minimal, but it is easy to cut it down to be so using separation. In particular, this axiom implies that $Set$ has a natural numbers object. We can then proceed to construct the set $\mathbb{Q}$ of rational numbers and the set $\mathbb{R}$ of real numbers in any of the usual ways.
Note also that Axiom 4 implies Axiom 0.
We can however define sets with $n$ elements for each natural number $n$ directly axioms 0, 1, 2 and 3.
The final axiom of SEAR is somewhat trickier to motivate. It corresponds to the axiom of replacement (or more precisely collection; see Wikipedia until we get around to writing our own article) in $\mathbf{ZFC}$, and the reasons that we need it are the same as the reasons that $\mathbf{ZFC}$ needs it.
One way to motivate the collection axiom is as follows. Suppose for the sake of argument that there existed a universal set, meaning a set containing all other sets. Now in structural set theory this is meaningless, since no set can contain other sets, but there is an easy fix: we consider instead indexed families of sets. There are multiple ways to make this precise, but here is a very simple one: an $A$-indexed family of sets is simply a relation $M:A\looparrowright X$. The set indexed by each element $a\in A$ is $M_a = \{x\in X | M(a,x)\}$. (Often one requires the $M_a$ to be a disjoint decomposition of $X$, so that $M^o$ is a function $X\to A$, but this is unnecessary. In fact, if $M:A\looparrowright X$ is a general family, then ${|M|} \to A$ is a function that represents a family in this stronger sense which is equivalent to $M$.)
With this definition, a universal family of sets would be a set $U$ with a $U$-indexed family of sets $E:U\looparrowright Y$ such that for any set $A$, there exists a unique $u\in U$ and a bijection $A\cong E_u$. The existence of such a universal set is inconsistent, but the collection axiom can be thought of as the “ghost” of what would be implied by Axioms 1 and 2 if a universal set did exist. Let’s now unravel that.
If $U$ were a universal set, then any $A$-indexed family $M:A\looparrowright X$ would induce a unique function $f:A\to U$ such that $E_{f(x)} \cong M_x$ for all $x\in A$. Conversely, any function $f:A\to U$ would induce an $A$-indexed family of sets with this property: just take the composite relation $E \circ f$. (This family would not be unique, but it would be unique up to a suitable notion of equivalence between indexed families.) Thus it is reasonable to consider the “ghost” of a function $f:A\to U$ to be simply an $A$-indexed family of sets.
The ghost of a relation $A\looparrowright U$ is even easier. By Axiom 1, to give such a relation would be equivalent to describing a property $P$ that can obtain of an element of $A$ and a set. Thus, the ghost of a relation $A\looparrowright U$ is simply such a property.
If $U$ existed, Axiom 2 would imply that any relation $A\looparrowright U$ had a tabulation consisting of a set $B$ and functions $p:B\to A$ and $q:B\to U$. We now kill $U$ and inspect the ghostly remnants of this tabulation.
Axiom 5 (Collection): For any set $A$ and any property $P$ which can obtain of an element of $A$ and a set, there exists a set $B$, function $p:B\to A$, and a $B$-indexed family of sets $M:B\looparrowright Y$ such that (1) $P(p(b),M_b)$ holds for any $b\in B$, and (2) for any $a\in A$, if there exists a set $X$ with $P(a,X)$, then $a\in im(p)$.
What this axiom asserts is actually a bit weaker than the precise ghost of a tabulation of $P$; that would require instead of (2) that for any $a\in A$ and any set $X$ with $P(a,X)$, there exists a $b\in B$ with $p(b)=a$ and $M_b\cong X$. However, this stronger statement is still inconsistent, because if we took $A=1$ and $P=\top$ it would resurrect $U$ in the form of $B$! The form given above is weak enough to keep the dead in their graves, yet strong enough to be useful. (The former statement follows from the discussion below about inter-interpretability of SEAR and ZF, at least as long as the reader believes that ZF is consistent. The latter remains to be gone more into.)
Exercise: why respect for the principle of equivalence necessary for Axiom 5 to be reasonable as stated?
