issh

Description: Subspace H of a Hilbert space. A subspace is a subset of Hilbert space which contains the zero vector and is closed under vector addition and scalar multiplication. (Contributed by Mario Carneiro, 23-Dec-2013) (New usage is discouraged.)

		Ref	Expression
	Assertion	issh	$⊢ H \in S_{ℋ} \leftrightarrow ((H \subseteq ℋ \land 0_{ℎ} \in H) \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H))$

Proof

Step	Hyp	Ref	Expression
1		ax-hilex	$⊢ ℋ \in V$
2	1	elpw2	$⊢ H \in 𝒫 ℋ \leftrightarrow H \subseteq ℋ$
3		3anass	$⊢ (0_{ℎ} \in H \land +_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H) \leftrightarrow (0_{ℎ} \in H \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H))$
4	2 3	anbi12i	$⊢ (H \in 𝒫 ℋ \land (0_{ℎ} \in H \land +_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H)) \leftrightarrow (H \subseteq ℋ \land (0_{ℎ} \in H \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H)))$
5		eleq2	$⊢ h = H \to (0_{ℎ} \in h \leftrightarrow 0_{ℎ} \in H)$
6		id	$⊢ h = H \to h = H$
7	6	sqxpeqd	$⊢ h = H \to h \times h = H \times H$
8	7	imaeq2d	$⊢ h = H \to +_{ℎ} [h \times h] = +_{ℎ} [H \times H]$
9	8 6	sseq12d	$⊢ h = H \to (+_{ℎ} [h \times h] \subseteq h \leftrightarrow +_{ℎ} [H \times H] \subseteq H)$
10		xpeq2	$⊢ h = H \to ℂ \times h = ℂ \times H$
11	10	imaeq2d	$⊢ h = H \to \cdot_{ℎ} [ℂ \times h] = \cdot_{ℎ} [ℂ \times H]$
12	11 6	sseq12d	$⊢ h = H \to (\cdot_{ℎ} [ℂ \times h] \subseteq h \leftrightarrow \cdot_{ℎ} [ℂ \times H] \subseteq H)$
13	5 9 12	3anbi123d	$⊢ h = H \to ((0_{ℎ} \in h \land +_{ℎ} [h \times h] \subseteq h \land \cdot_{ℎ} [ℂ \times h] \subseteq h) \leftrightarrow (0_{ℎ} \in H \land +_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H))$
14		df-sh	$⊢ S_{ℋ} = \{h \in 𝒫 ℋ \| (0_{ℎ} \in h \land +_{ℎ} [h \times h] \subseteq h \land \cdot_{ℎ} [ℂ \times h] \subseteq h)\}$
15	13 14	elrab2	$⊢ H \in S_{ℋ} \leftrightarrow (H \in 𝒫 ℋ \land (0_{ℎ} \in H \land +_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H))$
16		anass	$⊢ ((H \subseteq ℋ \land 0_{ℎ} \in H) \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H)) \leftrightarrow (H \subseteq ℋ \land (0_{ℎ} \in H \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H)))$
17	4 15 16	3bitr4i	$⊢ H \in S_{ℋ} \leftrightarrow ((H \subseteq ℋ \land 0_{ℎ} \in H) \land (+_{ℎ} [H \times H] \subseteq H \land \cdot_{ℎ} [ℂ \times H] \subseteq H))$

Metamath Proof Explorer

Theorem issh

Proof