lnophsi

Description: The sum of two linear operators is linear. (Contributed by NM, 10-Mar-2006) (New usage is discouraged.)

	Ref	Expression
Hypotheses	lnopco.1	$⊢ S \in LinOp$
	lnopco.2	$⊢ T \in LinOp$
Assertion	lnophsi	$⊢ S +_{op} T \in LinOp$

Proof

Step	Hyp	Ref	Expression
1		lnopco.1	$⊢ S \in LinOp$
2		lnopco.2	$⊢ T \in LinOp$
3	1	lnopfi	$⊢ S : ℋ ⟶ ℋ$
4	2	lnopfi	$⊢ T : ℋ ⟶ ℋ$
5	3 4	hoaddcli	$⊢ (S +_{op} T) : ℋ ⟶ ℋ$
6		hvmulcl	$⊢ (x \in ℂ \land y \in ℋ) \to x \cdot_{ℎ} y \in ℋ$
7	1	lnopaddi	$⊢ (x \cdot_{ℎ} y \in ℋ \land z \in ℋ) \to S ((x \cdot_{ℎ} y) +_{ℎ} z) = S (x \cdot_{ℎ} y) +_{ℎ} S (z)$
8	2	lnopaddi	$⊢ (x \cdot_{ℎ} y \in ℋ \land z \in ℋ) \to T ((x \cdot_{ℎ} y) +_{ℎ} z) = T (x \cdot_{ℎ} y) +_{ℎ} T (z)$
9	7 8	oveq12d	$⊢ (x \cdot_{ℎ} y \in ℋ \land z \in ℋ) \to S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z) = (S (x \cdot_{ℎ} y) +_{ℎ} S (z)) +_{ℎ} (T (x \cdot_{ℎ} y) +_{ℎ} T (z))$
10	6 9	sylan	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z) = (S (x \cdot_{ℎ} y) +_{ℎ} S (z)) +_{ℎ} (T (x \cdot_{ℎ} y) +_{ℎ} T (z))$
11	3	ffvelcdmi	$⊢ x \cdot_{ℎ} y \in ℋ \to S (x \cdot_{ℎ} y) \in ℋ$
12	6 11	syl	$⊢ (x \in ℂ \land y \in ℋ) \to S (x \cdot_{ℎ} y) \in ℋ$
13	3	ffvelcdmi	$⊢ z \in ℋ \to S (z) \in ℋ$
14	12 13	anim12i	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (S (x \cdot_{ℎ} y) \in ℋ \land S (z) \in ℋ)$
15	4	ffvelcdmi	$⊢ x \cdot_{ℎ} y \in ℋ \to T (x \cdot_{ℎ} y) \in ℋ$
16	6 15	syl	$⊢ (x \in ℂ \land y \in ℋ) \to T (x \cdot_{ℎ} y) \in ℋ$
17	4	ffvelcdmi	$⊢ z \in ℋ \to T (z) \in ℋ$
18	16 17	anim12i	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (T (x \cdot_{ℎ} y) \in ℋ \land T (z) \in ℋ)$
19		hvadd4	$⊢ ((S (x \cdot_{ℎ} y) \in ℋ \land S (z) \in ℋ) \land (T (x \cdot_{ℎ} y) \in ℋ \land T (z) \in ℋ)) \to (S (x \cdot_{ℎ} y) +_{ℎ} S (z)) +_{ℎ} (T (x \cdot_{ℎ} y) +_{ℎ} T (z)) = (S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y)) +_{ℎ} (S (z) +_{ℎ} T (z))$
20	14 18 19	syl2anc	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (S (x \cdot_{ℎ} y) +_{ℎ} S (z)) +_{ℎ} (T (x \cdot_{ℎ} y) +_{ℎ} T (z)) = (S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y)) +_{ℎ} (S (z) +_{ℎ} T (z))$
21	10 20	eqtrd	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z) = (S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y)) +_{ℎ} (S (z) +_{ℎ} T (z))$
22		hvaddcl	$⊢ (x \cdot_{ℎ} y \in ℋ \land z \in ℋ) \to (x \cdot_{ℎ} y) +_{ℎ} z \in ℋ$
23	6 22	sylan	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (x \cdot_{ℎ} y) +_{ℎ} z \in ℋ$
24		hosval	$⊢ (S : ℋ ⟶ ℋ \land T : ℋ ⟶ ℋ \land (x \cdot_{ℎ} y) +_{ℎ} z \in ℋ) \to (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z)$
25	3 4 24	mp3an12	$⊢ (x \cdot_{ℎ} y) +_{ℎ} z \in ℋ \to (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z)$
