Metamath Proof Explorer

Theorem hcau

Description: Member of the set of Cauchy sequences on a Hilbert space. Definition for Cauchy sequence in Beran p. 96. (Contributed by NM, 16-Aug-1999) (Revised by Mario Carneiro, 14-May-2014) (New usage is discouraged.)

		Ref	Expression
	Assertion	hcau	$⊢ F \in Cauchy \leftrightarrow (F : ℕ ⟶ ℋ \land \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$

Proof

Step	Hyp	Ref	Expression
1		fveq1	$⊢ f = F \to f (y) = F (y)$
2		fveq1	$⊢ f = F \to f (z) = F (z)$
3	1 2	oveq12d	$⊢ f = F \to f (y) -_{ℎ} f (z) = F (y) -_{ℎ} F (z)$
4	3	fveq2d	$⊢ f = F \to {norm}_{ℎ} (f (y) -_{ℎ} f (z)) = {norm}_{ℎ} (F (y) -_{ℎ} F (z))$
5	4	breq1d	$⊢ f = F \to ({norm}_{ℎ} (f (y) -_{ℎ} f (z)) < x \leftrightarrow {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$
6	5	rexralbidv	$⊢ f = F \to (\exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (f (y) -_{ℎ} f (z)) < x \leftrightarrow \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$
7	6	ralbidv	$⊢ f = F \to (\forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (f (y) -_{ℎ} f (z)) < x \leftrightarrow \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$
8		df-hcau	$⊢ Cauchy = \{f \in (ℋ^{ℕ}) \| \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (f (y) -_{ℎ} f (z)) < x\}$
9	7 8	elrab2	$⊢ F \in Cauchy \leftrightarrow (F \in (ℋ^{ℕ}) \land \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$
10		ax-hilex	$⊢ ℋ \in V$
11		nnex	$⊢ ℕ \in V$
12	10 11	elmap	$⊢ F \in (ℋ^{ℕ}) \leftrightarrow F : ℕ ⟶ ℋ$
13	12	anbi1i	$⊢ (F \in (ℋ^{ℕ}) \land \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x) \leftrightarrow (F : ℕ ⟶ ℋ \land \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$
14	9 13	bitri	$⊢ F \in Cauchy \leftrightarrow (F : ℕ ⟶ ℋ \land \forall x \in ℝ^{+} \exists y \in ℕ \forall z \in ℤ_{\geq y} {norm}_{ℎ} (F (y) -_{ℎ} F (z)) < x)$