hhph

Description: The Hilbert space of the Hilbert Space Explorer is an inner product space. (Contributed by NM, 24-Nov-2007) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	hhnv.1	$⊢ U = ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩$
	Assertion	hhph	$⊢ U \in {CPreHil}_{OLD}$

Proof

Step	Hyp	Ref	Expression
1		hhnv.1	$⊢ U = ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩$
2		eqid	$⊢ ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ = ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩$
3	2	hhnv	$⊢ ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in NrmCVec$
4		normpar	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x -_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} y)}^{2} = 2 {{norm}_{ℎ} (x)}^{2} + 2 {{norm}_{ℎ} (y)}^{2}$
5		hvsubval	$⊢ (x \in ℋ \land y \in ℋ) \to x -_{ℎ} y = x +_{ℎ} (-1 \cdot_{ℎ} y)$
6	5	fveq2d	$⊢ (x \in ℋ \land y \in ℋ) \to {norm}_{ℎ} (x -_{ℎ} y) = {norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))$
7	6	oveq1d	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x -_{ℎ} y)}^{2} = {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2}$
8	7	oveq2d	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x -_{ℎ} y)}^{2} = {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2}$
9		hvaddcl	$⊢ (x \in ℋ \land y \in ℋ) \to x +_{ℎ} y \in ℋ$
10		normcl	$⊢ x +_{ℎ} y \in ℋ \to {norm}_{ℎ} (x +_{ℎ} y) \in ℝ$
11	9 10	syl	$⊢ (x \in ℋ \land y \in ℋ) \to {norm}_{ℎ} (x +_{ℎ} y) \in ℝ$
12	11	recnd	$⊢ (x \in ℋ \land y \in ℋ) \to {norm}_{ℎ} (x +_{ℎ} y) \in ℂ$
13	12	sqcld	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x +_{ℎ} y)}^{2} \in ℂ$
14		hvsubcl	$⊢ (x \in ℋ \land y \in ℋ) \to x -_{ℎ} y \in ℋ$
15		normcl	$⊢ x -_{ℎ} y \in ℋ \to {norm}_{ℎ} (x -_{ℎ} y) \in ℝ$
16	15	recnd	$⊢ x -_{ℎ} y \in ℋ \to {norm}_{ℎ} (x -_{ℎ} y) \in ℂ$
17	14 16	syl	$⊢ (x \in ℋ \land y \in ℋ) \to {norm}_{ℎ} (x -_{ℎ} y) \in ℂ$
18	17	sqcld	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x -_{ℎ} y)}^{2} \in ℂ$
19	13 18	addcomd	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x -_{ℎ} y)}^{2} = {{norm}_{ℎ} (x -_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} y)}^{2}$
20	8 19	eqtr3d	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = {{norm}_{ℎ} (x -_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} y)}^{2}$
21		normcl	$⊢ x \in ℋ \to {norm}_{ℎ} (x) \in ℝ$
22	21	recnd	$⊢ x \in ℋ \to {norm}_{ℎ} (x) \in ℂ$
23	22	sqcld	$⊢ x \in ℋ \to {{norm}_{ℎ} (x)}^{2} \in ℂ$
24		normcl	$⊢ y \in ℋ \to {norm}_{ℎ} (y) \in ℝ$
25	24	recnd	$⊢ y \in ℋ \to {norm}_{ℎ} (y) \in ℂ$
26	25	sqcld	$⊢ y \in ℋ \to {{norm}_{ℎ} (y)}^{2} \in ℂ$
27		2cn	$⊢ 2 \in ℂ$
28		adddi	$⊢ (2 \in ℂ \land {{norm}_{ℎ} (x)}^{2} \in ℂ \land {{norm}_{ℎ} (y)}^{2} \in ℂ) \to 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2}) = 2 {{norm}_{ℎ} (x)}^{2} + 2 {{norm}_{ℎ} (y)}^{2}$
29	27 28	mp3an1	$⊢ ({{norm}_{ℎ} (x)}^{2} \in ℂ \land {{norm}_{ℎ} (y)}^{2} \in ℂ) \to 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2}) = 2 {{norm}_{ℎ} (x)}^{2} + 2 {{norm}_{ℎ} (y)}^{2}$
30	23 26 29	syl2an	$⊢ (x \in ℋ \land y \in ℋ) \to 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2}) = 2 {{norm}_{ℎ} (x)}^{2} + 2 {{norm}_{ℎ} (y)}^{2}$
31	4 20 30	3eqtr4d	$⊢ (x \in ℋ \land y \in ℋ) \to {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2})$
32	31	rgen2	$⊢ \forall x \in ℋ \forall y \in ℋ {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2})$
33		hilablo	$⊢ +_{ℎ} \in AbelOp$
34	33	elexi	$⊢ +_{ℎ} \in V$
35		hvmulex	$⊢ \cdot_{ℎ} \in V$
36		normf	$⊢ {norm}_{ℎ} : ℋ ⟶ ℝ$
37		ax-hilex	$⊢ ℋ \in V$
38		fex	$⊢ ({norm}_{ℎ} : ℋ ⟶ ℝ \land ℋ \in V) \to {norm}_{ℎ} \in V$
39	36 37 38	mp2an	$⊢ {norm}_{ℎ} \in V$
40	1	eleq1i	$⊢ U \in {CPreHil}_{OLD} \leftrightarrow ⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in {CPreHil}_{OLD}$
41		ablogrpo	$⊢ +_{ℎ} \in AbelOp \to +_{ℎ} \in GrpOp$
42	33 41	ax-mp	$⊢ +_{ℎ} \in GrpOp$
43		ax-hfvadd	$⊢ +_{ℎ} : ℋ \times ℋ ⟶ ℋ$
44	43	fdmi	$⊢ dom +_{ℎ} = ℋ \times ℋ$
45	42 44	grporn	$⊢ ℋ = ran +_{ℎ}$
46	45	isphg	$⊢ (+_{ℎ} \in V \land \cdot_{ℎ} \in V \land {norm}_{ℎ} \in V) \to (⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in {CPreHil}_{OLD} \leftrightarrow (⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in NrmCVec \land \forall x \in ℋ \forall y \in ℋ {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2})))$
47	40 46	syl5bb	$⊢ (+_{ℎ} \in V \land \cdot_{ℎ} \in V \land {norm}_{ℎ} \in V) \to (U \in {CPreHil}_{OLD} \leftrightarrow (⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in NrmCVec \land \forall x \in ℋ \forall y \in ℋ {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2})))$
48	34 35 39 47	mp3an	$⊢ U \in {CPreHil}_{OLD} \leftrightarrow (⟨⟨+_{ℎ}, \cdot_{ℎ}⟩, {norm}_{ℎ}⟩ \in NrmCVec \land \forall x \in ℋ \forall y \in ℋ {{norm}_{ℎ} (x +_{ℎ} y)}^{2} + {{norm}_{ℎ} (x +_{ℎ} (-1 \cdot_{ℎ} y))}^{2} = 2 ({{norm}_{ℎ} (x)}^{2} + {{norm}_{ℎ} (y)}^{2}))$
49	3 32 48	mpbir2an	$⊢ U \in {CPreHil}_{OLD}$

Metamath Proof Explorer

Theorem hhph

Proof