Metamath Proof Explorer

Theorem sspims

Description: The induced metric on a subspace is a restriction of the induced metric on the parent space. (Contributed by NM, 1-Feb-2008) (New usage is discouraged.)

		Ref	Expression
	Hypotheses	sspims.y	$⊢ Y = BaseSet (W)$
		sspims.d	$⊢ D = IndMet (U)$
		sspims.c	$⊢ C = IndMet (W)$
		sspims.h	$⊢ H = SubSp (U)$
	Assertion	sspims	$⊢ (U \in NrmCVec \land W \in H) \to C = {D ↾}_{(Y \times Y)}$

Proof

Step	Hyp	Ref	Expression
1		sspims.y	$⊢ Y = BaseSet (W)$
2		sspims.d	$⊢ D = IndMet (U)$
3		sspims.c	$⊢ C = IndMet (W)$
4		sspims.h	$⊢ H = SubSp (U)$
5	1 2 3 4	sspimsval	$⊢ ((U \in NrmCVec \land W \in H) \land (x \in Y \land y \in Y)) \to x C y = x D y$
6	1 3	imsdf	$⊢ W \in NrmCVec \to C : Y \times Y ⟶ ℝ$
7		eqid	$⊢ BaseSet (U) = BaseSet (U)$
8	7 2	imsdf	$⊢ U \in NrmCVec \to D : BaseSet (U) \times BaseSet (U) ⟶ ℝ$
9	1 4 5 6 8	sspmlem	$⊢ (U \in NrmCVec \land W \in H) \to C = {D ↾}_{(Y \times Y)}$