One thing that Axiom 5 is good for is the recursive construction of sets. For example, using Axioms 1–4 we can construct the sets $N$, $P(N)$, $P(P(N))$, and so on, but we cannot construct anything larger than all the sets in this sequence. Axiom 5 allows us to do that.
(more detail to be added here…)
We obtain a theory called SEARC (SEAR with Choice) by adding the following axiom:
Axiom 6 (Choice): If $\varphi:A\looparrowright B$ is a relation such that for any $a\in A$, there exists a $b\in B$ with $\varphi(a,b)$, then there exists a function $f:A\to B$ with $\varphi(a,f(a))$ for all $a\in A$.
This is easily seen to be equivalent to asserting that all surjections are split in $Set$, which is a more common categorical form of the axiom of choice.
Axioms 1–5 of SEAR make perfect sense whether the ambient logic is classical or constructive. By Diaconescu’s argument, Choice implies the logic is classical. We may call SEAR interpreted in intuitionistic logic ISEAR.
To obtain a predicative theory, Axiom 3 can be replaced by an appropriate weaker axiom, such as the existence of disjoint unions and quotient sets. We may call this variation of SEAR PSEAR.
If desired, we can also add function sets or even a structural version of the axiom of subset collection; as usual, function sets, subset collection, and power sets are all equivalent using classical logic. We may call this variation of SEAR CSEAR.
Compare Erik Palmgren's constructive ETCS.
By bounded SEAR we mean the subtheory consisting of axioms 2–4 of SEAR plus
Axiom 1B (Bounded relational comprehension): The same as Axiom 1, but the property $P$ must be bounded (it can only involve quantifiers over elements, not sets or relations).
All the theorems cited above remain true with Axiom 1 replaced by Axiom 1B, so bounded SEAR still implies that $Set$ is a well-pointed topos with a NNO. Therefore, bounded SEARC implies ETCS. Conversely, it is not hard to show that given any well-pointed topos, if we interpret “set” as “object of the topos”, “element of $A$” as “global element $1\to A$”, and “relation $A\looparrowright B$” as “subobject of $A\times B$,” then Axioms 0, 1B, 2, and 3 are satisfied. It follows that ETCS also implies bounded SEARC, so the two are equivalent.
ETCS can also be augmented with additional axioms to make it equivalent to full SEARC, but that is beyond our scope at the moment.
It is fairly straightforward to construct a model of SEAR from a model of ZF. Given a model of ZF, we define the SEAR-sets to be the ZF-sets, and the SEAR-elements of $A$ to be the ZF-elements of $A$. If we prefer, we can take the SEAR-elements of $A$ to be pairs $(x,A)$ where $x\in_{ZF} A$, so that the elements of distinct sets will be disjoint—but this is not necessary, since in SEAR the question of whether two distinct sets have elements in common is not even well-posed. Finally, we of course take the SEAR-relations $A\looparrowright B$ to be the ZF-subsets of $A\times B$, and we let $\varphi(x,y)$ hold in SEAR iff $(x,y)\in_{ZF} \varphi$. It is then easy to prove Axioms 0, 1, 2, 3, and 4 from the axioms of ZF, and likewise Axiom 6 follows easily from the axiom of choice in ZFC. (In fact, Z and ZC, where the replacement axiom is omitted, suffice for these conclusions.) The only axiom which requires some thought is Collection, and it is here that we use replacement.
The sets, elements, and relations in a model of ZF satisfy the Collection axiom of SEAR.
Let $A$ be a set and $P$ a property as in Axiom 5. As given, $P$ is a first-order statement in the language of SEAR, but we can easily translate it into a statement in the language of ZF; from now on we work in ZF. Define
By the axiom of foundation, for each $a\in A'$ there exists an ordinal $\lambda$ and an $X\in V_{\lambda}$ such that $P(a,X)$; let $\lambda_a$ be the smallest such $\lambda$. Then $a\mapsto V_{\lambda_a}$ is a class function, so by the axiom of replacement, the set $\{V_{\lambda_a} | a\in A'\}$ exists. Let $Y$ be the union of this set. Define
let $p:B\to A$ be the projection onto the first factor, and let $M:B\looparrowright Y$ be defined by
Then $M_{(a,X)} = X$, since each $V_\lambda$ is a transitive set, so $P((a,X), M_{(a,X)})$ holds for any $(a,X)\in B$. Finally, by construction, if there exists $X$ with $P(a,X)$ then $a\in im(p)$; thus the SEAR axiom of collection is satisfied.
