relop

Description: A necessary and sufficient condition for a Kuratowski ordered pair to be a relation. (Contributed by NM, 3-Jun-2008) A relation is a class of ordered pairs, so the fact that an ordered pair may sometimes be itself a relation is an "accident" depending on the specific encoding of ordered pairs as classes (in set.mm, the Kuratowski encoding). A more meaningful statement is relsnopg , as funsng is to funop . (New usage is discouraged.)

	Ref	Expression
Hypotheses	relop.1	\|- A e. _V
	relop.2	\|- B e. _V
Assertion	relop	\|- ( Rel <. A , B >. <-> E. x E. y ( A = { x } /\ B = { x , y } ) )

Proof

Step	Hyp	Ref	Expression
1		relop.1	\|- A e. _V
2		relop.2	\|- B e. _V
3		df-rel	\|- ( Rel <. A , B >. <-> <. A , B >. C_ ( _V X. _V ) )
4		df-ss	\|- ( <. A , B >. C_ ( _V X. _V ) <-> A. z ( z e. <. A , B >. -> z e. ( _V X. _V ) ) )
5	1 2	elop	\|- ( z e. <. A , B >. <-> ( z = { A } \/ z = { A , B } ) )
6		elvv	\|- ( z e. ( _V X. _V ) <-> E. x E. y z = <. x , y >. )
7	5 6	imbi12i	\|- ( ( z e. <. A , B >. -> z e. ( _V X. _V ) ) <-> ( ( z = { A } \/ z = { A , B } ) -> E. x E. y z = <. x , y >. ) )
8		jaob	\|- ( ( ( z = { A } \/ z = { A , B } ) -> E. x E. y z = <. x , y >. ) <-> ( ( z = { A } -> E. x E. y z = <. x , y >. ) /\ ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
9	7 8	bitri	\|- ( ( z e. <. A , B >. -> z e. ( _V X. _V ) ) <-> ( ( z = { A } -> E. x E. y z = <. x , y >. ) /\ ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
10	9	albii	\|- ( A. z ( z e. <. A , B >. -> z e. ( _V X. _V ) ) <-> A. z ( ( z = { A } -> E. x E. y z = <. x , y >. ) /\ ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
11		19.26	\|- ( A. z ( ( z = { A } -> E. x E. y z = <. x , y >. ) /\ ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) <-> ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) /\ A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
12	10 11	bitri	\|- ( A. z ( z e. <. A , B >. -> z e. ( _V X. _V ) ) <-> ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) /\ A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
13	4 12	bitri	\|- ( <. A , B >. C_ ( _V X. _V ) <-> ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) /\ A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) )
14		snex	\|- { A } e. _V
15		eqeq1	\|- ( z = { A } -> ( z = { A } <-> { A } = { A } ) )
16		eqeq1	\|- ( z = { A } -> ( z = <. x , y >. <-> { A } = <. x , y >. ) )
17		eqcom	\|- ( { A } = <. x , y >. <-> <. x , y >. = { A } )
18		vex	\|- x e. _V
19		vex	\|- y e. _V
20	18 19	opeqsn	\|- ( <. x , y >. = { A } <-> ( x = y /\ A = { x } ) )
21	17 20	bitri	\|- ( { A } = <. x , y >. <-> ( x = y /\ A = { x } ) )
22	16 21	bitrdi	\|- ( z = { A } -> ( z = <. x , y >. <-> ( x = y /\ A = { x } ) ) )
23	22	2exbidv	\|- ( z = { A } -> ( E. x E. y z = <. x , y >. <-> E. x E. y ( x = y /\ A = { x } ) ) )
24	15 23	imbi12d	\|- ( z = { A } -> ( ( z = { A } -> E. x E. y z = <. x , y >. ) <-> ( { A } = { A } -> E. x E. y ( x = y /\ A = { x } ) ) ) )
25	14 24	spcv	\|- ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) -> ( { A } = { A } -> E. x E. y ( x = y /\ A = { x } ) ) )
26		sneq	\|- ( w = x -> { w } = { x } )
27	26	eqeq2d	\|- ( w = x -> ( A = { w } <-> A = { x } ) )
