Metamath Proof Explorer

Theorem msrtri

Description: Reverse triangle inequality for the distance function of a metric space. (Contributed by Mario Carneiro, 4-Oct-2015)

		Ref	Expression
	Hypotheses	mscl.x	$⊢ X = {Base}_{M}$
		mscl.d	$⊢ D = dist (M)$
	Assertion	msrtri	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to \|(A D C) - (B D C)\| \leq A D B$

Proof

Step	Hyp	Ref	Expression
1		mscl.x	$⊢ X = {Base}_{M}$
2		mscl.d	$⊢ D = dist (M)$
3	1 2	msmet2	$⊢ M \in MetSp \to {D ↾}_{(X \times X)} \in Met (X)$
4		metrtri	$⊢ ({D ↾}_{(X \times X)} \in Met (X) \land (A \in X \land B \in X \land C \in X)) \to \|(A ({D ↾}_{(X \times X)}) C) - (B ({D ↾}_{(X \times X)}) C)\| \leq A ({D ↾}_{(X \times X)}) B$
5	3 4	sylan	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to \|(A ({D ↾}_{(X \times X)}) C) - (B ({D ↾}_{(X \times X)}) C)\| \leq A ({D ↾}_{(X \times X)}) B$
6		simpr1	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to A \in X$
7		simpr3	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to C \in X$
8	6 7	ovresd	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to A ({D ↾}_{(X \times X)}) C = A D C$
9		simpr2	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to B \in X$
10	9 7	ovresd	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to B ({D ↾}_{(X \times X)}) C = B D C$
11	8 10	oveq12d	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to (A ({D ↾}_{(X \times X)}) C) - (B ({D ↾}_{(X \times X)}) C) = (A D C) - (B D C)$
12	11	fveq2d	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to \|(A ({D ↾}_{(X \times X)}) C) - (B ({D ↾}_{(X \times X)}) C)\| = \|(A D C) - (B D C)\|$
13	6 9	ovresd	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to A ({D ↾}_{(X \times X)}) B = A D B$
14	5 12 13	3brtr3d	$⊢ (M \in MetSp \land (A \in X \land B \in X \land C \in X)) \to \|(A D C) - (B D C)\| \leq A D B$