df-up

Given categories D and E , if F : D --> E is a functor and W an object of E , a universal pair from W to F is a pair <. X , M >. consisting of an object X of D and a morphism M : W --> F X of E , such that to every pair <. y , g >. with y an object of D and g : W --> F y a morphism of E , there is a unique morphism k : X --> y of D with F k .o. M = g . Such property is commonly referred to as a universal property. In our definition, it is denoted as X ( F ( D UP E ) W ) M .

Note that the universal pair is termed differently as "universal arrow" in p. 55 of Mac Lane, Saunders,Categories for the Working Mathematician, 2nd Edition, Springer Science+Business Media, New York, (1998) [QA169.M33 1998]; available at https://math.mit.edu/~hrm/palestine/maclane-categories.pdf (retrieved 6 Oct 2025). Interestingly, the "universal arrow" is referring to the morphism M instead of the pair near the end of the same piece of the text, causing name collision. The name "universal arrow" is also adopted in papers such as https://arxiv.org/pdf/2212.08981 . Alternatively, the universal pair is called the "universal morphism" in Wikipedia ( https://en.wikipedia.org/wiki/Universal_property ) as well as published works, e.g., https://arxiv.org/pdf/2412.12179 . But the pair <. X , M >. should be named differently as the morphism M , and thus we call X theuniversal object, M theuniversal morphism, and <. X , M >. theuniversal pair.

Given its existence, such universal pair is essentially unique ( upeu3 ), and can be generated from an existing universal pair by isomorphisms ( upeu4 ). See also oppcup for the dual concept.

		Ref	Expression
	Assertion	df-up	Could not format assertion : No typesetting found for \|- UP = ( d e. _V , e e. _V \|-> [_ ( Base ` d ) / b ]_ [_ ( Base ` e ) / c ]_ [_ ( Hom ` d ) / h ]_ [_ ( Hom ` e ) / j ]_ [_ ( comp ` e ) / o ]_ ( f e. ( d Func e ) , w e. c \|-> { <. x , m >. \| ( ( x e. b /\ m e. ( w j ( ( 1st ` f ) ` x ) ) ) /\ A. y e. b A. g e. ( w j ( ( 1st ` f ) ` y ) ) E! k e. ( x h y ) g = ( ( ( x ( 2nd ` f ) y ) ` k ) ( <. w , ( ( 1st ` f ) ` x ) >. o ( ( 1st ` f ) ` y ) ) m ) ) } ) ) with typecode \|-

