A **function** $F$ is a single-valued [[relations|relation]]. We say $F$ **maps $A$ into $B$**, denoted $F \colon A \rightarrow B$, if and only if $F$ is a function, $\mathop{\text{dom}}F = A$, and $\mathop{\text{ran}}F \subseteq B$.
An **operation** on some set (say) $S$ is a function with "signature" $S \times \cdots \times S \rightarrow S$. More precisely, an $n$-ary operation on $S$ is a function $S^n \rightarrow S$ where $n \geq 0$.
%%ANKI
Basic
Let $A$ and $B$ be disjoint sets. Is $f \colon A \rightarrow B$ a function, operation, both, or neither?
Back: Function.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
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%%ANKI
Basic
Let $A \subseteq B$. Is $f \colon A \rightarrow B$ a function, operation, or both?
Back: Both.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914206-->
END%%
%%ANKI
Basic
Let $A$ and $B$ be disjoint sets. $f \colon A \rightarrow B$ is an operation on what set?
Back: N/A.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914207-->
END%%
%%ANKI
Basic
Let $A \subseteq B$. $f \colon A \rightarrow B$ is an operation on what set?
Back: $B$.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914208-->
END%%
%%ANKI
Basic
What is the arity of operation $f \colon A \rightarrow A$?
Back: $1$
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914209-->
END%%
%%ANKI
Basic
What is the arity of operation $f \colon A \times A \rightarrow A$?
Back: $2$
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914210-->
END%%
%%ANKI
Basic
What is the arity of operation $f \colon A \times \cdots \times A \rightarrow A$?
Back: The number of terms in $A \times \cdots \times A$.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914211-->
END%%
%%ANKI
Basic
Why is it incomplete to state function $f$ is an operation?
Back: We have to ask what set $f$ is an operation on.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
<!--ID: 1729804914212-->
END%%
%%ANKI
Basic
Which of operations or functions is the more general concept?
Back: Functions.
Reference: “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).
A function is **injective** or **one-to-one** if each element of the codomain is mapped to by at most one element of the domain.
%%ANKI
Basic
What does it mean for a function to be injective?
Back: Each element of the codomain is mapped to by at most one element of the domain.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464126887-->
END%%
%%ANKI
Basic
What does it mean for a function to be one-to-one?
Back: Each element of the codomain is mapped to by at most one element of the domain.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870487-->
END%%
%%ANKI
Basic
Each element of an injection's codomain is mapped to by how many elements of the domain?
Back: At most one.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464498595-->
END%%
%%ANKI
Basic
Suppose `Function.Injective f` for $f \colon A \rightarrow B$. What predicate logical formula describes $f$?
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870490-->
END%%
%%ANKI
Basic
Does the following depict a one-to-one function?
![[function-injective.png]]
Back: Yes.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870493-->
END%%
%%ANKI
Basic
Does the following depict a one-to-one function?
![[function-surjective.png]]
Back: No.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870497-->
END%%
%%ANKI
Basic
*Why* isn't the following an injection?
![[function-general.png]]
Back: Both $1 \mapsto d$ and $2 \mapsto d$.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870505-->
END%%
%%ANKI
Basic
Is a single-valued set a function?
Back: Not necessarily.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718427443358-->
END%%
%%ANKI
Basic
Is a single-valued relation a function?
Back: Yes.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718427443362-->
END%%
%%ANKI
Basic
Is a single-rooted set a function?
Back: Not necessarily.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870509-->
END%%
%%ANKI
Basic
Is a single-rooted relation a function?
Back: Not necessarily.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870519-->
END%%
%%ANKI
Cloze
{One-to-one} is to functions whereas {single-rooted} is to relations.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870525-->
END%%
%%ANKI
Basic
Is a one-to-one function a single-rooted relation?
Back: Yes.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870531-->
END%%
%%ANKI
Basic
Is a single-rooted relation a one-to-one function?
Back: Not necessarily.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870536-->
END%%
%%ANKI
Basic
Is a single-rooted function a one-to-one function?
Back: Yes.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
Assume that $F \colon A \rightarrow B$ is a function and $A \neq \varnothing$. Then there exists a function $G \colon B \rightarrow A$ (a **left inverse**) such that $G \circ F = I_A$ if and only if $F$ is one-to-one.
%%ANKI
Basic
What is the most specific mathematical object that describes a left inverse?
Back: A function.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719683931406-->
END%%
%%ANKI
Basic
How is a left inverse of $F \colon A \rightarrow B$ defined?
Back: As a function $G \colon B \rightarrow A$ such that $G \circ F = I_A$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
A function is **surjective** or **onto** if each element of the codomain is mapped to by at least one element of the domain. That is, **$F$ maps $A$ onto $B$** if and only if $F$ is a function, $\mathop{\text{dom}}A$, and $\mathop{\text{ran}}F = B$.
