islmib

Description: Property of the line mirror. (Contributed by Thierry Arnoux, 11-Dec-2019)

	Ref	Expression
Hypotheses	ismid.p	$⊢ P = {Base}_{G}$
	ismid.d	$⊢ \underset{˙}{-} = dist (G)$
	ismid.i	$⊢ I = Itv (G)$
	ismid.g	$⊢ φ \to G \in 𝒢_{Tarski}$
	ismid.1	$⊢ φ \to G {Dim}_{𝒢} \geq 2$
	lmif.m	$⊢ M = {lInv}_{𝒢} (G) (D)$
	lmif.l	$⊢ L = {Line}_{𝒢} (G)$
	lmif.d	$⊢ φ \to D \in ran L$
	lmicl.1	$⊢ φ \to A \in P$
	islmib.b	$⊢ φ \to B \in P$
Assertion	islmib	$⊢ φ \to (B = M (A) \leftrightarrow (A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)))$

Proof

Step	Hyp	Ref	Expression
1		ismid.p	$⊢ P = {Base}_{G}$
2		ismid.d	$⊢ \underset{˙}{-} = dist (G)$
3		ismid.i	$⊢ I = Itv (G)$
4		ismid.g	$⊢ φ \to G \in 𝒢_{Tarski}$
5		ismid.1	$⊢ φ \to G {Dim}_{𝒢} \geq 2$
6		lmif.m	$⊢ M = {lInv}_{𝒢} (G) (D)$
7		lmif.l	$⊢ L = {Line}_{𝒢} (G)$
8		lmif.d	$⊢ φ \to D \in ran L$
9		lmicl.1	$⊢ φ \to A \in P$
10		islmib.b	$⊢ φ \to B \in P$
11		df-lmi	$⊢ {lInv}_{𝒢} = (g \in V ⟼ (d \in ran {Line}_{𝒢} (g) ⟼ (a \in {Base}_{g} ⟼ (ι b \in {Base}_{g} \| (a {mid}_{𝒢} (g) b \in d \land (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b))))))$
12		fveq2	$⊢ g = G \to {Line}_{𝒢} (g) = {Line}_{𝒢} (G)$
13	12 7	eqtr4di	$⊢ g = G \to {Line}_{𝒢} (g) = L$
14	13	rneqd	$⊢ g = G \to ran {Line}_{𝒢} (g) = ran L$
15		fveq2	$⊢ g = G \to {Base}_{g} = {Base}_{G}$
16	15 1	eqtr4di	$⊢ g = G \to {Base}_{g} = P$
17		fveq2	$⊢ g = G \to {mid}_{𝒢} (g) = {mid}_{𝒢} (G)$
18	17	oveqd	$⊢ g = G \to a {mid}_{𝒢} (g) b = a {mid}_{𝒢} (G) b$
19	18	eleq1d	$⊢ g = G \to (a {mid}_{𝒢} (g) b \in d \leftrightarrow a {mid}_{𝒢} (G) b \in d)$
20		eqidd	$⊢ g = G \to d = d$
21		fveq2	$⊢ g = G \to ⟂_{𝒢} (g) = ⟂_{𝒢} (G)$
22	13	oveqd	$⊢ g = G \to a {Line}_{𝒢} (g) b = a L b$
23	20 21 22	breq123d	$⊢ g = G \to (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \leftrightarrow d ⟂_{𝒢} (G) (a L b))$
24	23	orbi1d	$⊢ g = G \to ((d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b) \leftrightarrow (d ⟂_{𝒢} (G) (a L b) \lor a = b))$
25	19 24	anbi12d	$⊢ g = G \to ((a {mid}_{𝒢} (g) b \in d \land (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b)) \leftrightarrow (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))$
26	16 25	riotaeqbidv	$⊢ g = G \to (ι b \in {Base}_{g} \| (a {mid}_{𝒢} (g) b \in d \land (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b))) = (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))$
27	16 26	mpteq12dv	$⊢ g = G \to (a \in {Base}_{g} ⟼ (ι b \in {Base}_{g} \| (a {mid}_{𝒢} (g) b \in d \land (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b)))) = (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b))))$
28	14 27	mpteq12dv	$⊢ g = G \to (d \in ran {Line}_{𝒢} (g) ⟼ (a \in {Base}_{g} ⟼ (ι b \in {Base}_{g} \| (a {mid}_{𝒢} (g) b \in d \land (d ⟂_{𝒢} (g) (a {Line}_{𝒢} (g) b) \lor a = b))))) = (d \in ran L ⟼ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))))$
29	4	elexd	$⊢ φ \to G \in V$
30	7	fvexi	$⊢ L \in V$
31		rnexg	$⊢ L \in V \to ran L \in V$
32		mptexg	$⊢ ran L \in V \to (d \in ran L ⟼ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b))))) \in V$
33	30 31 32	mp2b	$⊢ (d \in ran L ⟼ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b))))) \in V$
34	33	a1i	$⊢ φ \to (d \in ran L ⟼ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b))))) \in V$
35	11 28 29 34	fvmptd3	$⊢ φ \to {lInv}_{𝒢} (G) = (d \in ran L ⟼ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))))$
36		eleq2	$⊢ d = D \to (a {mid}_{𝒢} (G) b \in d \leftrightarrow a {mid}_{𝒢} (G) b \in D)$
37		breq1	$⊢ d = D \to (d ⟂_{𝒢} (G) (a L b) \leftrightarrow D ⟂_{𝒢} (G) (a L b))$
38	37	orbi1d	$⊢ d = D \to ((d ⟂_{𝒢} (G) (a L b) \lor a = b) \leftrightarrow (D ⟂_{𝒢} (G) (a L b) \lor a = b))$
39	36 38	anbi12d	$⊢ d = D \to ((a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)) \leftrightarrow (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b)))$