Note the use of the axiom of foundation in addition to the axiom of replacement. This can be avoided if we use instead the ZF version of the axiom of collection, which is equivalent to the axiom of replacement over the other ZF axioms (including foundation), by an argument like that above.
Conversely, from any model of SEAR one can construct a model of ZF. The basic idea of this process is described at pure set. Given a model of SEAR, we define a ZF-set to be an equivalence class of well-founded extensional accessible graphs, as described at pure set. We define the global membership relation $\in$ on ZF-sets to be the “immediate subgraph” relation.
The proofs of most of the axioms of ZF are straightforward, and may eventually be found at pure set. Here we treat the proof of the replacement/collection axiom of ZF from the Collection axiom of SEAR, since that is specific to SEAR.
The ZF-sets constructed from a model of SEAR satisfy the ZF axiom of collection (which is equivalent to the axiom of replacement over the other axioms of ZF).
We will prove the version of the ZF axiom of collection which states that for any first-order formula $P$ in the language of ZF, and any ZF-set $A$, there exists a ZF-set $D$ such that for any ZF-element $x\in_{ZF} A$, if there exists a ZF-set $y$ such that $P(x,y)$, then there exists such a $y$ which is a ZF-element of $D$. Note that any first-order formula in the language of ZF about ZF-sets can easily be translated into a first-order formula in the language of SEAR.
Fix such a $P$ and $A$; thus $A$ is a SEAR-set equipped with a binary relation $\to$ of a certain type. Let $A'$ be the subset of $A$ consisting of the children of the root of $A$. For a SEAR-set $X$, let $P'(a,X)$ mean that $X$ admits the structure of a ZF-set such that the ZF-statement $P(down(a),X)$ holds. By the SEAR axiom of collection, there is a set $B$, a function $p:B\to A'$, and a $B$-indexed family of sets $M:B\looparrowright Y$ such that (1) each $M_b$ admits the structure of a ZF-set with $P(down(p(b)),M_b)$, and (2) if there is a ZF-set $X$ with $P(down(a),X)$, then $a\in im(p)$.
Let $C$ be the subset of $B\times P(Y\times Y)\times Y$ consisting of pairs $(b,r,y)$ such that $y\in M_b$ and $r$ represents a binary relation on $M_b$ making it into a ZF-set such that $P(down(p(b)),M_b)$. Now $C$ can be equipped with the relation that is the disjoint union of all the $r$s, i.e. we set $(b,r,y)\to (b',r',y')$ iff $b=b'$, $r=r'$, and $y\to_r y'$. Let $C'=C\sqcup 1$ extend this relation with the additional point being a root, i.e. $(b,r,y)\to \star$ iff $y$ is the root of $r$. Now $C'$ is a well-founded accessible graph, but it may not be extensional; we take $D$ to be the ZF-set represented by the extensional quotient of $C'$.
Then for any $x\in_{ZF}A$, we have $x\cong down(a)$ for some child $a$ of the root of $A$, i.e. $a\in A'$. Thus, if there is a ZF-set $y$ with $P(x,y)$, then $a\in im(p)$ and so there is such a ZF-set represented by one of the $r$‘s occurring in $C$. By construction, this ZF-set is then equivalent to $down(d)$ for some child of the root of $D$, hence $down(d) \in_{ZF} D$. Thus $D$ satisfies the requirement of the ZF axiom of collection.
Thus, SEAR and SEARC are at least equiconsistent with ZF and ZFC, respectively. In fact, SEARC and ZFC are equivalent, in the sense that passage back and forth in either direction yields an equivalent model. However, passage from SEAR to ZF and back again can lose information, if there are sets in the model of SEAR which do not admit any well-founded extensional relation (this doesn’t happen in the presence of choice, since then every set can be well-ordered).