%%ANKI
Basic
What does it mean for function to be surjective?
Back: Each element of the codomain is mapped to by at least one element of the domain.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464126891-->
END%%
%%ANKI
Basic
What does it mean for a function to be onto?
Back: Each element of the codomain is mapped to by at least one element of the domain.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718465870546-->
END%%
%%ANKI
Basic
Each element of a surjection's codomain is mapped to by how many elements of the domain?
Back: At least one.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464498606-->
END%%
%%ANKI
Basic
Suppose `Function.Surjective f` for $f \colon A \rightarrow B$. What predicate logical formula describes $f$?
Back: $\forall b \in B, \exists a \in A, f(a) = b$
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
{1:Injective} is to {2:one-to-one} as {2:surjective} is to {1:onto}.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464126897-->
END%%
%%ANKI
Basic
What three conditions hold iff $F$ maps $A$ onto $B$?
Back: $F$ is a function, $\mathop{\text{dom}}F = A$, and $\mathop{\text{ran}}F = B$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718427443408-->
END%%
%%ANKI
Basic
Let $F$ map $A$ into $B$. Does $F$ map $A$ onto $B$?
Back: Not necessarily.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718427443412-->
END%%
%%ANKI
Basic
Let $F$ map $A$ onto $B$. Does $F$ map $A$ into $B$?
Back: Yes.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1718427443419-->
END%%
%%ANKI
Basic
Does the following depict a surjection?
![[function-bijective.png]]
Back: Yes.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870552-->
END%%
%%ANKI
Basic
Does the following depict an onto function?
![[function-injective.png]]
Back: No.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870558-->
END%%
%%ANKI
Basic
Does the following depict an onto function?
![[function-surjective.png]]
Back: Yes.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
Assume that $F \colon A \rightarrow B$ is a function and $A \neq \varnothing$. Then there exists a function $G \colon B \rightarrow A$ (a right inverse) such that $F \circ G = I_B$ if and only if $F$ maps $A$ onto $B$.
%%ANKI
Basic
What is the most specific mathematical object that describes a right inverse?
Back: A function.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719683931410-->
END%%
%%ANKI
Basic
How is a right inverse of $F \colon A \rightarrow B$ defined?
Back: As a function $G \colon B \rightarrow A$ such that $F \circ G = I_B$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
A function is **bijective** or a **one-to-one correspondence** if each element of the codomain is mapped to by exactly one element of the domain.
%%ANKI
Basic
What does it mean for a function to be bijective?
Back: It is both injective and surjective.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464728903-->
END%%
%%ANKI
Basic
Each element of a bijection's codomain is mapped to by how many elements of the domain?
Back: Exactly one.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464728907-->
END%%
%%ANKI
Cloze
{1:Injective} is to {2:one-to-one} as {2:bijective} is to {1:one-to-one correspondence}.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718464728899-->
END%%
%%ANKI
Cloze
{1:Surjective} is to {2:onto} as {2:bijective} is to {1:one-to-one correspondence}.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870579-->
END%%
%%ANKI
Basic
Does the following depict a bijection?
![[function-bijective.png]]
Back: Yes.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870585-->
END%%
%%ANKI
Basic
*Why* isn't the following a one-to-one correspondence?
![[function-injective.png]]
Back: The function does not map onto $Y$.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870592-->
END%%
%%ANKI
Basic
*Why* isn't the following a one-to-one correspondence?
![[function-surjective.png]]
Back: The function is not one-to-one.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
<!--ID: 1718465870599-->
END%%
%%ANKI
Basic
What distinguishes a one-to-one function from a one-to-one correspondence?
Back: The former is not necessarily surjective.
Reference: “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
Let $F$ and $G$ be arbitrary sets. The **composition** of $F$ and $G$ is the set $$F \circ G = \{\langle u, v \rangle \mid \exists t, uGt \land tFv \}$$
%%ANKI
Basic
What kind of mathematical object does the composition operation apply to?
Back: Sets.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017251256-->
END%%
%%ANKI
Basic
What kind of mathematical object does the composition operation emit?
Back: Relations.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017251259-->
END%%
%%ANKI
Basic
Let $F$ and $G$ be arbitrary sets. How is the composition of $G$ and $F$ denoted?
Back: $G \circ F$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017251252-->
END%%
%%ANKI
Basic
Let $F$ and $G$ be arbitrary sets. How is the composition of $F$ and $G$ denoted?
Back: $F \circ G$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017251262-->
END%%
%%ANKI
Basic
What is the "arity" of the composition operation in set theory?