40	39	riotabidv	$⊢ d = D \to (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b))) = (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b)))$
41	40	mpteq2dv	$⊢ d = D \to (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))) = (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))))$
42	41	adantl	$⊢ (φ \land d = D) \to (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in d \land (d ⟂_{𝒢} (G) (a L b) \lor a = b)))) = (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))))$
43	1	fvexi	$⊢ P \in V$
44	43	mptex	$⊢ (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b)))) \in V$
45	44	a1i	$⊢ φ \to (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b)))) \in V$
46	35 42 8 45	fvmptd	$⊢ φ \to {lInv}_{𝒢} (G) (D) = (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))))$
47	6 46	syl5eq	$⊢ φ \to M = (a \in P ⟼ (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))))$
48		oveq1	$⊢ a = A \to a {mid}_{𝒢} (G) b = A {mid}_{𝒢} (G) b$
49	48	eleq1d	$⊢ a = A \to (a {mid}_{𝒢} (G) b \in D \leftrightarrow A {mid}_{𝒢} (G) b \in D)$
50		oveq1	$⊢ a = A \to a L b = A L b$
51	50	breq2d	$⊢ a = A \to (D ⟂_{𝒢} (G) (a L b) \leftrightarrow D ⟂_{𝒢} (G) (A L b))$
52		eqeq1	$⊢ a = A \to (a = b \leftrightarrow A = b)$
53	51 52	orbi12d	$⊢ a = A \to ((D ⟂_{𝒢} (G) (a L b) \lor a = b) \leftrightarrow (D ⟂_{𝒢} (G) (A L b) \lor A = b))$
54	49 53	anbi12d	$⊢ a = A \to ((a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b)) \leftrightarrow (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)))$
55	54	riotabidv	$⊢ a = A \to (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))) = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)))$
56	55	adantl	$⊢ (φ \land a = A) \to (ι b \in P \| (a {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (a L b) \lor a = b))) = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)))$
57	1 2 3 4 5 7 8 9	lmieu	$⊢ φ \to \exists! b \in P (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))$
58		riotacl	$⊢ \exists! b \in P (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)) \to (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) \in P$
59	57 58	syl	$⊢ φ \to (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) \in P$
60	47 56 9 59	fvmptd	$⊢ φ \to M (A) = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)))$
61	60	eqeq2d	$⊢ φ \to (B = M (A) \leftrightarrow B = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))))$
62		oveq2	$⊢ b = B \to A {mid}_{𝒢} (G) b = A {mid}_{𝒢} (G) B$
63	62	eleq1d	$⊢ b = B \to (A {mid}_{𝒢} (G) b \in D \leftrightarrow A {mid}_{𝒢} (G) B \in D)$
64		oveq2	$⊢ b = B \to A L b = A L B$
65	64	breq2d	$⊢ b = B \to (D ⟂_{𝒢} (G) (A L b) \leftrightarrow D ⟂_{𝒢} (G) (A L B))$
66		eqeq2	$⊢ b = B \to (A = b \leftrightarrow A = B)$
67	65 66	orbi12d	$⊢ b = B \to ((D ⟂_{𝒢} (G) (A L b) \lor A = b) \leftrightarrow (D ⟂_{𝒢} (G) (A L B) \lor A = B))$
68	63 67	anbi12d	$⊢ b = B \to ((A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b)) \leftrightarrow (A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)))$
69	68	riota2	$⊢ (B \in P \land \exists! b \in P (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) \to ((A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)) \leftrightarrow (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) = B)$
70	10 57 69	syl2anc	$⊢ φ \to ((A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)) \leftrightarrow (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) = B)$
71		eqcom	$⊢ B = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) \leftrightarrow (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))) = B$
72	70 71	bitr4di	$⊢ φ \to ((A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)) \leftrightarrow B = (ι b \in P \| (A {mid}_{𝒢} (G) b \in D \land (D ⟂_{𝒢} (G) (A L b) \lor A = b))))$
73	61 72	bitr4d	$⊢ φ \to (B = M (A) \leftrightarrow (A {mid}_{𝒢} (G) B \in D \land (D ⟂_{𝒢} (G) (A L B) \lor A = B)))$

Metamath Proof Explorer

Theorem islmib

Proof