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cup	Could not format UP : No typesetting found for class UP with typecode class
1		vd	$setvar d$
2		cvv	$class V$
3		ve	$setvar e$
4		cbs	$class Base$
5	1	cv	$setvar d$
6	5 4	cfv	$class {Base}_{d}$
7		vb	$setvar b$
8	3	cv	$setvar e$
9	8 4	cfv	$class {Base}_{e}$
10		vc	$setvar c$
11		chom	$class Hom$
12	5 11	cfv	$class Hom (d)$
13		vh	$setvar h$
14	8 11	cfv	$class Hom (e)$
15		vj	$setvar j$
16		cco	$class comp$
17	8 16	cfv	$class comp (e)$
18		vo	$setvar o$
19		vf	$setvar f$
20		cfunc	$class Func$
21	5 8 20	co	$class (d Func e)$
22		vw	$setvar w$
23	10	cv	$setvar c$
24		vx	$setvar x$
25		vm	$setvar m$
26	24	cv	$setvar x$
27	7	cv	$setvar b$
28	26 27	wcel	$wff x \in b$
29	25	cv	$setvar m$
30	22	cv	$setvar w$
31	15	cv	$setvar j$
32		c1st	$class 1^{st}$
33	19	cv	$setvar f$
34	33 32	cfv	$class 1^{st} (f)$
35	26 34	cfv	$class 1^{st} (f) (x)$
36	30 35 31	co	$class (w j 1^{st} (f) (x))$
37	29 36	wcel	$wff m \in (w j 1^{st} (f) (x))$
38	28 37	wa	$wff (x \in b \land m \in (w j 1^{st} (f) (x)))$
39		vy	$setvar y$
40		vg	$setvar g$
41	39	cv	$setvar y$
42	41 34	cfv	$class 1^{st} (f) (y)$
43	30 42 31	co	$class (w j 1^{st} (f) (y))$
44		vk	$setvar k$
45	13	cv	$setvar h$
46	26 41 45	co	$class (x h y)$
47	40	cv	$setvar g$
48		c2nd	$class 2^{nd}$
49	33 48	cfv	$class 2^{nd} (f)$
50	26 41 49	co	$class (x 2^{nd} (f) y)$
51	44	cv	$setvar k$
52	51 50	cfv	$class (x 2^{nd} (f) y) (k)$
53	30 35	cop	$class ⟨w, 1^{st} (f) (x)⟩$
54	18	cv	$setvar o$
55	53 42 54	co	$class (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y))$
56	52 29 55	co	$class ((x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)$
57	47 56	wceq	$wff g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m$
58	57 44 46	wreu	$wff \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m$
59	58 40 43	wral	$wff \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m$
60	59 39 27	wral	$wff \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m$
61	38 60	wa	$wff ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)$
62	61 24 25	copab	$class \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\}$
63	19 22 21 23 62	cmpo	$class (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
64	18 17 63	csb	$class ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
65	15 14 64	csb	$class ⦋ Hom (e) / j ⦌ ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
66	13 12 65	csb	$class ⦋ Hom (d) / h ⦌ ⦋ Hom (e) / j ⦌ ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
67	10 9 66	csb	$class ⦋ {Base}_{e} / c ⦌ ⦋ Hom (d) / h ⦌ ⦋ Hom (e) / j ⦌ ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
68	7 6 67	csb	$class ⦋ {Base}_{d} / b ⦌ ⦋ {Base}_{e} / c ⦌ ⦋ Hom (d) / h ⦌ ⦋ Hom (e) / j ⦌ ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\})$
69	1 3 2 2 68	cmpo	$class (d \in V, e \in V ⟼ ⦋ {Base}_{d} / b ⦌ ⦋ {Base}_{e} / c ⦌ ⦋ Hom (d) / h ⦌ ⦋ Hom (e) / j ⦌ ⦋ comp (e) / o ⦌ (f \in (d Func e), w \in c ⟼ \{⟨x, m⟩ \| ((x \in b \land m \in (w j 1^{st} (f) (x))) \land \forall y \in b \forall g \in (w j 1^{st} (f) (y)) \exists! k \in (x h y) g = (x 2^{nd} (f) y) (k) (⟨w, 1^{st} (f) (x)⟩ o 1^{st} (f) (y)) m)\}))$
70	0 69	wceq	Could not format UP = ( d e. _V , e e. _V \|-> [_ ( Base ` d ) / b ]_ [_ ( Base ` e ) / c ]_ [_ ( Hom ` d ) / h ]_ [_ ( Hom ` e ) / j ]_ [_ ( comp ` e ) / o ]_ ( f e. ( d Func e ) , w e. c \|-> { <. x , m >. \| ( ( x e. b /\ m e. ( w j ( ( 1st ` f ) ` x ) ) ) /\ A. y e. b A. g e. ( w j ( ( 1st ` f ) ` y ) ) E! k e. ( x h y ) g = ( ( ( x ( 2nd ` f ) y ) ` k ) ( <. w , ( ( 1st ` f ) ` x ) >. o ( ( 1st ` f ) ` y ) ) m ) ) } ) ) : No typesetting found for wff UP = ( d e. _V , e e. _V \|-> [_ ( Base ` d ) / b ]_ [_ ( Base ` e ) / c ]_ [_ ( Hom ` d ) / h ]_ [_ ( Hom ` e ) / j ]_ [_ ( comp ` e ) / o ]_ ( f e. ( d Func e ) , w e. c \|-> { <. x , m >. \| ( ( x e. b /\ m e. ( w j ( ( 1st ` f ) ` x ) ) ) /\ A. y e. b A. g e. ( w j ( ( 1st ` f ) ` y ) ) E! k e. ( x h y ) g = ( ( ( x ( 2nd ` f ) y ) ` k ) ( <. w , ( ( 1st ` f ) ` x ) >. o ( ( 1st ` f ) ` y ) ) m ) ) } ) ) with typecode wff

Metamath Proof Explorer

Definition df-up

Detailed syntax breakdown