ltgov

Description: Strict "shorter than" geometric relation between segments. (Contributed by Thierry Arnoux, 15-Dec-2019)

	Ref	Expression
Hypotheses	legval.p	$⊢ P = {Base}_{G}$
	legval.d	$⊢ \underset{˙}{-} = dist (G)$
	legval.i	$⊢ I = Itv (G)$
	legval.l	$⊢ \underset{˙}{\leq} = \leq_{𝒢} (G)$
	legval.g	$⊢ φ \to G \in 𝒢_{Tarski}$
	legso.a	$⊢ E = \underset{˙}{-} [P \times P]$
	legso.f	$⊢ φ \to Fun \underset{˙}{-}$
	legso.l	$⊢ \underset{˙}{<} = ({\underset{˙}{\leq} ↾}_{E}) ∖ I$
	legso.d	$⊢ φ \to P \times P \subseteq dom \underset{˙}{-}$
	ltgov.a	$⊢ φ \to A \in P$
	ltgov.b	$⊢ φ \to B \in P$
Assertion	ltgov	$⊢ φ \to ((A \underset{˙}{-} B) \underset{˙}{<} (C \underset{˙}{-} D) \leftrightarrow ((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land A \underset{˙}{-} B \neq C \underset{˙}{-} D))$

Proof

Step	Hyp	Ref	Expression
1		legval.p	$⊢ P = {Base}_{G}$
2		legval.d	$⊢ \underset{˙}{-} = dist (G)$
3		legval.i	$⊢ I = Itv (G)$
4		legval.l	$⊢ \underset{˙}{\leq} = \leq_{𝒢} (G)$
5		legval.g	$⊢ φ \to G \in 𝒢_{Tarski}$
6		legso.a	$⊢ E = \underset{˙}{-} [P \times P]$
7		legso.f	$⊢ φ \to Fun \underset{˙}{-}$
8		legso.l	$⊢ \underset{˙}{<} = ({\underset{˙}{\leq} ↾}_{E}) ∖ I$
9		legso.d	$⊢ φ \to P \times P \subseteq dom \underset{˙}{-}$
10		ltgov.a	$⊢ φ \to A \in P$
11		ltgov.b	$⊢ φ \to B \in P$
12	8	breqi	$⊢ (A \underset{˙}{-} B) \underset{˙}{<} (C \underset{˙}{-} D) \leftrightarrow (A \underset{˙}{-} B) (({\underset{˙}{\leq} ↾}_{E}) ∖ I) (C \underset{˙}{-} D)$
13		brdif	$⊢ (A \underset{˙}{-} B) (({\underset{˙}{\leq} ↾}_{E}) ∖ I) (C \underset{˙}{-} D) \leftrightarrow ((A \underset{˙}{-} B) ({\underset{˙}{\leq} ↾}_{E}) (C \underset{˙}{-} D) \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D))$
14	12 13	bitri	$⊢ (A \underset{˙}{-} B) \underset{˙}{<} (C \underset{˙}{-} D) \leftrightarrow ((A \underset{˙}{-} B) ({\underset{˙}{\leq} ↾}_{E}) (C \underset{˙}{-} D) \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D))$
15		ovex	$⊢ C \underset{˙}{-} D \in V$
16	15	brresi	$⊢ (A \underset{˙}{-} B) ({\underset{˙}{\leq} ↾}_{E}) (C \underset{˙}{-} D) \leftrightarrow (A \underset{˙}{-} B \in E \land (A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D))$
17	16	anbi1i	$⊢ ((A \underset{˙}{-} B) ({\underset{˙}{\leq} ↾}_{E}) (C \underset{˙}{-} D) \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)) \leftrightarrow ((A \underset{˙}{-} B \in E \land (A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D)) \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D))$
18		an21	$⊢ ((A \underset{˙}{-} B \in E \land (A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D)) \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)) \leftrightarrow ((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land (A \underset{˙}{-} B \in E \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)))$
19	14 17 18	3bitri	$⊢ (A \underset{˙}{-} B) \underset{˙}{<} (C \underset{˙}{-} D) \leftrightarrow ((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land (A \underset{˙}{-} B \in E \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)))$
20	10 11 7 9	elovimad	$⊢ φ \to A \underset{˙}{-} B \in \underset{˙}{-} [P \times P]$
21	20 6	eleqtrrdi	$⊢ φ \to A \underset{˙}{-} B \in E$
22	21	biantrurd	$⊢ φ \to (\neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D) \leftrightarrow (A \underset{˙}{-} B \in E \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)))$
23	15	ideq	$⊢ (A \underset{˙}{-} B) I (C \underset{˙}{-} D) \leftrightarrow A \underset{˙}{-} B = C \underset{˙}{-} D$
24	23	necon3bbii	$⊢ \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D) \leftrightarrow A \underset{˙}{-} B \neq C \underset{˙}{-} D$
25	22 24	bitr3di	$⊢ φ \to ((A \underset{˙}{-} B \in E \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D)) \leftrightarrow A \underset{˙}{-} B \neq C \underset{˙}{-} D)$
26	25	anbi2d	$⊢ φ \to (((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land (A \underset{˙}{-} B \in E \land \neg (A \underset{˙}{-} B) I (C \underset{˙}{-} D))) \leftrightarrow ((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land A \underset{˙}{-} B \neq C \underset{˙}{-} D))$
27	19 26	syl5bb	$⊢ φ \to ((A \underset{˙}{-} B) \underset{˙}{<} (C \underset{˙}{-} D) \leftrightarrow ((A \underset{˙}{-} B) \underset{˙}{\leq} (C \underset{˙}{-} D) \land A \underset{˙}{-} B \neq C \underset{˙}{-} D))$

Metamath Proof Explorer

Theorem ltgov

Proof