26	23 25	syl	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = S ((x \cdot_{ℎ} y) +_{ℎ} z) +_{ℎ} T ((x \cdot_{ℎ} y) +_{ℎ} z)$
27	3	ffvelcdmi	$⊢ y \in ℋ \to S (y) \in ℋ$
28	4	ffvelcdmi	$⊢ y \in ℋ \to T (y) \in ℋ$
29	27 28	jca	$⊢ y \in ℋ \to (S (y) \in ℋ \land T (y) \in ℋ)$
30		ax-hvdistr1	$⊢ (x \in ℂ \land S (y) \in ℋ \land T (y) \in ℋ) \to x \cdot_{ℎ} (S (y) +_{ℎ} T (y)) = (x \cdot_{ℎ} S (y)) +_{ℎ} (x \cdot_{ℎ} T (y))$
31	30	3expb	$⊢ (x \in ℂ \land (S (y) \in ℋ \land T (y) \in ℋ)) \to x \cdot_{ℎ} (S (y) +_{ℎ} T (y)) = (x \cdot_{ℎ} S (y)) +_{ℎ} (x \cdot_{ℎ} T (y))$
32	29 31	sylan2	$⊢ (x \in ℂ \land y \in ℋ) \to x \cdot_{ℎ} (S (y) +_{ℎ} T (y)) = (x \cdot_{ℎ} S (y)) +_{ℎ} (x \cdot_{ℎ} T (y))$
33		hosval	$⊢ (S : ℋ ⟶ ℋ \land T : ℋ ⟶ ℋ \land y \in ℋ) \to (S +_{op} T) (y) = S (y) +_{ℎ} T (y)$
34	3 4 33	mp3an12	$⊢ y \in ℋ \to (S +_{op} T) (y) = S (y) +_{ℎ} T (y)$
35	34	oveq2d	$⊢ y \in ℋ \to x \cdot_{ℎ} (S +_{op} T) (y) = x \cdot_{ℎ} (S (y) +_{ℎ} T (y))$
36	35	adantl	$⊢ (x \in ℂ \land y \in ℋ) \to x \cdot_{ℎ} (S +_{op} T) (y) = x \cdot_{ℎ} (S (y) +_{ℎ} T (y))$
37	1	lnopmuli	$⊢ (x \in ℂ \land y \in ℋ) \to S (x \cdot_{ℎ} y) = x \cdot_{ℎ} S (y)$
38	2	lnopmuli	$⊢ (x \in ℂ \land y \in ℋ) \to T (x \cdot_{ℎ} y) = x \cdot_{ℎ} T (y)$
39	37 38	oveq12d	$⊢ (x \in ℂ \land y \in ℋ) \to S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y) = (x \cdot_{ℎ} S (y)) +_{ℎ} (x \cdot_{ℎ} T (y))$
40	32 36 39	3eqtr4d	$⊢ (x \in ℂ \land y \in ℋ) \to x \cdot_{ℎ} (S +_{op} T) (y) = S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y)$
41		hosval	$⊢ (S : ℋ ⟶ ℋ \land T : ℋ ⟶ ℋ \land z \in ℋ) \to (S +_{op} T) (z) = S (z) +_{ℎ} T (z)$
42	3 4 41	mp3an12	$⊢ z \in ℋ \to (S +_{op} T) (z) = S (z) +_{ℎ} T (z)$
43	40 42	oveqan12d	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (x \cdot_{ℎ} (S +_{op} T) (y)) +_{ℎ} (S +_{op} T) (z) = (S (x \cdot_{ℎ} y) +_{ℎ} T (x \cdot_{ℎ} y)) +_{ℎ} (S (z) +_{ℎ} T (z))$
44	21 26 43	3eqtr4d	$⊢ ((x \in ℂ \land y \in ℋ) \land z \in ℋ) \to (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = (x \cdot_{ℎ} (S +_{op} T) (y)) +_{ℎ} (S +_{op} T) (z)$
45	44	ralrimiva	$⊢ (x \in ℂ \land y \in ℋ) \to \forall z \in ℋ (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = (x \cdot_{ℎ} (S +_{op} T) (y)) +_{ℎ} (S +_{op} T) (z)$
46	45	rgen2	$⊢ \forall x \in ℂ \forall y \in ℋ \forall z \in ℋ (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = (x \cdot_{ℎ} (S +_{op} T) (y)) +_{ℎ} (S +_{op} T) (z)$
47		ellnop	$⊢ S +_{op} T \in LinOp \leftrightarrow ((S +_{op} T) : ℋ ⟶ ℋ \land \forall x \in ℂ \forall y \in ℋ \forall z \in ℋ (S +_{op} T) ((x \cdot_{ℎ} y) +_{ℎ} z) = (x \cdot_{ℎ} (S +_{op} T) (y)) +_{ℎ} (S +_{op} T) (z))$
48	5 46 47	mpbir2an	$⊢ S +_{op} T \in LinOp$

Metamath Proof Explorer

Theorem lnophsi

Proof