psmettri2

Description: Triangle inequality for the distance function of a pseudometric. (Contributed by Thierry Arnoux, 11-Feb-2018)

		Ref	Expression
	Assertion	psmettri2	$⊢ (D \in PsMet (X) \land (C \in X \land A \in X \land B \in X)) \to A D B \leq (C D A) +_{𝑒} (C D B)$

Proof

Step	Hyp	Ref	Expression
1		elfvex	$⊢ D \in PsMet (X) \to X \in V$
2		ispsmet	$⊢ X \in V \to (D \in PsMet (X) \leftrightarrow (D : X \times X ⟶ ℝ^{*} \land \forall a \in X (a D a = 0 \land \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b))))$
3	1 2	syl	$⊢ D \in PsMet (X) \to (D \in PsMet (X) \leftrightarrow (D : X \times X ⟶ ℝ^{*} \land \forall a \in X (a D a = 0 \land \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b))))$
4	3	ibi	$⊢ D \in PsMet (X) \to (D : X \times X ⟶ ℝ^{*} \land \forall a \in X (a D a = 0 \land \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b)))$
5	4	simprd	$⊢ D \in PsMet (X) \to \forall a \in X (a D a = 0 \land \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b))$
6	5	r19.21bi	$⊢ (D \in PsMet (X) \land a \in X) \to (a D a = 0 \land \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b))$
7	6	simprd	$⊢ (D \in PsMet (X) \land a \in X) \to \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b)$
8	7	ralrimiva	$⊢ D \in PsMet (X) \to \forall a \in X \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b)$
9		oveq1	$⊢ a = A \to a D b = A D b$
10		oveq2	$⊢ a = A \to c D a = c D A$
11	10	oveq1d	$⊢ a = A \to (c D a) +_{𝑒} (c D b) = (c D A) +_{𝑒} (c D b)$
12	9 11	breq12d	$⊢ a = A \to (a D b \leq (c D a) +_{𝑒} (c D b) \leftrightarrow A D b \leq (c D A) +_{𝑒} (c D b))$
13		oveq2	$⊢ b = B \to A D b = A D B$
14		oveq2	$⊢ b = B \to c D b = c D B$
15	14	oveq2d	$⊢ b = B \to (c D A) +_{𝑒} (c D b) = (c D A) +_{𝑒} (c D B)$
16	13 15	breq12d	$⊢ b = B \to (A D b \leq (c D A) +_{𝑒} (c D b) \leftrightarrow A D B \leq (c D A) +_{𝑒} (c D B))$
17		oveq1	$⊢ c = C \to c D A = C D A$
18		oveq1	$⊢ c = C \to c D B = C D B$
19	17 18	oveq12d	$⊢ c = C \to (c D A) +_{𝑒} (c D B) = (C D A) +_{𝑒} (C D B)$
20	19	breq2d	$⊢ c = C \to (A D B \leq (c D A) +_{𝑒} (c D B) \leftrightarrow A D B \leq (C D A) +_{𝑒} (C D B))$
21	12 16 20	rspc3v	$⊢ (A \in X \land B \in X \land C \in X) \to (\forall a \in X \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b) \to A D B \leq (C D A) +_{𝑒} (C D B))$
22	21	3comr	$⊢ (C \in X \land A \in X \land B \in X) \to (\forall a \in X \forall b \in X \forall c \in X a D b \leq (c D a) +_{𝑒} (c D b) \to A D B \leq (C D A) +_{𝑒} (C D B))$
23	8 22	mpan9	$⊢ (D \in PsMet (X) \land (C \in X \land A \in X \land B \in X)) \to A D B \leq (C D A) +_{𝑒} (C D B)$

Metamath Proof Explorer

Theorem psmettri2

Proof