fsupprnfi

Description: Finite support implies finite range. (Contributed by Thierry Arnoux, 24-Jun-2024)

		Ref	Expression
	Assertion	fsupprnfi	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ran F e. Fin )

Proof

Step	Hyp	Ref	Expression
1		snfi	\|- { .0. } e. Fin
2		simpll	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> Fun F )
3		simplr	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> F e. V )
4		simprl	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> .0. e. W )
5		ressupprn	\|- ( ( Fun F /\ F e. V /\ .0. e. W ) -> ran ( F \|` ( F supp .0. ) ) = ( ran F \ { .0. } ) )
6	2 3 4 5	syl3anc	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ran ( F \|` ( F supp .0. ) ) = ( ran F \ { .0. } ) )
7		simprr	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> F finSupp .0. )
8	7	fsuppimpd	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ( F supp .0. ) e. Fin )
9		suppssdm	\|- ( F supp .0. ) C_ dom F
10		ssdmres	\|- ( ( F supp .0. ) C_ dom F <-> dom ( F \|` ( F supp .0. ) ) = ( F supp .0. ) )
11	9 10	mpbi	\|- dom ( F \|` ( F supp .0. ) ) = ( F supp .0. )
12	2	funresd	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> Fun ( F \|` ( F supp .0. ) ) )
13		funforn	\|- ( Fun ( F \|` ( F supp .0. ) ) <-> ( F \|` ( F supp .0. ) ) : dom ( F \|` ( F supp .0. ) ) -onto-> ran ( F \|` ( F supp .0. ) ) )
14	12 13	sylib	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ( F \|` ( F supp .0. ) ) : dom ( F \|` ( F supp .0. ) ) -onto-> ran ( F \|` ( F supp .0. ) ) )
15		foeq2	\|- ( dom ( F \|` ( F supp .0. ) ) = ( F supp .0. ) -> ( ( F \|` ( F supp .0. ) ) : dom ( F \|` ( F supp .0. ) ) -onto-> ran ( F \|` ( F supp .0. ) ) <-> ( F \|` ( F supp .0. ) ) : ( F supp .0. ) -onto-> ran ( F \|` ( F supp .0. ) ) ) )
16	15	biimpa	\|- ( ( dom ( F \|` ( F supp .0. ) ) = ( F supp .0. ) /\ ( F \|` ( F supp .0. ) ) : dom ( F \|` ( F supp .0. ) ) -onto-> ran ( F \|` ( F supp .0. ) ) ) -> ( F \|` ( F supp .0. ) ) : ( F supp .0. ) -onto-> ran ( F \|` ( F supp .0. ) ) )
17	11 14 16	sylancr	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ( F \|` ( F supp .0. ) ) : ( F supp .0. ) -onto-> ran ( F \|` ( F supp .0. ) ) )
18		fofi	\|- ( ( ( F supp .0. ) e. Fin /\ ( F \|` ( F supp .0. ) ) : ( F supp .0. ) -onto-> ran ( F \|` ( F supp .0. ) ) ) -> ran ( F \|` ( F supp .0. ) ) e. Fin )
19	8 17 18	syl2anc	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ran ( F \|` ( F supp .0. ) ) e. Fin )
20	6 19	eqeltrrd	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ( ran F \ { .0. } ) e. Fin )
21		diffib	\|- ( { .0. } e. Fin -> ( ran F e. Fin <-> ( ran F \ { .0. } ) e. Fin ) )
22	21	biimpar	\|- ( ( { .0. } e. Fin /\ ( ran F \ { .0. } ) e. Fin ) -> ran F e. Fin )
23	1 20 22	sylancr	\|- ( ( ( Fun F /\ F e. V ) /\ ( .0. e. W /\ F finSupp .0. ) ) -> ran F e. Fin )

Metamath Proof Explorer

Theorem fsupprnfi

Proof