neglimc

Description: Limit of the negative function. (Contributed by Glauco Siliprandi, 11-Dec-2019)

	Ref	Expression
Hypotheses	neglimc.f	\|- F = ( x e. A \|-> B )
	neglimc.g	\|- G = ( x e. A \|-> -u B )
	neglimc.b	\|- ( ( ph /\ x e. A ) -> B e. CC )
	neglimc.c	\|- ( ph -> C e. ( F limCC D ) )
Assertion	neglimc	\|- ( ph -> -u C e. ( G limCC D ) )

Proof

Step	Hyp	Ref	Expression
1		neglimc.f	\|- F = ( x e. A \|-> B )
2		neglimc.g	\|- G = ( x e. A \|-> -u B )
3		neglimc.b	\|- ( ( ph /\ x e. A ) -> B e. CC )
4		neglimc.c	\|- ( ph -> C e. ( F limCC D ) )
5		limccl	\|- ( F limCC D ) C_ CC
6	5 4	sselid	\|- ( ph -> C e. CC )
7	6	negcld	\|- ( ph -> -u C e. CC )
8	3 1	fmptd	\|- ( ph -> F : A --> CC )
9	1 3 4	limcmptdm	\|- ( ph -> A C_ CC )
10		limcrcl	\|- ( C e. ( F limCC D ) -> ( F : dom F --> CC /\ dom F C_ CC /\ D e. CC ) )
11	4 10	syl	\|- ( ph -> ( F : dom F --> CC /\ dom F C_ CC /\ D e. CC ) )
12	11	simp3d	\|- ( ph -> D e. CC )
13	8 9 12	ellimc3	\|- ( ph -> ( C e. ( F limCC D ) <-> ( C e. CC /\ A. y e. RR+ E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) ) ) )
14	4 13	mpbid	\|- ( ph -> ( C e. CC /\ A. y e. RR+ E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) ) )
15	14	simprd	\|- ( ph -> A. y e. RR+ E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) )
16	15	r19.21bi	\|- ( ( ph /\ y e. RR+ ) -> E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) )
17		simplll	\|- ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) -> ph )
18	17	3ad2ant1	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> ph )
19		simp1r	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> v e. A )
20		simp3	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> ( v =/= D /\ ( abs ` ( v - D ) ) < w ) )
21		simp2	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) )
22	20 21	mpd	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> ( abs ` ( ( F ` v ) - C ) ) < y )
23		nfv	\|- F/ x ( ph /\ v e. A )
24		nfmpt1	\|- F/_ x ( x e. A \|-> -u B )
25	2 24	nfcxfr	\|- F/_ x G
26		nfcv	\|- F/_ x v
27	25 26	nffv	\|- F/_ x ( G ` v )
28		nfmpt1	\|- F/_ x ( x e. A \|-> B )
29	1 28	nfcxfr	\|- F/_ x F
30	29 26	nffv	\|- F/_ x ( F ` v )
31	30	nfneg	\|- F/_ x -u ( F ` v )
32	27 31	nfeq	\|- F/ x ( G ` v ) = -u ( F ` v )
33	23 32	nfim	\|- F/ x ( ( ph /\ v e. A ) -> ( G ` v ) = -u ( F ` v ) )
34		eleq1w	\|- ( x = v -> ( x e. A <-> v e. A ) )
35	34	anbi2d	\|- ( x = v -> ( ( ph /\ x e. A ) <-> ( ph /\ v e. A ) ) )
36		fveq2	\|- ( x = v -> ( G ` x ) = ( G ` v ) )
37		fveq2	\|- ( x = v -> ( F ` x ) = ( F ` v ) )
38	37	negeqd	\|- ( x = v -> -u ( F ` x ) = -u ( F ` v ) )
39	36 38	eqeq12d	\|- ( x = v -> ( ( G ` x ) = -u ( F ` x ) <-> ( G ` v ) = -u ( F ` v ) ) )
40	35 39	imbi12d	\|- ( x = v -> ( ( ( ph /\ x e. A ) -> ( G ` x ) = -u ( F ` x ) ) <-> ( ( ph /\ v e. A ) -> ( G ` v ) = -u ( F ` v ) ) ) )
41		simpr	\|- ( ( ph /\ x e. A ) -> x e. A )
42	3	negcld	\|- ( ( ph /\ x e. A ) -> -u B e. CC )
