iblempty

Description: The empty function is integrable. (Contributed by Glauco Siliprandi, 11-Dec-2019)

		Ref	Expression
	Assertion	iblempty	$⊢ \emptyset \in 𝐿^{1}$

Proof

Step	Hyp	Ref	Expression
1		mbf0	$⊢ \emptyset \in MblFn$
2		fconstmpt	$⊢ ℝ \times \{0\} = (x \in ℝ ⟼ 0)$
3	2	eqcomi	$⊢ (x \in ℝ ⟼ 0) = ℝ \times \{0\}$
4	3	fveq2i	$⊢ \int^{2} ((x \in ℝ ⟼ 0)) = \int^{2} (ℝ \times \{0\})$
5		itg20	$⊢ \int^{2} (ℝ \times \{0\}) = 0$
6	4 5	eqtri	$⊢ \int^{2} ((x \in ℝ ⟼ 0)) = 0$
7		0re	$⊢ 0 \in ℝ$
8	6 7	eqeltri	$⊢ \int^{2} ((x \in ℝ ⟼ 0)) \in ℝ$
9	8	rgenw	$⊢ \forall k \in (0 \dots 3) \int^{2} ((x \in ℝ ⟼ 0)) \in ℝ$
10		noel	$⊢ \neg x \in \emptyset$
11	10	intnanr	$⊢ \neg (x \in \emptyset \land 0 \leq ℜ (\frac{0}{i^{k}}))$
12	11	iffalsei	$⊢ if ((x \in \emptyset \land 0 \leq ℜ (\frac{0}{i^{k}})), ℜ (\frac{0}{i^{k}}), 0) = 0$
13	12	eqcomi	$⊢ 0 = if ((x \in \emptyset \land 0 \leq ℜ (\frac{0}{i^{k}})), ℜ (\frac{0}{i^{k}}), 0)$
14	13	a1i	$⊢ (⊤ \land x \in ℝ) \to 0 = if ((x \in \emptyset \land 0 \leq ℜ (\frac{0}{i^{k}})), ℜ (\frac{0}{i^{k}}), 0)$
15	14	mpteq2dva	$⊢ ⊤ \to (x \in ℝ ⟼ 0) = (x \in ℝ ⟼ if ((x \in \emptyset \land 0 \leq ℜ (\frac{0}{i^{k}})), ℜ (\frac{0}{i^{k}}), 0))$
16		eqidd	$⊢ (⊤ \land x \in \emptyset) \to ℜ (\frac{0}{i^{k}}) = ℜ (\frac{0}{i^{k}})$
17		dm0	$⊢ dom \emptyset = \emptyset$
18	17	a1i	$⊢ ⊤ \to dom \emptyset = \emptyset$
19	10	intnan	$⊢ \neg (⊤ \land x \in \emptyset)$
20	19	pm2.21i	$⊢ (⊤ \land x \in \emptyset) \to \emptyset (x) = 0$
21	15 16 18 20	isibl	$⊢ ⊤ \to (\emptyset \in 𝐿^{1} \leftrightarrow (\emptyset \in MblFn \land \forall k \in (0 \dots 3) \int^{2} ((x \in ℝ ⟼ 0)) \in ℝ))$
22	21	mptru	$⊢ \emptyset \in 𝐿^{1} \leftrightarrow (\emptyset \in MblFn \land \forall k \in (0 \dots 3) \int^{2} ((x \in ℝ ⟼ 0)) \in ℝ)$
23	1 9 22	mpbir2an	$⊢ \emptyset \in 𝐿^{1}$

Metamath Proof Explorer

Theorem iblempty

Proof