28	27	cbvexvw	\|- ( E. w A = { w } <-> E. x A = { x } )
29		ax6evr	\|- E. y x = y
30		19.41v	\|- ( E. y ( x = y /\ A = { x } ) <-> ( E. y x = y /\ A = { x } ) )
31	29 30	mpbiran	\|- ( E. y ( x = y /\ A = { x } ) <-> A = { x } )
32	31	exbii	\|- ( E. x E. y ( x = y /\ A = { x } ) <-> E. x A = { x } )
33		eqid	\|- { A } = { A }
34	33	a1bi	\|- ( E. x E. y ( x = y /\ A = { x } ) <-> ( { A } = { A } -> E. x E. y ( x = y /\ A = { x } ) ) )
35	28 32 34	3bitr2ri	\|- ( ( { A } = { A } -> E. x E. y ( x = y /\ A = { x } ) ) <-> E. w A = { w } )
36	25 35	sylib	\|- ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) -> E. w A = { w } )
37		eqid	\|- { A , B } = { A , B }
38		prex	\|- { A , B } e. _V
39		eqeq1	\|- ( z = { A , B } -> ( z = { A , B } <-> { A , B } = { A , B } ) )
40		eqeq1	\|- ( z = { A , B } -> ( z = <. x , y >. <-> { A , B } = <. x , y >. ) )
41	40	2exbidv	\|- ( z = { A , B } -> ( E. x E. y z = <. x , y >. <-> E. x E. y { A , B } = <. x , y >. ) )
42	39 41	imbi12d	\|- ( z = { A , B } -> ( ( z = { A , B } -> E. x E. y z = <. x , y >. ) <-> ( { A , B } = { A , B } -> E. x E. y { A , B } = <. x , y >. ) ) )
43	38 42	spcv	\|- ( A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) -> ( { A , B } = { A , B } -> E. x E. y { A , B } = <. x , y >. ) )
44	37 43	mpi	\|- ( A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) -> E. x E. y { A , B } = <. x , y >. )
45		eqcom	\|- ( { A , B } = <. x , y >. <-> <. x , y >. = { A , B } )
46	18 19 1 2	opeqpr	\|- ( <. x , y >. = { A , B } <-> ( ( A = { x } /\ B = { x , y } ) \/ ( A = { x , y } /\ B = { x } ) ) )
47	45 46	bitri	\|- ( { A , B } = <. x , y >. <-> ( ( A = { x } /\ B = { x , y } ) \/ ( A = { x , y } /\ B = { x } ) ) )
48		idd	\|- ( A = { w } -> ( ( A = { x } /\ B = { x , y } ) -> ( A = { x } /\ B = { x , y } ) ) )
49		eqtr2	\|- ( ( A = { x , y } /\ A = { w } ) -> { x , y } = { w } )
50	18 19	preqsn	\|- ( { x , y } = { w } <-> ( x = y /\ y = w ) )
51	50	simplbi	\|- ( { x , y } = { w } -> x = y )
52	49 51	syl	\|- ( ( A = { x , y } /\ A = { w } ) -> x = y )
53		dfsn2	\|- { x } = { x , x }
54		preq2	\|- ( x = y -> { x , x } = { x , y } )
55	53 54	eqtr2id	\|- ( x = y -> { x , y } = { x } )
56	55	eqeq2d	\|- ( x = y -> ( A = { x , y } <-> A = { x } ) )
57	53 54	eqtrid	\|- ( x = y -> { x } = { x , y } )
58	57	eqeq2d	\|- ( x = y -> ( B = { x } <-> B = { x , y } ) )
59	56 58	anbi12d	\|- ( x = y -> ( ( A = { x , y } /\ B = { x } ) <-> ( A = { x } /\ B = { x , y } ) ) )
60	59	biimpd	\|- ( x = y -> ( ( A = { x , y } /\ B = { x } ) -> ( A = { x } /\ B = { x , y } ) ) )
61	60	expd	\|- ( x = y -> ( A = { x , y } -> ( B = { x } -> ( A = { x } /\ B = { x , y } ) ) ) )
62	61	com12	\|- ( A = { x , y } -> ( x = y -> ( B = { x } -> ( A = { x } /\ B = { x , y } ) ) ) )
63	62	adantr	\|- ( ( A = { x , y } /\ A = { w } ) -> ( x = y -> ( B = { x } -> ( A = { x } /\ B = { x , y } ) ) ) )
64	52 63	mpd	\|- ( ( A = { x , y } /\ A = { w } ) -> ( B = { x } -> ( A = { x } /\ B = { x , y } ) ) )
65	64	expcom	\|- ( A = { w } -> ( A = { x , y } -> ( B = { x } -> ( A = { x } /\ B = { x , y } ) ) ) )
66	65	impd	\|- ( A = { w } -> ( ( A = { x , y } /\ B = { x } ) -> ( A = { x } /\ B = { x , y } ) ) )