Back: $2$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017251265-->
END%%
%%ANKI
Cloze
{$(F \circ G)(x)$} is alternatively written as {$F(G(x))$}.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719017560120-->
END%%
%%ANKI
Basic
How is the composition of sets $F$ and $G$ defined in set-builder notation?
Back: $F \circ G = \{\langle u, v \rangle \mid \exists t, uGt \land tFv\}$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
Let $F$ and $A$ be arbitrary sets. The **restriction of $F$ to $A$** is the set $$F \restriction A = \{\langle u, v \rangle \mid uFv \land u \in A\}$$
%%ANKI
Basic
What kind of mathematical object does the restriction operation apply to?
Back: Sets.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644297-->
END%%
%%ANKI
Cloze
$F \restriction A$ is the restriction of $F$ {to} $A$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644298-->
END%%
%%ANKI
Basic
What kind of mathematical object does the restriction operation emit?
Back: Relations.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644299-->
END%%
%%ANKI
Basic
What is the "arity" of the restriction operation in set theory?
Back: $2$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644300-->
END%%
%%ANKI
Basic
How is the restriction of $F$ to $A$ denoted?
Back: $F \restriction A$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644301-->
END%%
%%ANKI
Basic
How is the restriction of $F$ to $A$ defined?
Back: $F \restriction A = \{\langle u, v \rangle \mid uFv \land u \in A\}$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644302-->
END%%
%%ANKI
Basic
Consider function $F \colon A \rightarrow B$. How does $\mathop{\text{dom}}F$ relate to $\mathop{\text{dom}}(F \restriction A)$?
Back: They are equal.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644303-->
END%%
%%ANKI
Basic
Consider function $F \colon A \rightarrow B$. How does $\mathop{\text{ran}}F$ relate to $\mathop{\text{ran}}(F \restriction A)$?
Back: They are equal.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644304-->
END%%
%%ANKI
Basic
Consider function $F \colon A \rightarrow B$ and set $C \subseteq A$. How does $\mathop{\text{dom}}F$ relate to $\mathop{\text{dom}}(F \restriction C)$?
Back: $\mathop{\text{dom}}(F \restriction C) \subseteq \mathop{\text{dom}}F$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644305-->
END%%
%%ANKI
Basic
How is $F \restriction A$ pronounced?
Back: The restriction of $F$ to $A$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644306-->
END%%
%%ANKI
Basic
Consider function $F \colon A \rightarrow B$ and set $C \subseteq A$. How does $\mathop{\text{ran}}F$ relate to $\mathop{\text{ran}}(F \restriction C)$?
Back: $\mathop{\text{ran}}(F \restriction C) \subseteq \mathop{\text{ran}}F$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644307-->
END%%
%%ANKI
Basic
How is set $\{\langle u, v \rangle \mid uAv \land u \in B\}$ more simply denoted?
Back: $A \restriction B$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1719103644308-->
END%%
%%ANKI
Basic
Let $F$ be an arbitrary set. What is $F \restriction \varnothing$?
Back: $\varnothing$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1720386023280-->
END%%
%%ANKI
Basic
The following is analagous to what logical expression of commuting quantifiers? $$F[\![A \cap B]\!] \subseteq F[\![A]\!] \cap F[\![B]\!]$$
Back: $\exists x, \forall y, P(x, y) \Rightarrow \forall y, \exists x, P(x, y)$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
<!--ID: 1720386023284-->
END%%
%%ANKI
Basic
Given single-rooted $R$, the following is analagous to what logical expression of commuting quantifiers? $$R[\![A \cap B]\!] = R[\![A]\!] \cap R[\![B]\!]$$
Back: $\exists x, \forall y, P(x, y) \Leftrightarrow \forall y, \exists x, P(x, y)$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
If $S$ is a function and $A$ is a subset of $\mathop{\text{dom}}S$, then $A$ is said to be **closed** under $S$ if and only if whenever $x \in A$, then $S(x) \in A$. This is equivalently expressed as $S[\![A]\!] \subseteq A$.
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Basic
Let $A$ be closed under $S$. Then $A$ is a subset of what other set?
Back: $\mathop{\text{dom}}S$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
Let $f$ be a function from $B$ into $B$ and assume $A \subseteq B$. There are two possible methods for constructing the **closure** $C$ of $A$ under $f$. The top-down approach defines $C^*$ to be the intersection of all closed supersets of $A$: $$C^* = \bigcap\, \{X \mid A \subseteq X \subseteq B \land f[\![X]\!] \subseteq X \}$$
The bottom-up approach defines $C_*$ to be $$C_* = \bigcup_{i \in \omega} h(i)$$
where $h \colon \omega \rightarrow \mathscr{P}(B)$ is recursively defined as: $$\begin{align*} h(0) & = A, \\ h(n^+) &= h(n) \cup f[\![h(n)]\!]. \end{align*}$$
Note that the [[natural-numbers#Recursion Theorem|recursion theorem]] proves $h$ is indeed a function.
