0cnfn

Description: The identically zero function is a continuous Hilbert space functional. (Contributed by NM, 7-Feb-2006) (New usage is discouraged.)

		Ref	Expression
	Assertion	0cnfn	$⊢ ℋ \times \{0\} \in ContFn$

Proof

Step	Hyp	Ref	Expression
1		0cn	$⊢ 0 \in ℂ$
2	1	fconst6	$⊢ (ℋ \times \{0\}) : ℋ ⟶ ℂ$
3		1rp	$⊢ 1 \in ℝ^{+}$
4		c0ex	$⊢ 0 \in V$
5	4	fvconst2	$⊢ w \in ℋ \to (ℋ \times \{0\}) (w) = 0$
6	4	fvconst2	$⊢ x \in ℋ \to (ℋ \times \{0\}) (x) = 0$
7	5 6	oveqan12rd	$⊢ (x \in ℋ \land w \in ℋ) \to (ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x) = 0 - 0$
8	7	adantlr	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to (ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x) = 0 - 0$
9		0m0e0	$⊢ 0 - 0 = 0$
10	8 9	eqtrdi	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to (ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x) = 0$
11	10	fveq2d	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| = \|0\|$
12		abs0	$⊢ \|0\| = 0$
13	11 12	eqtrdi	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| = 0$
14		rpgt0	$⊢ y \in ℝ^{+} \to 0 < y$
15	14	ad2antlr	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to 0 < y$
16	13 15	eqbrtrd	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y$
17	16	a1d	$⊢ ((x \in ℋ \land y \in ℝ^{+}) \land w \in ℋ) \to ({norm}_{ℎ} (w -_{ℎ} x) < 1 \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)$
18	17	ralrimiva	$⊢ (x \in ℋ \land y \in ℝ^{+}) \to \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < 1 \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)$
19		breq2	$⊢ z = 1 \to ({norm}_{ℎ} (w -_{ℎ} x) < z \leftrightarrow {norm}_{ℎ} (w -_{ℎ} x) < 1)$
20	19	rspceaimv	$⊢ (1 \in ℝ^{+} \land \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < 1 \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)) \to \exists z \in ℝ^{+} \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < z \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)$
21	3 18 20	sylancr	$⊢ (x \in ℋ \land y \in ℝ^{+}) \to \exists z \in ℝ^{+} \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < z \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)$
22	21	rgen2	$⊢ \forall x \in ℋ \forall y \in ℝ^{+} \exists z \in ℝ^{+} \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < z \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y)$
23		elcnfn	$⊢ ℋ \times \{0\} \in ContFn \leftrightarrow ((ℋ \times \{0\}) : ℋ ⟶ ℂ \land \forall x \in ℋ \forall y \in ℝ^{+} \exists z \in ℝ^{+} \forall w \in ℋ ({norm}_{ℎ} (w -_{ℎ} x) < z \to \|(ℋ \times \{0\}) (w) - (ℋ \times \{0\}) (x)\| < y))$
24	2 22 23	mpbir2an	$⊢ ℋ \times \{0\} \in ContFn$

Metamath Proof Explorer

Theorem 0cnfn

Proof