67	48 66	jaod	\|- ( A = { w } -> ( ( ( A = { x } /\ B = { x , y } ) \/ ( A = { x , y } /\ B = { x } ) ) -> ( A = { x } /\ B = { x , y } ) ) )
68	47 67	biimtrid	\|- ( A = { w } -> ( { A , B } = <. x , y >. -> ( A = { x } /\ B = { x , y } ) ) )
69	68	2eximdv	\|- ( A = { w } -> ( E. x E. y { A , B } = <. x , y >. -> E. x E. y ( A = { x } /\ B = { x , y } ) ) )
70	69	exlimiv	\|- ( E. w A = { w } -> ( E. x E. y { A , B } = <. x , y >. -> E. x E. y ( A = { x } /\ B = { x , y } ) ) )
71	70	imp	\|- ( ( E. w A = { w } /\ E. x E. y { A , B } = <. x , y >. ) -> E. x E. y ( A = { x } /\ B = { x , y } ) )
72	36 44 71	syl2an	\|- ( ( A. z ( z = { A } -> E. x E. y z = <. x , y >. ) /\ A. z ( z = { A , B } -> E. x E. y z = <. x , y >. ) ) -> E. x E. y ( A = { x } /\ B = { x , y } ) )
73	13 72	sylbi	\|- ( <. A , B >. C_ ( _V X. _V ) -> E. x E. y ( A = { x } /\ B = { x , y } ) )
74		simpr	\|- ( ( A = { x } /\ z = { A } ) -> z = { A } )
75		equid	\|- x = x
76	75	jctl	\|- ( A = { x } -> ( x = x /\ A = { x } ) )
77	18 18	opeqsn	\|- ( <. x , x >. = { A } <-> ( x = x /\ A = { x } ) )
78	76 77	sylibr	\|- ( A = { x } -> <. x , x >. = { A } )
79	78	adantr	\|- ( ( A = { x } /\ z = { A } ) -> <. x , x >. = { A } )
80	74 79	eqtr4d	\|- ( ( A = { x } /\ z = { A } ) -> z = <. x , x >. )
81		opeq12	\|- ( ( w = x /\ v = x ) -> <. w , v >. = <. x , x >. )
82	81	eqeq2d	\|- ( ( w = x /\ v = x ) -> ( z = <. w , v >. <-> z = <. x , x >. ) )
83	18 18 82	spc2ev	\|- ( z = <. x , x >. -> E. w E. v z = <. w , v >. )
84	80 83	syl	\|- ( ( A = { x } /\ z = { A } ) -> E. w E. v z = <. w , v >. )
85	84	adantlr	\|- ( ( ( A = { x } /\ B = { x , y } ) /\ z = { A } ) -> E. w E. v z = <. w , v >. )
86		preq12	\|- ( ( A = { x } /\ B = { x , y } ) -> { A , B } = { { x } , { x , y } } )
87	86	eqeq2d	\|- ( ( A = { x } /\ B = { x , y } ) -> ( z = { A , B } <-> z = { { x } , { x , y } } ) )
88	87	biimpa	\|- ( ( ( A = { x } /\ B = { x , y } ) /\ z = { A , B } ) -> z = { { x } , { x , y } } )
89	18 19	dfop	\|- <. x , y >. = { { x } , { x , y } }
90	88 89	eqtr4di	\|- ( ( ( A = { x } /\ B = { x , y } ) /\ z = { A , B } ) -> z = <. x , y >. )
91		opeq12	\|- ( ( w = x /\ v = y ) -> <. w , v >. = <. x , y >. )
92	91	eqeq2d	\|- ( ( w = x /\ v = y ) -> ( z = <. w , v >. <-> z = <. x , y >. ) )
93	18 19 92	spc2ev	\|- ( z = <. x , y >. -> E. w E. v z = <. w , v >. )
94	90 93	syl	\|- ( ( ( A = { x } /\ B = { x , y } ) /\ z = { A , B } ) -> E. w E. v z = <. w , v >. )
95	85 94	jaodan	\|- ( ( ( A = { x } /\ B = { x , y } ) /\ ( z = { A } \/ z = { A , B } ) ) -> E. w E. v z = <. w , v >. )
96	95	ex	\|- ( ( A = { x } /\ B = { x , y } ) -> ( ( z = { A } \/ z = { A , B } ) -> E. w E. v z = <. w , v >. ) )
97		elvv	\|- ( z e. ( _V X. _V ) <-> E. w E. v z = <. w , v >. )
98	96 5 97	3imtr4g	\|- ( ( A = { x } /\ B = { x , y } ) -> ( z e. <. A , B >. -> z e. ( _V X. _V ) ) )
99	98	ssrdv	\|- ( ( A = { x } /\ B = { x , y } ) -> <. A , B >. C_ ( _V X. _V ) )
100	99	exlimivv	\|- ( E. x E. y ( A = { x } /\ B = { x , y } ) -> <. A , B >. C_ ( _V X. _V ) )
101	73 100	impbii	\|- ( <. A , B >. C_ ( _V X. _V ) <-> E. x E. y ( A = { x } /\ B = { x , y } ) )
102	3 101	bitri	\|- ( Rel <. A , B >. <-> E. x E. y ( A = { x } /\ B = { x , y } ) )

Metamath Proof Explorer

Theorem relop

Proof