Every topos has an internal logic, which is a type theory. However, the line between type theory and structural set theory is fine and sometimes hard to see; the main difference is that structural set theory can involve quantifiers over sets (= types), while type theory only allows (“bounded”) quantifiers over elements of types. However, formally, if one has a type judgment $A \; \mathrm{type}$ and a type of sets $Set \; \mathrm{type}$ rather than a set judgment $A \; \mathrm{set}$, one could use quantifers bounded over elements of $Set$ instead of unbounded quantifiers. The type of sets $Set$ in structural set theory behaves as a Russell universe in type theory, where given a set $A \in Set$ one could derive a type $A \; \mathrm{type}$. Through this correspondence, Intuitionistic Bounded SEAR can be treated as a type theory and interpreted internally in any topos with a NNO. Of course, if the topos is boolean, then the logic can be classical.
One can also write down stronger axioms on a topos such that if they are satisfied, then full Intuitionistic SEAR can be interpreted “internally” in that topos, extending the usual internal logic.
An alternate formulation of the theory uses three sorts, one for sets, elements, and relations, making SEAR into a three-sorted set theory. The membership $a \in A$ becomes a relation between the sort of elements and the sort of sets, while the relational domain and codomain notation $\varphi:A \looparrowright B$ also becomes a ternary relation between the sort of relations, and two copies of the sort of sets. There is a quinary relation $\mathrm{holds}(A, B, \varphi, a, b)$ between all three sorts, which says that given sets $A$ and $B$, the relation $\varphi$ holds for element $a$ and $b$ in the context of $\varphi:A \looparrowright B$, $a \in A$, and $b \in B$.
An alternate formulation of the theory, suggested by Toby, has four primitive notions: sets, elements, subsets, and a pairing operation. Sets and elements are as before. A subset is, like an element, attached to a certain set; it is always a subset of some set. Thus we have a typing declaration $S\subseteq A$. We also have a primitive notion of when an element $x\in A$ belongs to a subset $S\subseteq A$; thus now we have $x\in S$ as a possible assertion of the theory (analogous to $R(x,y)$ before). We allow a typed equality predicate for subsets. Finally, there is an operation which assigns to every pair of sets $A$ and $B$ a set $A\times B$, and to every pair of elements $x\in A$ and $y\in B$ an element $(x,y)\in A\times B$.
Axiom 0 is the same as before.
Axiom $\frac{1}{2}$ (Pairing): For every pair of sets $A$ and $B$ and every element $z\in A\times B$, there exists a unique pair of elements $x\in A$ and $y\in B$ such that $z=(x,y)$.
Axiom $1\frac{1}{2}$ (Subset comprehension): For every property $P$ that can obtain of elements $x$ of some set $A$, there exists a unique subset $S\subseteq A$ such that $x\in S$ precisely when $P$ obtains of $x$
We now define a relation $A\looparrowright B$ to be a subset of $A\times B$. With this definition, Axiom $1\frac{1}{2}$ clearly implies Axiom 1 (relational comprehension). We define functions and their properties as before. Axiom $\frac{1}{2}$ implies that there are projection functions $A\times B\to A$ and $A\times B\to B$ which make $A\times B$ into a product in $Set$.
Axiom $2\frac{1}{2}$ (Separation): For every set $A$ and every subset $S\subseteq A$, there exists a set $|S|$ and an injective function $i:{|S|}\to A$ such that for any $x\in A$, we have $x\in S$ if and only if there is a $z\in {|S|}$ with $i(z)=x$.
Applying separation to subsets of $A\times B$ and composing $i$ with the product projections, we recover Axiom 2 (tabulations). We can now go on with the subsequent axioms stated in the same way as before.
