Metamath Proof Explorer

Theorem hhsst

Description: A member of SH is a subspace. (Contributed by NM, 6-Apr-2008) (New usage is discouraged.)

		Ref	Expression
	Hypotheses	hhsst.1	$⊢ U = ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩$
		hhsst.2	$⊢ W = ⟨⟨{+_{ℎ} ↾}_{(H \times H)}, {\cdot_{ℎ} ↾}_{(ℂ \times H)}⟩, {{norm}_{ℎ} ↾}_{H}⟩$
	Assertion	hhsst	$⊢ H \in S_{ℋ} \to W \in SubSp (U)$

Proof

Step	Hyp	Ref	Expression
1		hhsst.1	$⊢ U = ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩$
2		hhsst.2	$⊢ W = ⟨⟨{+_{ℎ} ↾}_{(H \times H)}, {\cdot_{ℎ} ↾}_{(ℂ \times H)}⟩, {{norm}_{ℎ} ↾}_{H}⟩$
3	2	hhssnvt	$⊢ H \in S_{ℋ} \to W \in NrmCVec$
4		resss	$⊢ {+_{ℎ} ↾}_{(H \times H)} \subseteq +_{ℎ}$
5		resss	$⊢ {\cdot_{ℎ} ↾}_{(ℂ \times H)} \subseteq \cdot_{ℎ}$
6		resss	$⊢ {{norm}_{ℎ} ↾}_{H} \subseteq {norm}_{ℎ}$
7	4 5 6	3pm3.2i	$⊢ ({+_{ℎ} ↾}_{(H \times H)} \subseteq +_{ℎ} \land {\cdot_{ℎ} ↾}_{(ℂ \times H)} \subseteq \cdot_{ℎ} \land {{norm}_{ℎ} ↾}_{H} \subseteq {norm}_{ℎ})$
8	3 7	jctir	$⊢ H \in S_{ℋ} \to (W \in NrmCVec \land ({+_{ℎ} ↾}_{(H \times H)} \subseteq +_{ℎ} \land {\cdot_{ℎ} ↾}_{(ℂ \times H)} \subseteq \cdot_{ℎ} \land {{norm}_{ℎ} ↾}_{H} \subseteq {norm}_{ℎ}))$
9	1	hhnv	$⊢ U \in NrmCVec$
10	1	hhva	$⊢ +_{ℎ} = +_{v} (U)$
11	2	hhssva	$⊢ {+_{ℎ} ↾}_{(H \times H)} = +_{v} (W)$
12	1	hhsm	$⊢ \cdot_{ℎ} = \cdot_{𝑠OLD} (U)$
13	2	hhsssm	$⊢ {\cdot_{ℎ} ↾}_{(ℂ \times H)} = \cdot_{𝑠OLD} (W)$
14	1	hhnm	$⊢ {norm}_{ℎ} = {norm}_{CV} (U)$
15	2	hhssnm	$⊢ {{norm}_{ℎ} ↾}_{H} = {norm}_{CV} (W)$
16		eqid	$⊢ SubSp (U) = SubSp (U)$
17	10 11 12 13 14 15 16	isssp	$⊢ U \in NrmCVec \to (W \in SubSp (U) \leftrightarrow (W \in NrmCVec \land ({+_{ℎ} ↾}_{(H \times H)} \subseteq +_{ℎ} \land {\cdot_{ℎ} ↾}_{(ℂ \times H)} \subseteq \cdot_{ℎ} \land {{norm}_{ℎ} ↾}_{H} \subseteq {norm}_{ℎ})))$
18	9 17	ax-mp	$⊢ W \in SubSp (U) \leftrightarrow (W \in NrmCVec \land ({+_{ℎ} ↾}_{(H \times H)} \subseteq +_{ℎ} \land {\cdot_{ℎ} ↾}_{(ℂ \times H)} \subseteq \cdot_{ℎ} \land {{norm}_{ℎ} ↾}_{H} \subseteq {norm}_{ℎ}))$
19	8 18	sylibr	$⊢ H \in S_{ℋ} \to W \in SubSp (U)$