limsuppnf

Description: If the restriction of a function to every upper interval is unbounded above, its limsup is +oo . (Contributed by Glauco Siliprandi, 23-Oct-2021)

	Ref	Expression
Hypotheses	limsuppnf.j	$⊢ \underline{Ⅎ} j F$
	limsuppnf.a	$⊢ φ \to A \subseteq ℝ$
	limsuppnf.f	$⊢ φ \to F : A ⟶ ℝ^{*}$
Assertion	limsuppnf	$⊢ φ \to (lim sup (F) = +∞ \leftrightarrow \forall x \in ℝ \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j)))$

Proof

Step	Hyp	Ref	Expression
1		limsuppnf.j	$⊢ \underline{Ⅎ} j F$
2		limsuppnf.a	$⊢ φ \to A \subseteq ℝ$
3		limsuppnf.f	$⊢ φ \to F : A ⟶ ℝ^{*}$
4		nfcv	$⊢ \underline{Ⅎ} l F$
5	4 2 3	limsuppnflem	$⊢ φ \to (lim sup (F) = +∞ \leftrightarrow \forall y \in ℝ \forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)))$
6		breq1	$⊢ i = k \to (i \leq l \leftrightarrow k \leq l)$
7	6	anbi1d	$⊢ i = k \to ((i \leq l \land y \leq F (l)) \leftrightarrow (k \leq l \land y \leq F (l)))$
8	7	rexbidv	$⊢ i = k \to (\exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \exists l \in A (k \leq l \land y \leq F (l)))$
9		nfv	$⊢ Ⅎ j k \leq l$
10		nfcv	$⊢ \underline{Ⅎ} j y$
11		nfcv	$⊢ \underline{Ⅎ} j \leq$
12		nfcv	$⊢ \underline{Ⅎ} j l$
13	1 12	nffv	$⊢ \underline{Ⅎ} j F (l)$
14	10 11 13	nfbr	$⊢ Ⅎ j y \leq F (l)$
15	9 14	nfan	$⊢ Ⅎ j (k \leq l \land y \leq F (l))$
16		nfv	$⊢ Ⅎ l (k \leq j \land y \leq F (j))$
17		breq2	$⊢ l = j \to (k \leq l \leftrightarrow k \leq j)$
18		fveq2	$⊢ l = j \to F (l) = F (j)$
19	18	breq2d	$⊢ l = j \to (y \leq F (l) \leftrightarrow y \leq F (j))$
20	17 19	anbi12d	$⊢ l = j \to ((k \leq l \land y \leq F (l)) \leftrightarrow (k \leq j \land y \leq F (j)))$
21	15 16 20	cbvrexw	$⊢ \exists l \in A (k \leq l \land y \leq F (l)) \leftrightarrow \exists j \in A (k \leq j \land y \leq F (j))$
22	21	a1i	$⊢ i = k \to (\exists l \in A (k \leq l \land y \leq F (l)) \leftrightarrow \exists j \in A (k \leq j \land y \leq F (j)))$
23	8 22	bitrd	$⊢ i = k \to (\exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \exists j \in A (k \leq j \land y \leq F (j)))$
24	23	cbvralvw	$⊢ \forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \forall k \in ℝ \exists j \in A (k \leq j \land y \leq F (j))$
25	24	a1i	$⊢ y = x \to (\forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \forall k \in ℝ \exists j \in A (k \leq j \land y \leq F (j)))$
26		breq1	$⊢ y = x \to (y \leq F (j) \leftrightarrow x \leq F (j))$
27	26	anbi2d	$⊢ y = x \to ((k \leq j \land y \leq F (j)) \leftrightarrow (k \leq j \land x \leq F (j)))$
28	27	rexbidv	$⊢ y = x \to (\exists j \in A (k \leq j \land y \leq F (j)) \leftrightarrow \exists j \in A (k \leq j \land x \leq F (j)))$
29	28	ralbidv	$⊢ y = x \to (\forall k \in ℝ \exists j \in A (k \leq j \land y \leq F (j)) \leftrightarrow \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j)))$
30	25 29	bitrd	$⊢ y = x \to (\forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j)))$
31	30	cbvralvw	$⊢ \forall y \in ℝ \forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \forall x \in ℝ \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j))$
32	31	a1i	$⊢ φ \to (\forall y \in ℝ \forall i \in ℝ \exists l \in A (i \leq l \land y \leq F (l)) \leftrightarrow \forall x \in ℝ \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j)))$
33	5 32	bitrd	$⊢ φ \to (lim sup (F) = +∞ \leftrightarrow \forall x \in ℝ \forall k \in ℝ \exists j \in A (k \leq j \land x \leq F (j)))$

Metamath Proof Explorer

Theorem limsuppnf

Proof