hoddi

Description: Distributive law for Hilbert space operator difference. (Interestingly, the reverse distributive law hocsubdiri does not require linearity.) (Contributed by NM, 23-Aug-2006) (New usage is discouraged.)

		Ref	Expression
	Assertion	hoddi	$⊢ (R \in LinOp \land S : ℋ ⟶ ℋ \land T : ℋ ⟶ ℋ) \to R \circ (S -_{op} T) = (R \circ S) -_{op} (R \circ T)$

Proof

Step	Hyp	Ref	Expression
1		coeq1	$⊢ R = if (R \in LinOp, R, 0_{hop}) \to R \circ (S -_{op} T) = if (R \in LinOp, R, 0_{hop}) \circ (S -_{op} T)$
2		coeq1	$⊢ R = if (R \in LinOp, R, 0_{hop}) \to R \circ S = if (R \in LinOp, R, 0_{hop}) \circ S$
3		coeq1	$⊢ R = if (R \in LinOp, R, 0_{hop}) \to R \circ T = if (R \in LinOp, R, 0_{hop}) \circ T$
4	2 3	oveq12d	$⊢ R = if (R \in LinOp, R, 0_{hop}) \to (R \circ S) -_{op} (R \circ T) = (if (R \in LinOp, R, 0_{hop}) \circ S) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T)$
5	1 4	eqeq12d	$⊢ R = if (R \in LinOp, R, 0_{hop}) \to (R \circ (S -_{op} T) = (R \circ S) -_{op} (R \circ T) \leftrightarrow if (R \in LinOp, R, 0_{hop}) \circ (S -_{op} T) = (if (R \in LinOp, R, 0_{hop}) \circ S) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T))$
6		oveq1	$⊢ S = if (S : ℋ ⟶ ℋ, S, 0_{hop}) \to S -_{op} T = if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T$
7	6	coeq2d	$⊢ S = if (S : ℋ ⟶ ℋ, S, 0_{hop}) \to if (R \in LinOp, R, 0_{hop}) \circ (S -_{op} T) = if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T)$
8		coeq2	$⊢ S = if (S : ℋ ⟶ ℋ, S, 0_{hop}) \to if (R \in LinOp, R, 0_{hop}) \circ S = if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})$
9	8	oveq1d	$⊢ S = if (S : ℋ ⟶ ℋ, S, 0_{hop}) \to (if (R \in LinOp, R, 0_{hop}) \circ S) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T)$
10	7 9	eqeq12d	$⊢ S = if (S : ℋ ⟶ ℋ, S, 0_{hop}) \to (if (R \in LinOp, R, 0_{hop}) \circ (S -_{op} T) = (if (R \in LinOp, R, 0_{hop}) \circ S) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T) \leftrightarrow if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T))$
11		oveq2	$⊢ T = if (T : ℋ ⟶ ℋ, T, 0_{hop}) \to if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T = if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} if (T : ℋ ⟶ ℋ, T, 0_{hop})$
12	11	coeq2d	$⊢ T = if (T : ℋ ⟶ ℋ, T, 0_{hop}) \to if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T) = if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} if (T : ℋ ⟶ ℋ, T, 0_{hop}))$
13		coeq2	$⊢ T = if (T : ℋ ⟶ ℋ, T, 0_{hop}) \to if (R \in LinOp, R, 0_{hop}) \circ T = if (R \in LinOp, R, 0_{hop}) \circ if (T : ℋ ⟶ ℋ, T, 0_{hop})$
14	13	oveq2d	$⊢ T = if (T : ℋ ⟶ ℋ, T, 0_{hop}) \to (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ if (T : ℋ ⟶ ℋ, T, 0_{hop}))$
15	12 14	eqeq12d	$⊢ T = if (T : ℋ ⟶ ℋ, T, 0_{hop}) \to (if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} T) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ T) \leftrightarrow if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} if (T : ℋ ⟶ ℋ, T, 0_{hop})) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ if (T : ℋ ⟶ ℋ, T, 0_{hop})))$
16		0lnop	$⊢ 0_{hop} \in LinOp$
17	16	elimel	$⊢ if (R \in LinOp, R, 0_{hop}) \in LinOp$
18		ho0f	$⊢ 0_{hop} : ℋ ⟶ ℋ$
19	18	elimf	$⊢ if (S : ℋ ⟶ ℋ, S, 0_{hop}) : ℋ ⟶ ℋ$
20	18	elimf	$⊢ if (T : ℋ ⟶ ℋ, T, 0_{hop}) : ℋ ⟶ ℋ$
21	17 19 20	hoddii	$⊢ if (R \in LinOp, R, 0_{hop}) \circ (if (S : ℋ ⟶ ℋ, S, 0_{hop}) -_{op} if (T : ℋ ⟶ ℋ, T, 0_{hop})) = (if (R \in LinOp, R, 0_{hop}) \circ if (S : ℋ ⟶ ℋ, S, 0_{hop})) -_{op} (if (R \in LinOp, R, 0_{hop}) \circ if (T : ℋ ⟶ ℋ, T, 0_{hop}))$
22	5 10 15 21	dedth3h	$⊢ (R \in LinOp \land S : ℋ ⟶ ℋ \land T : ℋ ⟶ ℋ) \to R \circ (S -_{op} T) = (R \circ S) -_{op} (R \circ T)$

Metamath Proof Explorer

Theorem hoddi

Proof