ho01i

Description: A condition implying that a Hilbert space operator is identically zero. Lemma 3.2(S8) of Beran p. 95. (Contributed by NM, 28-Jan-2006) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	ho0.1	$⊢ T : ℋ ⟶ ℋ$
	Assertion	ho01i	$⊢ \forall x \in ℋ \forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow T = 0_{hop}$

Proof

Step	Hyp	Ref	Expression
1		ho0.1	$⊢ T : ℋ ⟶ ℋ$
2		ffn	$⊢ T : ℋ ⟶ ℋ \to T Fn ℋ$
3	1 2	ax-mp	$⊢ T Fn ℋ$
4		ax-hv0cl	$⊢ 0_{ℎ} \in ℋ$
5	4	elexi	$⊢ 0_{ℎ} \in V$
6	5	fconst	$⊢ (ℋ \times \{0_{ℎ}\}) : ℋ ⟶ \{0_{ℎ}\}$
7		ffn	$⊢ (ℋ \times \{0_{ℎ}\}) : ℋ ⟶ \{0_{ℎ}\} \to (ℋ \times \{0_{ℎ}\}) Fn ℋ$
8	6 7	ax-mp	$⊢ (ℋ \times \{0_{ℎ}\}) Fn ℋ$
9		eqfnfv	$⊢ (T Fn ℋ \land (ℋ \times \{0_{ℎ}\}) Fn ℋ) \to (T = ℋ \times \{0_{ℎ}\} \leftrightarrow \forall x \in ℋ T (x) = (ℋ \times \{0_{ℎ}\}) (x))$
10	3 8 9	mp2an	$⊢ T = ℋ \times \{0_{ℎ}\} \leftrightarrow \forall x \in ℋ T (x) = (ℋ \times \{0_{ℎ}\}) (x)$
11		df0op2	$⊢ 0_{hop} = ℋ \times 0_{ℋ}$
12		df-ch0	$⊢ 0_{ℋ} = \{0_{ℎ}\}$
13	12	xpeq2i	$⊢ ℋ \times 0_{ℋ} = ℋ \times \{0_{ℎ}\}$
14	11 13	eqtri	$⊢ 0_{hop} = ℋ \times \{0_{ℎ}\}$
15	14	eqeq2i	$⊢ T = 0_{hop} \leftrightarrow T = ℋ \times \{0_{ℎ}\}$
16	1	ffvelcdmi	$⊢ x \in ℋ \to T (x) \in ℋ$
17		hial0	$⊢ T (x) \in ℋ \to (\forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow T (x) = 0_{ℎ})$
18	16 17	syl	$⊢ x \in ℋ \to (\forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow T (x) = 0_{ℎ})$
19	5	fvconst2	$⊢ x \in ℋ \to (ℋ \times \{0_{ℎ}\}) (x) = 0_{ℎ}$
20	19	eqeq2d	$⊢ x \in ℋ \to (T (x) = (ℋ \times \{0_{ℎ}\}) (x) \leftrightarrow T (x) = 0_{ℎ})$
21	18 20	bitr4d	$⊢ x \in ℋ \to (\forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow T (x) = (ℋ \times \{0_{ℎ}\}) (x))$
22	21	ralbiia	$⊢ \forall x \in ℋ \forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow \forall x \in ℋ T (x) = (ℋ \times \{0_{ℎ}\}) (x)$
23	10 15 22	3bitr4ri	$⊢ \forall x \in ℋ \forall y \in ℋ T (x) \cdot_{ih} y = 0 \leftrightarrow T = 0_{hop}$

Metamath Proof Explorer

Theorem ho01i

Proof