One could use functions instead of relations. Sets and elements are as before. A function $f:A \to B$ depends on two sets $A$ and $B$, similar to a relation. For every function $f:A \to B$ and element $a \in A$, one could form the element $f(a) \in B$ called the function evaluation of $f$ at $a$. Finally, there is an operation which assigns to every pair of sets $A$ and $B$ a set $A\times B$, and to every pair of elements $x\in A$ and $y\in B$ an element $(x,y)\in A\times B$, as well as functions $\pi_A:A \times B \to A$ and $\pi_B:A \times B \to B$.
Axiom 0 is the same as before.
Axiom $\frac{1}{4}$ (strong extensionality): Given function $i:A \to B$, the following statements are logically equivalent to each other:
A function is a bijection if one of the two conditions above hold.
Axiom $\frac{1}{2}$ (Pairing): For every pair of sets $A$ and $B$ and for every element $x \in A$, $y \in B$, and $z\in A\times B$, $\pi_A((x, y)) = x$, $\pi_B((x, y)) = y$, and $z=(\pi_A(z),\pi_B(z))$.
An function $f:A \to B$ is an injection if for all elements $x \in A$ and $y \in A$, $x = y$ if and only if $f(x) = f(y)$, and is usually denoted $f:A \hookrightarrow B$. $A$ is a subset of $B$ if it comes with an injection $i:A \hookrightarrow B$. We now define a relation to be a set $R$ with an injective function $i:R \hookrightarrow A\times B$.
Axiom $2\frac{1}{2}$ (Separation): For every property $P$ that can obtain of elements $x$ of some set $A$, there exists a set $S$ and unique injection $i:S \hookrightarrow A$ such that there exists an element $y \in S$ such that $i(y) = x$ precisely when $P$ obtains of $x$
A relation $i:R \hookrightarrow A \times B$ is a total functional relation if for all elements $a \in A$, there exists a unique element $b \in B$ and a unique element $z \in A \times B$ such that $i(z) = (a, b)$. Since there is a function $\pi_A \circ i:R \to A$, by strong extensionality there is an inverse function $(\pi_A \circ i)^{-1}:A \to R$, and the function $\pi_B \circ (\pi_A \circ i)^{-1}:A \to B$ is the function satisfying $i((\pi_A \circ i)^{-1}(a)) = (a, \pi_B((\pi_A \circ i)^{-1}(a))$. Thus, the principle of unique choice holds.
Applying separation to relations $i:R \hookrightarrow A \times B$ and using the principle of unique choice, we recover Axioms 1 (relational comprehension) and 2 (tabulations). We can now go on with the subsequent axioms stated in the same way as before.
As stated SEAR includes a fundamental “equality” relation on elements of a given set. However, we can also make equality into structure. This is definitely not along the “more accessible to undergraduates” direction! But it may sometimes be technically helpful.
Consider a theory of pre-sets, elements, and pre-relations as in SEAR, with “pre-sets” replacing sets, except that there is no given equality relation on anything. Axiom 0 requires no modification. In Axiom 1, we reinterpret the “uniqueness” clause as a definition of what it means for two parallel pre-relations to be equal, i.e. $\varphi=\psi$ if $\varphi(x,y)\Leftrightarrow\psi(x,y)$ for all $x$ and $y$ in the source and target of $\varphi$ and $\psi$.
Before stating the version of Axiom 2 we need some definitions. We define a set to be a preset $A$ equipped with an equivalence pre-relation $=_A$. A relation between sets $(A,{=_A})$ and $(B,{=_B})$ is a pre-relation $\varphi:A\looparrowright B$ which is extensional in the sense that if $\varphi(x,y)$, $x'=_A x$, and $y'=_B y$, then $\varphi(x',y')$. Finally, a function $f:(A,{=_A}) \to (B,{=_B})$ is a relation which is (a) entire: for any $x\in A$, there is a $y\in B$ with $f(x,y)$, and (b) functional: if $f(x,y)$ and $f(x',y')$ and $x=_A x'$, then $y=_B y'$.
