Metamath Proof Explorer

Theorem pjadji

Description: A projection is self-adjoint. Property (i) of Beran p. 109. (Contributed by NM, 6-Oct-2000) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	pjadjt.1	$⊢ H \in C_{ℋ}$
	Assertion	pjadji	$⊢ (A \in ℋ \land B \in ℋ) \to {proj}_{ℎ} (H) (A) \cdot_{ih} B = A \cdot_{ih} {proj}_{ℎ} (H) (B)$

Proof

Step	Hyp	Ref	Expression
1		pjadjt.1	$⊢ H \in C_{ℋ}$
2		fveq2	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to {proj}_{ℎ} (H) (A) = {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ}))$
3	2	oveq1d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to {proj}_{ℎ} (H) (A) \cdot_{ih} B = {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} B$
4		oveq1	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to A \cdot_{ih} {proj}_{ℎ} (H) (B) = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (B)$
5	3 4	eqeq12d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to ({proj}_{ℎ} (H) (A) \cdot_{ih} B = A \cdot_{ih} {proj}_{ℎ} (H) (B) \leftrightarrow {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} B = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (B))$
6		oveq2	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} B = {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})$
7		fveq2	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to {proj}_{ℎ} (H) (B) = {proj}_{ℎ} (H) (if (B \in ℋ, B, 0_{ℎ}))$
8	7	oveq2d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (B) = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (if (B \in ℋ, B, 0_{ℎ}))$
9	6 8	eqeq12d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to ({proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} B = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (B) \leftrightarrow {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ}) = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (if (B \in ℋ, B, 0_{ℎ})))$
10		ifhvhv0	$⊢ if (A \in ℋ, A, 0_{ℎ}) \in ℋ$
11		ifhvhv0	$⊢ if (B \in ℋ, B, 0_{ℎ}) \in ℋ$
12	1 10 11	pjadjii	$⊢ {proj}_{ℎ} (H) (if (A \in ℋ, A, 0_{ℎ})) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ}) = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} {proj}_{ℎ} (H) (if (B \in ℋ, B, 0_{ℎ}))$
13	5 9 12	dedth2h	$⊢ (A \in ℋ \land B \in ℋ) \to {proj}_{ℎ} (H) (A) \cdot_{ih} B = A \cdot_{ih} {proj}_{ℎ} (H) (B)$