istrkg3ld

Description: Property of fulfilling the lower dimension 3 axiom. (Contributed by Thierry Arnoux, 12-Jul-2020)

	Ref	Expression
Hypotheses	istrkg.p	$⊢ P = {Base}_{G}$
	istrkg.d	$⊢ \underset{˙}{-} = dist (G)$
	istrkg.i	$⊢ I = Itv (G)$
Assertion	istrkg3ld	$⊢ G \in V \to (G {Dim}_{𝒢} \geq 3 \leftrightarrow \exists u \in P \exists v \in P (u \neq v \land \exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$

Proof

Step	Hyp	Ref	Expression
1		istrkg.p	$⊢ P = {Base}_{G}$
2		istrkg.d	$⊢ \underset{˙}{-} = dist (G)$
3		istrkg.i	$⊢ I = Itv (G)$
4		3z	$⊢ 3 \in ℤ$
5		2re	$⊢ 2 \in ℝ$
6		3re	$⊢ 3 \in ℝ$
7		2lt3	$⊢ 2 < 3$
8	5 6 7	ltleii	$⊢ 2 \leq 3$
9		2z	$⊢ 2 \in ℤ$
10	9	eluz1i	$⊢ 3 \in ℤ_{\geq 2} \leftrightarrow (3 \in ℤ \land 2 \leq 3)$
11	4 8 10	mpbir2an	$⊢ 3 \in ℤ_{\geq 2}$
12	1 2 3	istrkgld	$⊢ (G \in V \land 3 \in ℤ_{\geq 2}) \to (G {Dim}_{𝒢} \geq 3 \leftrightarrow \exists f (f : (1 ..^3) \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$
13	11 12	mpan2	$⊢ G \in V \to (G {Dim}_{𝒢} \geq 3 \leftrightarrow \exists f (f : (1 ..^3) \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$
14		fzo13pr	$⊢ (1 ..^3) = \{1, 2\}$
15		f1eq2	$⊢ (1 ..^3) = \{1, 2\} \to (f : (1 ..^3) \underset{1-1}{⟶} P \leftrightarrow f : \{1, 2\} \underset{1-1}{⟶} P)$
16	14 15	ax-mp	$⊢ f : (1 ..^3) \underset{1-1}{⟶} P \leftrightarrow f : \{1, 2\} \underset{1-1}{⟶} P$
17	16	anbi1i	$⊢ (f : (1 ..^3) \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
18	17	exbii	$⊢ \exists f (f : (1 ..^3) \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow \exists f (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
19	18	a1i	$⊢ G \in V \to (\exists f (f : (1 ..^3) \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow \exists f (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$
20		1z	$⊢ 1 \in ℤ$
21		1ne2	$⊢ 1 \neq 2$
22		oveq1	$⊢ u = f (1) \to u \underset{˙}{-} x = f (1) \underset{˙}{-} x$
23	22	eqeq1d	$⊢ u = f (1) \to (u \underset{˙}{-} x = v \underset{˙}{-} x \leftrightarrow f (1) \underset{˙}{-} x = v \underset{˙}{-} x)$
24		oveq1	$⊢ u = f (1) \to u \underset{˙}{-} y = f (1) \underset{˙}{-} y$
25	24	eqeq1d	$⊢ u = f (1) \to (u \underset{˙}{-} y = v \underset{˙}{-} y \leftrightarrow f (1) \underset{˙}{-} y = v \underset{˙}{-} y)$
26		oveq1	$⊢ u = f (1) \to u \underset{˙}{-} z = f (1) \underset{˙}{-} z$
27	26	eqeq1d	$⊢ u = f (1) \to (u \underset{˙}{-} z = v \underset{˙}{-} z \leftrightarrow f (1) \underset{˙}{-} z = v \underset{˙}{-} z)$
28	23 25 27	3anbi123d	$⊢ u = f (1) \to ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z))$
29	28	anbi1d	$⊢ u = f (1) \to (((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
30	29	rexbidv	$⊢ u = f (1) \to (\exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow \exists z \in P ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
31	30	2rexbidv	$⊢ u = f (1) \to (\exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow \exists x \in P \exists y \in P \exists z \in P ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
32		oveq1	$⊢ v = f (2) \to v \underset{˙}{-} x = f (2) \underset{˙}{-} x$
33	32	eqeq2d	$⊢ v = f (2) \to (f (1) \underset{˙}{-} x = v \underset{˙}{-} x \leftrightarrow f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x)$
34		oveq1	$⊢ v = f (2) \to v \underset{˙}{-} y = f (2) \underset{˙}{-} y$
35	34	eqeq2d	$⊢ v = f (2) \to (f (1) \underset{˙}{-} y = v \underset{˙}{-} y \leftrightarrow f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y)$
36		oveq1	$⊢ v = f (2) \to v \underset{˙}{-} z = f (2) \underset{˙}{-} z$
37	36	eqeq2d	$⊢ v = f (2) \to (f (1) \underset{˙}{-} z = v \underset{˙}{-} z \leftrightarrow f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z)$