Now Axiom 2 reads: for any sets $(A,{=_A})$ and $(B,{=_B})$ and any relation $\varphi:(A,{=_A})\looparrowright (B,{=_B})$, there exists a set $({|\varphi|},{=_{|\varphi|}})$ and functions $p:{|\varphi|}\to A$ and $q:{|\varphi|}\to B$ such that: (1) for any $x\in A$ and $y\in B$, we have $\varphi(x,y)$ if and only if there exists $r\in {|\varphi|}$ with $p(r,x)$ and $q(r,y)$, and (2) for any $r\in {|\varphi|}$ and $s\in{|\varphi|}$, if $p(r)=_A p(s)$ and $q(r)=_B q(s)$, then $r=_{|\varphi|}s$. Note that it is sufficient to assert merely that $|\varphi|$ is a pre-set and $p$ and $q$ are entire relations satisfying (1), since (2) can then be used to define $=_{|\varphi|}$ in such a way as to make it a set and $p$ and $q$ functions.
The construction of $\emptyset$ is just as in ordinary SEAR. The construction of $1$ in ordinary SEAR used equality, but we now have a simple replacement for it: let $1$ be any pre-set containing an element, equipped with the equivalence relation such that $x=y$ always for any $x,y\in 1$. Similarly, in this variant we can construct quotient sets without needing powersets; we simply enlarge the equivalence relation on the underlying pre-set of a set.
Of course, if $(A,{=_A})$ is a set, a subset of $A$ is a relation $1\looparrowright (A,{=_A})$. Axiom 3 can now be translated as-is, or it can be simplified to assert merely the existence of a pre-set $P A$ such that any subset of $A$ is represented by some element of $P A$, with the uniqueness clause turned into a definition of $=_{P A}$. The same idea applies to all the other axioms.
If to this equality-free version of SEAR we add a primitive notion of (non-extensional) “operation” and a choice operator, we obtain SEAR+?.
In model theory, one could construct models of a particular theory $C$.
Here, we construct a categorical model of SEAR in the context of homotopy type theory. This particular model of SEAR, $C$, consists of
A type $Ob(C)$, whose terms are called “sets”. We shall call these “internal sets”, to distinguish them from the sets of the metatheory?.
For each internal set $A:Ob(C)$, a set $El(A)$, whose terms are called “elements”. We shall call these “internal elements”, to distinguish them from the elements of the metatheory.
For each internal set $A:Ob(C)$ and $B:Ob(C)$, a set $Hom(A,B)$, whose terms are called “relations”. We shall call these “internal relations”, to distinguish them from the relations of the metatheory.
For each internal set $A:Ob(C)$ and $B:Ob(C)$, internal relation $R:Hom(A,B)$, and internal element $a:El(A)$ and $b:El(B)$, a type $R(a,b)$ with a term $p:isProp(R(a,b))$ representing that $R(a,b)$ is a mere proposition.
For each internal set $A:Ob(C)$, $B:Ob(C)$, $D:Ob(C)$, a function
representing composition of internal relations, and a term
where $\left[T\right]$ is the propositional truncation of the type $T$. This states that for all internal sets $A$, $B$, and $D$, all internal relations $R:Hom(A,B)$ and $S:Hom(B,C)$, and all internal elements $a:El(A)$ and $d:El(D)$, $(S \circ R)(a, d)$ if and only if there exists an element $b:El(B)$ such that $S(b,d)$ and $R(a,b)$.
For each internal set $A:Ob(C)$, a relation
representing the internal identity relation, and terms
This states the axiom of extensionality: that for all internal sets $A$ and $B$, internal relation $R$, and internal elements $a:El(A)$, $a^{'}:El(A)$, $b:El(B)$, and $b^{'}:El(B)$, $R(a,b)$ and $id_A(a,a^{'})$ and $id_B(b,b^{'})$ together imply $R(a^{'},b^{'})$.
Thus, $C$ is a dagger 2-poset whose underlying category is a concrete category.
Let the type of all internal maps between internal sets $A:Ob(C)$ and $B:Ob(C)$ in $C$ be defined as
For each internal set $A:Ob(C)$ and $B:Ob(C)$, a function $(-)((-)): Map(A,B) \times El(A) \to El(B)$ representating evaluation of internal maps and a term $\delta:isContr(P(f)(a, f(a)))$, representing that the relation $P(f)(a, f(a))$ is true.