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Basic
Let $f \colon B \rightarrow B$ and $A \subseteq B$. How is the top-down closure $C^*$ of $A$ under $f$ defined?
Back: $\bigcap\, \{ X \mid A \subseteq X \subseteq B \land f[\![X]\!] \subseteq X \}$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $f \colon B \rightarrow B$ and $A \subseteq B$. What is the smallest set the closure $C^*$ of $A$ under $f$ can be?
Back: $A$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $f \colon B \rightarrow B$ and $A \subseteq B$. What is the largest set the closure $C^*$ of $A$ under $f$ can be?
Back: $B$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $f \colon B \rightarrow B$ and $A \subseteq B$. How is the bottom-up closure $C_*$ of $A$ under $f$ defined assuming appropriate $h \colon \omega \rightarrow \mathscr{P}(B)$?
Back: $\bigcup \mathop{\text{ran}} h$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Basic
Let $f \colon B \rightarrow B$ and $A \subseteq B$. What is the smallest set the closure $C_*$ of $A$ under $f$ can be?
Back: $A$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $f \colon B \rightarrow B$ and $A \subseteq B$. What is the largest set the closure $C_*$ of $A$ under $f$ can be?
Back: $B$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. What kind of mathematical entity is $A$?
Back: A set.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. What kind of mathematical entity is $f$?
Back: A function.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. What kind of mathematical entity is $C$?
Back: A set.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. What two ways can $C$ be defined?
Back: Bottom-up or top-down.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. How is the top-down closure denoted?
Back: As $C^*$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. How is the bottom-up closure denoted?
Back: As $C_*$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C$ be the closure of $A$ under $f$. What is the "signature" of $f$?
Back: $f \colon B \rightarrow B$ for some $B \supseteq A$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C_*$ be the closure of $A$ under $f$ defined in terms of function $h$. What is $h$'s domain?
Back: $\omega$
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $C_*$ be the closure of $A$ under $f$ defined in terms of function $h$. What is $h$'s codomain?
Let $F \colon A \rightarrow B$. Define [[relations#Equivalence Relations|equivalence relation]] $\sim$ as $$x \sim y \Leftrightarrow f(x) = f(y)$$
Relation $\sim$ is called the **(equivalence) kernel** of $f$. The [[relations#Partitions|partition]] induced by $\sim$ on $A$ is called the **coimage** of $f$ (denoted $\mathop{\text{coim}}f$). The **fiber** of an element $y$ under $F$ is $F^{-1}[\![\{y\}]\!]$, i.e. the preimage of singleton set $\{y\}$. Therefore the equivalence classes of $\sim$ are also known as the fibers of $f$.
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What kind of mathematical object is the kernel of $F \colon A \rightarrow B$?
Back: An equivalence relation.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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How is the kernel of $F \colon A \rightarrow B$ defined?
Back: As equivalence relation $\sim$ such that $x \sim y \Leftrightarrow F(x) = F(y)$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $F \colon A \rightarrow B$. What name does the following relation $\sim$ go by? $$x \sim y \Leftrightarrow F(x) = F(y)$$
Back: The kernel of $F$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
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Let $F \colon A \rightarrow B$. The partition induced by the kernel of $F$ is a partition of what set?
Back: $A$.
Reference: Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
* “Bijection, Injection and Surjection,” in _Wikipedia_, May 2, 2024, [https://en.wikipedia.org/w/index.php?title=Bijection_injection_and_surjection](https://en.wikipedia.org/w/index.php?title=Bijection,_injection_and_surjection&oldid=1221800163).
* “Fiber (Mathematics),” in _Wikipedia_, April 10, 2024, [https://en.wikipedia.org/w/index.php?title=Fiber_(mathematics)&oldid=1218193490](https://en.wikipedia.org/w/index.php?title=Fiber_(mathematics)&oldid=1218193490).
* Herbert B. Enderton, *Elements of Set Theory* (New York: Academic Press, 1977).
* “Kernel (Set Theory),” in _Wikipedia_, May 22, 2024, [https://en.wikipedia.org/w/index.php?title=Kernel_(set_theory)&oldid=1225189560](https://en.wikipedia.org/w/index.php?title=Kernel_(set_theory)&oldid=1225189560).
* “Operation (Mathematics).” In _Wikipedia_, October 10, 2024. [https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)](https://en.wikipedia.org/w/index.php?title=Operation_(mathematics)&oldid=1250395938).