Metamath Proof Explorer

Theorem fsuppsssupp

Description: If the support of a function is a subset of the support of a finitely supported function, the function is finitely supported. (Contributed by AV, 2-Jul-2019) (Proof shortened by AV, 15-Jul-2019)

		Ref	Expression
	Assertion	fsuppsssupp	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> G finSupp Z )

Proof

Step	Hyp	Ref	Expression
1		simpll	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> G e. V )
2		simplr	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> Fun G )
3		relfsupp	\|- Rel finSupp
4	3	brrelex2i	\|- ( F finSupp Z -> Z e. _V )
5	4	ad2antrl	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> Z e. _V )
6		id	\|- ( F finSupp Z -> F finSupp Z )
7	6	fsuppimpd	\|- ( F finSupp Z -> ( F supp Z ) e. Fin )
8	7	anim1i	\|- ( ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) -> ( ( F supp Z ) e. Fin /\ ( G supp Z ) C_ ( F supp Z ) ) )
9	8	adantl	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> ( ( F supp Z ) e. Fin /\ ( G supp Z ) C_ ( F supp Z ) ) )
10		suppssfifsupp	\|- ( ( ( G e. V /\ Fun G /\ Z e. _V ) /\ ( ( F supp Z ) e. Fin /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> G finSupp Z )
11	1 2 5 9 10	syl31anc	\|- ( ( ( G e. V /\ Fun G ) /\ ( F finSupp Z /\ ( G supp Z ) C_ ( F supp Z ) ) ) -> G finSupp Z )