38	33 35 37	3anbi123d	$⊢ v = f (2) \to ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z))$
39		2p1e3	$⊢ 2 + 1 = 3$
40	39	oveq2i	$⊢ (2 ..^2 + 1) = (2 ..^3)$
41		fzosn	$⊢ 2 \in ℤ \to (2 ..^2 + 1) = \{2\}$
42	9 41	ax-mp	$⊢ (2 ..^2 + 1) = \{2\}$
43	40 42	eqtr3i	$⊢ (2 ..^3) = \{2\}$
44	43	raleqi	$⊢ \forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \leftrightarrow \forall j \in \{2\} (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z)$
45		fveq2	$⊢ j = 2 \to f (j) = f (2)$
46	45	oveq1d	$⊢ j = 2 \to f (j) \underset{˙}{-} x = f (2) \underset{˙}{-} x$
47	46	eqeq2d	$⊢ j = 2 \to (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \leftrightarrow f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x)$
48	45	oveq1d	$⊢ j = 2 \to f (j) \underset{˙}{-} y = f (2) \underset{˙}{-} y$
49	48	eqeq2d	$⊢ j = 2 \to (f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \leftrightarrow f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y)$
50	45	oveq1d	$⊢ j = 2 \to f (j) \underset{˙}{-} z = f (2) \underset{˙}{-} z$
51	50	eqeq2d	$⊢ j = 2 \to (f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z \leftrightarrow f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z)$
52	47 49 51	3anbi123d	$⊢ j = 2 \to ((f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z))$
53	52	ralsng	$⊢ 2 \in ℤ \to (\forall j \in \{2\} (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z))$
54	9 53	ax-mp	$⊢ \forall j \in \{2\} (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z)$
55	44 54	bitri	$⊢ \forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \leftrightarrow (f (1) \underset{˙}{-} x = f (2) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (2) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (2) \underset{˙}{-} z)$
56	38 55	bitr4di	$⊢ v = f (2) \to ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \leftrightarrow \forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z))$
57	56	anbi1d	$⊢ v = f (2) \to (((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
58	57	rexbidv	$⊢ v = f (2) \to (\exists z \in P ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
59	58	2rexbidv	$⊢ v = f (2) \to (\exists x \in P \exists y \in P \exists z \in P ((f (1) \underset{˙}{-} x = v \underset{˙}{-} x \land f (1) \underset{˙}{-} y = v \underset{˙}{-} y \land f (1) \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))) \leftrightarrow \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
60	31 59	f1prex	$⊢ (1 \in ℤ \land 2 \in ℤ \land 1 \neq 2) \to (\exists f (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow \exists u \in P \exists v \in P (u \neq v \land \exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$
61	20 9 21 60	mp3an	$⊢ \exists f (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow \exists u \in P \exists v \in P (u \neq v \land \exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z))))$
62	61	a1i	$⊢ G \in V \to (\exists f (f : \{1, 2\} \underset{1-1}{⟶} P \land \exists x \in P \exists y \in P \exists z \in P (\forall j \in (2 ..^3) (f (1) \underset{˙}{-} x = f (j) \underset{˙}{-} x \land f (1) \underset{˙}{-} y = f (j) \underset{˙}{-} y \land f (1) \underset{˙}{-} z = f (j) \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))) \leftrightarrow \exists u \in P \exists v \in P (u \neq v \land \exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$
63	13 19 62	3bitrd	$⊢ G \in V \to (G {Dim}_{𝒢} \geq 3 \leftrightarrow \exists u \in P \exists v \in P (u \neq v \land \exists x \in P \exists y \in P \exists z \in P ((u \underset{˙}{-} x = v \underset{˙}{-} x \land u \underset{˙}{-} y = v \underset{˙}{-} y \land u \underset{˙}{-} z = v \underset{˙}{-} z) \land \neg (z \in (x I y) \lor x \in (z I y) \lor y \in (x I z)))))$

Metamath Proof Explorer

Theorem istrkg3ld

Proof