fresf1o

Description: Conditions for a restriction to be a one-to-one onto function. (Contributed by Thierry Arnoux, 7-Dec-2016)

		Ref	Expression
	Assertion	fresf1o	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( F \|` ( `' F " C ) ) : ( `' F " C ) -1-1-onto-> C )

Proof

Step	Hyp	Ref	Expression
1		funfn	\|- ( Fun ( `' F \|` C ) <-> ( `' F \|` C ) Fn dom ( `' F \|` C ) )
2	1	biimpi	\|- ( Fun ( `' F \|` C ) -> ( `' F \|` C ) Fn dom ( `' F \|` C ) )
3	2	3ad2ant3	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( `' F \|` C ) Fn dom ( `' F \|` C ) )
4		simp2	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> C C_ ran F )
5		df-rn	\|- ran F = dom `' F
6	4 5	sseqtrdi	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> C C_ dom `' F )
7		ssdmres	\|- ( C C_ dom `' F <-> dom ( `' F \|` C ) = C )
8	6 7	sylib	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> dom ( `' F \|` C ) = C )
9	8	fneq2d	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( ( `' F \|` C ) Fn dom ( `' F \|` C ) <-> ( `' F \|` C ) Fn C ) )
10	3 9	mpbid	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( `' F \|` C ) Fn C )
11		simp1	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> Fun F )
12	11	funresd	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> Fun ( F \|` ( `' F " C ) ) )
13		funcnvres2	\|- ( Fun F -> `' ( `' F \|` C ) = ( F \|` ( `' F " C ) ) )
14	11 13	syl	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> `' ( `' F \|` C ) = ( F \|` ( `' F " C ) ) )
15	14	funeqd	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( Fun `' ( `' F \|` C ) <-> Fun ( F \|` ( `' F " C ) ) ) )
16	12 15	mpbird	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> Fun `' ( `' F \|` C ) )
17		df-ima	\|- ( `' F " C ) = ran ( `' F \|` C )
18	17	eqcomi	\|- ran ( `' F \|` C ) = ( `' F " C )
19	18	a1i	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ran ( `' F \|` C ) = ( `' F " C ) )
20		dff1o2	\|- ( ( `' F \|` C ) : C -1-1-onto-> ( `' F " C ) <-> ( ( `' F \|` C ) Fn C /\ Fun `' ( `' F \|` C ) /\ ran ( `' F \|` C ) = ( `' F " C ) ) )
21	10 16 19 20	syl3anbrc	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( `' F \|` C ) : C -1-1-onto-> ( `' F " C ) )
22		f1ocnv	\|- ( ( `' F \|` C ) : C -1-1-onto-> ( `' F " C ) -> `' ( `' F \|` C ) : ( `' F " C ) -1-1-onto-> C )
23	21 22	syl	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> `' ( `' F \|` C ) : ( `' F " C ) -1-1-onto-> C )
24		f1oeq1	\|- ( `' ( `' F \|` C ) = ( F \|` ( `' F " C ) ) -> ( `' ( `' F \|` C ) : ( `' F " C ) -1-1-onto-> C <-> ( F \|` ( `' F " C ) ) : ( `' F " C ) -1-1-onto-> C ) )
25	11 13 24	3syl	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( `' ( `' F \|` C ) : ( `' F " C ) -1-1-onto-> C <-> ( F \|` ( `' F " C ) ) : ( `' F " C ) -1-1-onto-> C ) )
26	23 25	mpbid	\|- ( ( Fun F /\ C C_ ran F /\ Fun ( `' F \|` C ) ) -> ( F \|` ( `' F " C ) ) : ( `' F " C ) -1-1-onto-> C )

Metamath Proof Explorer

Theorem fresf1o

Proof