pjpm

Description: The projection map is a partial function from subspaces of the pre-Hilbert space to total operators. (Contributed by Mario Carneiro, 16-Oct-2015)

	Ref	Expression
Hypotheses	pjpm.v	$⊢ V = {Base}_{W}$
	pjpm.l	$⊢ L = LSubSp (W)$
	pjpm.k	$⊢ K = proj (W)$
Assertion	pjpm	$⊢ K \in ((V^{V}) ↑_{𝑝𝑚} L)$

Proof

Step	Hyp	Ref	Expression
1		pjpm.v	$⊢ V = {Base}_{W}$
2		pjpm.l	$⊢ L = LSubSp (W)$
3		pjpm.k	$⊢ K = proj (W)$
4		eqid	$⊢ ocv (W) = ocv (W)$
5		eqid	$⊢ {proj}_{1} (W) = {proj}_{1} (W)$
6	1 2 4 5 3	pjfval	$⊢ K = (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \cap (V \times (V^{V}))$
7		inss1	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \cap (V \times (V^{V})) \subseteq (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x))$
8	6 7	eqsstri	$⊢ K \subseteq (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x))$
9		funmpt	$⊢ Fun (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x))$
10		funss	$⊢ K \subseteq (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \to (Fun (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \to Fun K)$
11	8 9 10	mp2	$⊢ Fun K$
12		eqid	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) = (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x))$
13		ovexd	$⊢ x \in L \to x {proj}_{1} (W) ocv (W) (x) \in V$
14	12 13	fmpti	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) : L ⟶ V$
15		fssxp	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) : L ⟶ V \to (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \subseteq L \times V$
16		ssrin	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \subseteq L \times V \to (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \cap (V \times (V^{V})) \subseteq (L \times V) \cap (V \times (V^{V}))$
17	14 15 16	mp2b	$⊢ (x \in L ⟼ x {proj}_{1} (W) ocv (W) (x)) \cap (V \times (V^{V})) \subseteq (L \times V) \cap (V \times (V^{V}))$
18	6 17	eqsstri	$⊢ K \subseteq (L \times V) \cap (V \times (V^{V}))$
19		inxp	$⊢ (L \times V) \cap (V \times (V^{V})) = (L \cap V) \times (V \cap (V^{V}))$
20		inv1	$⊢ L \cap V = L$
21		incom	$⊢ V \cap (V^{V}) = (V^{V}) \cap V$
22		inv1	$⊢ (V^{V}) \cap V = V^{V}$
23	21 22	eqtri	$⊢ V \cap (V^{V}) = V^{V}$
24	20 23	xpeq12i	$⊢ (L \cap V) \times (V \cap (V^{V})) = L \times (V^{V})$
25	19 24	eqtri	$⊢ (L \times V) \cap (V \times (V^{V})) = L \times (V^{V})$
26	18 25	sseqtri	$⊢ K \subseteq L \times (V^{V})$
27		ovex	$⊢ V^{V} \in V$
28	2	fvexi	$⊢ L \in V$
29	27 28	elpm	$⊢ K \in ((V^{V}) ↑_{𝑝𝑚} L) \leftrightarrow (Fun K \land K \subseteq L \times (V^{V}))$
30	11 26 29	mpbir2an	$⊢ K \in ((V^{V}) ↑_{𝑝𝑚} L)$

Metamath Proof Explorer

Theorem pjpm

Proof