fnlimfv

Description: The value of the limit function G at any point of its domain D . (Contributed by Glauco Siliprandi, 26-Jun-2021)

Step	Hyp	Ref	Expression
1		fnlimfv.1	\|- F/_ x D
2		fnlimfv.2	\|- F/_ x F
3		fnlimfv.3	\|- G = ( x e. D \|-> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` x ) ) ) )
4		fnlimfv.4	\|- ( ph -> X e. D )
5		nfcv	\|- F/_ y D
6		nfcv	\|- F/_ y ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` x ) ) )
7		nfcv	\|- F/_ x ~~>
8		nfcv	\|- F/_ x Z
9		nfcv	\|- F/_ x m
10	2 9	nffv	\|- F/_ x ( F ` m )
11		nfcv	\|- F/_ x y
12	10 11	nffv	\|- F/_ x ( ( F ` m ) ` y )
13	8 12	nfmpt	\|- F/_ x ( m e. Z \|-> ( ( F ` m ) ` y ) )
14	7 13	nffv	\|- F/_ x ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` y ) ) )
15		fveq2	\|- ( x = y -> ( ( F ` m ) ` x ) = ( ( F ` m ) ` y ) )
16	15	mpteq2dv	\|- ( x = y -> ( m e. Z \|-> ( ( F ` m ) ` x ) ) = ( m e. Z \|-> ( ( F ` m ) ` y ) ) )
17	16	fveq2d	\|- ( x = y -> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` x ) ) ) = ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` y ) ) ) )
18	1 5 6 14 17	cbvmptf	\|- ( x e. D \|-> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` x ) ) ) ) = ( y e. D \|-> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` y ) ) ) )
19	3 18	eqtri	\|- G = ( y e. D \|-> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` y ) ) ) )
20		fveq2	\|- ( y = X -> ( ( F ` m ) ` y ) = ( ( F ` m ) ` X ) )
21	20	mpteq2dv	\|- ( y = X -> ( m e. Z \|-> ( ( F ` m ) ` y ) ) = ( m e. Z \|-> ( ( F ` m ) ` X ) ) )
22	21	fveq2d	\|- ( y = X -> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` y ) ) ) = ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` X ) ) ) )
23		fvexd	\|- ( ph -> ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` X ) ) ) e. _V )
24	19 22 4 23	fvmptd3	\|- ( ph -> ( G ` X ) = ( ~~> ` ( m e. Z \|-> ( ( F ` m ) ` X ) ) ) )

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