Metamath Proof Explorer

Theorem djaffvalN

Description: Subspace join for DVecA partial vector space. (Contributed by NM, 6-Dec-2013) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	djaval.h	$⊢ H = LHyp (K)$
	Assertion	djaffvalN	$⊢ K \in V \to vA (K) = (w \in H ⟼ (x \in 𝒫 LTrn (K) (w), y \in 𝒫 LTrn (K) (w) ⟼ ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y))))$

Proof

Step	Hyp	Ref	Expression
1		djaval.h	$⊢ H = LHyp (K)$
2		elex	$⊢ K \in V \to K \in V$
3		fveq2	$⊢ k = K \to LHyp (k) = LHyp (K)$
4	3 1	syl6eqr	$⊢ k = K \to LHyp (k) = H$
5		fveq2	$⊢ k = K \to LTrn (k) = LTrn (K)$
6	5	fveq1d	$⊢ k = K \to LTrn (k) (w) = LTrn (K) (w)$
7	6	pweqd	$⊢ k = K \to 𝒫 LTrn (k) (w) = 𝒫 LTrn (K) (w)$
8		fveq2	$⊢ k = K \to ocA (k) = ocA (K)$
9	8	fveq1d	$⊢ k = K \to ocA (k) (w) = ocA (K) (w)$
10	9	fveq1d	$⊢ k = K \to ocA (k) (w) (x) = ocA (K) (w) (x)$
11	9	fveq1d	$⊢ k = K \to ocA (k) (w) (y) = ocA (K) (w) (y)$
12	10 11	ineq12d	$⊢ k = K \to ocA (k) (w) (x) \cap ocA (k) (w) (y) = ocA (K) (w) (x) \cap ocA (K) (w) (y)$
13	9 12	fveq12d	$⊢ k = K \to ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)) = ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y))$
14	7 7 13	mpoeq123dv	$⊢ k = K \to (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y))) = (x \in 𝒫 LTrn (K) (w), y \in 𝒫 LTrn (K) (w) ⟼ ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y)))$
15	4 14	mpteq12dv	$⊢ k = K \to (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))) = (w \in H ⟼ (x \in 𝒫 LTrn (K) (w), y \in 𝒫 LTrn (K) (w) ⟼ ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y))))$
16		df-djaN	$⊢ vA = (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in 𝒫 LTrn (k) (w), y \in 𝒫 LTrn (k) (w) ⟼ ocA (k) (w) (ocA (k) (w) (x) \cap ocA (k) (w) (y)))))$
17	15 16 1	mptfvmpt	$⊢ K \in V \to vA (K) = (w \in H ⟼ (x \in 𝒫 LTrn (K) (w), y \in 𝒫 LTrn (K) (w) ⟼ ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y))))$
18	2 17	syl	$⊢ K \in V \to vA (K) = (w \in H ⟼ (x \in 𝒫 LTrn (K) (w), y \in 𝒫 LTrn (K) (w) ⟼ ocA (K) (w) (ocA (K) (w) (x) \cap ocA (K) (w) (y))))$