df-djaN

Description: Define (closed) subspace join for DVecA partial vector space. (Contributed by NM, 6-Dec-2013)

		Ref	Expression
	Assertion	df-djaN	$⊢ vA = (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))))$

Step	Hyp	Ref	Expression
0		cdjaN	$class vA$
1		vk	$setvar k$
2		cvv	$class V$
3		vw	$setvar w$
4		clh	$class LHyp$
5	1	cv	$setvar k$
6	5 4	cfv	$class LHyp (k)$
7		vx	$setvar x$
8		cltrn	$class LTrn$
9	5 8	cfv	$class LTrn (k)$
10	3	cv	$setvar w$
11	10 9	cfv	$class LTrn (k) (w)$
12	11	cpw	$class 𝒫 LTrn (k) (w)$
13		vy	$setvar y$
14		cocaN	$class ocA$
15	5 14	cfv	$class ocA (k)$
16	10 15	cfv	$class ocA (k) (w)$
17	7	cv	$setvar x$
18	17 16	cfv	$class ocA (k) (w) (x)$
19	13	cv	$setvar y$
20	19 16	cfv	$class ocA (k) (w) (y)$
21	18 20	cin	$class (ocA (k) (w) (x) \cap ocA (k) (w) (y))$
22	21 16	cfv	$class ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y))$
23	7 13 12 12 22	cmpo	$class (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))$
24	3 6 23	cmpt	$class (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y))))$
25	1 2 24	cmpt	$class (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))))$
26	0 25	wceq	$wff vA = (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))))$

Metamath Proof Explorer