A internal set $A:Ob(C)$ with a term $\epsilon:\left[El(A)\right]$, representing that there is an inhabited set.
For each internal set $A:Ob(C)$ and $B:Ob(C)$ and internal relation $R:Hom(A,B)$, an internal set $\vert R \vert:Ob(C)$ and map $f:Hom(\vert R \vert, A)$, $g:Hom(\vert R \vert, B)$, and a term $q:R = f^\dagger \circ g$ and a term
representing that every internal relation comes with a subset of the product set $El(A) \times El(B)$.
For each internal set $A:Ob(C)$, a internal set $\mathcal{P}(A)$ and a internal relation $\in_A:Hom(A, \mathcal{P}(A))$ and a term
representing that internal power sets exist.
As a result, $C$ is an elementarily topical dagger 2-poset.
An internal set $\mathbb{N}:Ob(C)$ with internal maps $0:El(\mathbb{N})$ and $s:Hom(\mathbb{N},\mathbb{N})$ and a term
representing that a natural numbers object exist.
For each internal set $A:Ob(C)$ and function $Q:El(A) \times Ob(C) \to Prop_\mathcal{U}$, an internal set $B:Ob(C)$ with an internal map $p:Hom(B,A)$, a function $M:El(B) \to Ob(C)$ and terms
representing that the axiom of collection is validated.
Here, we construct a model of SEPS in the context of homotopy type theory. This particular model of SEPS, $C$, consists of
A type $Ob(C)$, whose terms are called “sets”. We shall call these “internal sets”, to distinguish them from the sets of the metatheory?.
For each “set” $A:Ob(C)$, a set $El(A)$, whose terms are called “elements”. We shall call these “internal elements”, to distinguish them from the elements of the metatheory.
For each “set” $A:Ob(C)$ and $B:Ob(C)$, a set $A \times B$, whose terms are called “pairs”. We shall call these “internal pairs”, to distinguish them from the pairs of the metatheory.
For each “set” $A:Ob(C)$ and $B:Ob(C)$, a function $((-),(-)):El(A) \times El(B) \to El(A \times B)$ with functions $p_A:El(A \times B) \to El(A)$ and $p_B:El(A \times B) \to El(B)$
For each “set” $A:Ob(C)$, a type $Sub(A)$, whose terms are called “subsets”, and a term $p:isHeytAlg(Sub(A))$, representing that the subsets of $A$ are Heyting algebras. We shall call these “internal subsets”, to distinguish them from the subsets of the metatheory.
An internal relation is a term $R:Sub(A \times B)$.
For each internal set $A:Ob(C)$, $B:Ob(C)$, $D:Ob(C)$, a function
and a term
where $\left[T\right]$ is the propositional truncation of the type $T$.
For each internal set $A:Ob(C)$, $B:Ob(C)$, a relation
and terms
Let the type of all internal maps between internal maps $A:Ob(C)$ and $B:Ob(C)$ in $C$ be defined as
For each internal set $A:Ob(C)$ and $B:Ob(C)$, a function $(-)((-)): Map(A,B) \times El(A) \to El(B)$ and a term $\delta:isContr(P(f)(a, f(a)))$.
An internal set $A:Ob(C)$ with a term $\epsilon:\left[El(A)\right]$.
For each internal set $A:Ob(C)$, there is a function $\vert(-)\vert:Sub(A) \to Ob(C)$, and for every subset $S:Sub(A)$ there is an injection? $i:\vert S \vert \to A$.
For each internal set $A:Ob(C)$, an internal set $\mathcal{P}(A)$ and a internal relation $\in_A:Sub(A \times \mathcal{P}(A))$ and a term
An internal sets $\mathbb{N}:Ob(C)$ with internal maps $0:El(\mathbb{N})$ and $s:Sub(\mathbb{N} \times \mathbb{N})$ and a term
The following pages develop various aspects of set theory in SEAR or related theories.
Last revised on December 19, 2022 at 18:56:27. See the history of this page for a list of all contributions to it.