Database BASIC CATEGORY THEORY Categories Initial, terminal and zero objects of a category df-termo
Description: An object A is called a terminal object provided that for each object B
there is exactly one morphism from B to A. Definition 7.4 in Adamek
p. 102, or definition in Lang p. 57 (called "a universally attracting
object" there). (Contributed by AV , 3-Apr-2020)
Ref
Expression
Assertion
df-termo ⊢ TermO = c ∈ Cat ⟼ a ∈ Base c | ∀ b ∈ Base c ∃! h h ∈ b Hom c a
Detailed syntax breakdown
Step
Hyp
Ref
Expression
0
ctermo class TermO
1
vc setvar c
2
ccat class Cat
3
va setvar a
4
cbs class Base
5
1
cv setvar c
6
5 4
cfv class Base c
7
vb setvar b
8
vh setvar h
9
8
cv setvar h
10
7
cv setvar b
11
chom class Hom
12
5 11
cfv class Hom c
13
3
cv setvar a
14
10 13 12
co class b Hom c a
15
9 14
wcel wff h ∈ b Hom c a
16
15 8
weu wff ∃! h h ∈ b Hom c a
17
16 7 6
wral wff ∀ b ∈ Base c ∃! h h ∈ b Hom c a
18
17 3 6
crab class a ∈ Base c | ∀ b ∈ Base c ∃! h h ∈ b Hom c a
19
1 2 18
cmpt class c ∈ Cat ⟼ a ∈ Base c | ∀ b ∈ Base c ∃! h h ∈ b Hom c a
20
0 19
wceq wff TermO = c ∈ Cat ⟼ a ∈ Base c | ∀ b ∈ Base c ∃! h h ∈ b Hom c a