43	2	fvmpt2	\|- ( ( x e. A /\ -u B e. CC ) -> ( G ` x ) = -u B )
44	41 42 43	syl2anc	\|- ( ( ph /\ x e. A ) -> ( G ` x ) = -u B )
45	1	fvmpt2	\|- ( ( x e. A /\ B e. CC ) -> ( F ` x ) = B )
46	41 3 45	syl2anc	\|- ( ( ph /\ x e. A ) -> ( F ` x ) = B )
47	46	negeqd	\|- ( ( ph /\ x e. A ) -> -u ( F ` x ) = -u B )
48	44 47	eqtr4d	\|- ( ( ph /\ x e. A ) -> ( G ` x ) = -u ( F ` x ) )
49	33 40 48	chvarfv	\|- ( ( ph /\ v e. A ) -> ( G ` v ) = -u ( F ` v ) )
50	49	oveq1d	\|- ( ( ph /\ v e. A ) -> ( ( G ` v ) - -u C ) = ( -u ( F ` v ) - -u C ) )
51	8	ffvelcdmda	\|- ( ( ph /\ v e. A ) -> ( F ` v ) e. CC )
52	6	adantr	\|- ( ( ph /\ v e. A ) -> C e. CC )
53	51 52	negsubdi3d	\|- ( ( ph /\ v e. A ) -> -u ( ( F ` v ) - C ) = ( -u ( F ` v ) - -u C ) )
54	50 53	eqtr4d	\|- ( ( ph /\ v e. A ) -> ( ( G ` v ) - -u C ) = -u ( ( F ` v ) - C ) )
55	54	fveq2d	\|- ( ( ph /\ v e. A ) -> ( abs ` ( ( G ` v ) - -u C ) ) = ( abs ` -u ( ( F ` v ) - C ) ) )
56	51 52	subcld	\|- ( ( ph /\ v e. A ) -> ( ( F ` v ) - C ) e. CC )
57	56	absnegd	\|- ( ( ph /\ v e. A ) -> ( abs ` -u ( ( F ` v ) - C ) ) = ( abs ` ( ( F ` v ) - C ) ) )
58	55 57	eqtrd	\|- ( ( ph /\ v e. A ) -> ( abs ` ( ( G ` v ) - -u C ) ) = ( abs ` ( ( F ` v ) - C ) ) )
59	58	adantr	\|- ( ( ( ph /\ v e. A ) /\ ( abs ` ( ( F ` v ) - C ) ) < y ) -> ( abs ` ( ( G ` v ) - -u C ) ) = ( abs ` ( ( F ` v ) - C ) ) )
60		simpr	\|- ( ( ( ph /\ v e. A ) /\ ( abs ` ( ( F ` v ) - C ) ) < y ) -> ( abs ` ( ( F ` v ) - C ) ) < y )
61	59 60	eqbrtrd	\|- ( ( ( ph /\ v e. A ) /\ ( abs ` ( ( F ` v ) - C ) ) < y ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y )
62	18 19 22 61	syl21anc	\|- ( ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) /\ ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) /\ ( v =/= D /\ ( abs ` ( v - D ) ) < w ) ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y )
63	62	3exp	\|- ( ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) /\ v e. A ) -> ( ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) -> ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) ) )
64	63	ralimdva	\|- ( ( ( ph /\ y e. RR+ ) /\ w e. RR+ ) -> ( A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) -> A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) ) )
65	64	reximdva	\|- ( ( ph /\ y e. RR+ ) -> ( E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( F ` v ) - C ) ) < y ) -> E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) ) )
66	16 65	mpd	\|- ( ( ph /\ y e. RR+ ) -> E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) )
67	66	ralrimiva	\|- ( ph -> A. y e. RR+ E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) )
68	42 2	fmptd	\|- ( ph -> G : A --> CC )
69	68 9 12	ellimc3	\|- ( ph -> ( -u C e. ( G limCC D ) <-> ( -u C e. CC /\ A. y e. RR+ E. w e. RR+ A. v e. A ( ( v =/= D /\ ( abs ` ( v - D ) ) < w ) -> ( abs ` ( ( G ` v ) - -u C ) ) < y ) ) ) )
70	7 67 69	mpbir2and	\|- ( ph -> -u C e. ( G limCC D ) )

Metamath Proof Explorer

Theorem neglimc

Proof