infdju1

Description: An infinite set is equinumerous to itself added with one. (Contributed by Mario Carneiro, 15-May-2015)

		Ref	Expression
	Assertion	infdju1	$⊢ ω ≼ A \to (A ⊔︀ 1_{𝑜}) \approx A$

Proof

Step	Hyp	Ref	Expression
1		difun2	$⊢ ((\{\emptyset\} \times A) \cup (\{1_{𝑜}\} \times 1_{𝑜})) ∖ (\{1_{𝑜}\} \times 1_{𝑜}) = (\{\emptyset\} \times A) ∖ (\{1_{𝑜}\} \times 1_{𝑜})$
2		df-dju	$⊢ (A ⊔︀ 1_{𝑜}) = (\{\emptyset\} \times A) \cup (\{1_{𝑜}\} \times 1_{𝑜})$
3		df1o2	$⊢ 1_{𝑜} = \{\emptyset\}$
4	3	xpeq2i	$⊢ \{1_{𝑜}\} \times 1_{𝑜} = \{1_{𝑜}\} \times \{\emptyset\}$
5		1oex	$⊢ 1_{𝑜} \in V$
6		0ex	$⊢ \emptyset \in V$
7	5 6	xpsn	$⊢ \{1_{𝑜}\} \times \{\emptyset\} = \{⟨1_{𝑜}, \emptyset⟩\}$
8	4 7	eqtr2i	$⊢ \{⟨1_{𝑜}, \emptyset⟩\} = \{1_{𝑜}\} \times 1_{𝑜}$
9	2 8	difeq12i	$⊢ (A ⊔︀ 1_{𝑜}) ∖ \{⟨1_{𝑜}, \emptyset⟩\} = ((\{\emptyset\} \times A) \cup (\{1_{𝑜}\} \times 1_{𝑜})) ∖ (\{1_{𝑜}\} \times 1_{𝑜})$
10		xp01disjl	$⊢ (\{\emptyset\} \times A) \cap (\{1_{𝑜}\} \times 1_{𝑜}) = \emptyset$
11		disj3	$⊢ (\{\emptyset\} \times A) \cap (\{1_{𝑜}\} \times 1_{𝑜}) = \emptyset \leftrightarrow \{\emptyset\} \times A = (\{\emptyset\} \times A) ∖ (\{1_{𝑜}\} \times 1_{𝑜})$
12	10 11	mpbi	$⊢ \{\emptyset\} \times A = (\{\emptyset\} \times A) ∖ (\{1_{𝑜}\} \times 1_{𝑜})$
13	1 9 12	3eqtr4i	$⊢ (A ⊔︀ 1_{𝑜}) ∖ \{⟨1_{𝑜}, \emptyset⟩\} = \{\emptyset\} \times A$
14		reldom	$⊢ Rel ≼$
15	14	brrelex2i	$⊢ ω ≼ A \to A \in V$
16		1on	$⊢ 1_{𝑜} \in On$
17		djudoml	$⊢ (A \in V \land 1_{𝑜} \in On) \to A ≼ (A ⊔︀ 1_{𝑜})$
18	15 16 17	sylancl	$⊢ ω ≼ A \to A ≼ (A ⊔︀ 1_{𝑜})$
19		domtr	$⊢ (ω ≼ A \land A ≼ (A ⊔︀ 1_{𝑜})) \to ω ≼ (A ⊔︀ 1_{𝑜})$
20	18 19	mpdan	$⊢ ω ≼ A \to ω ≼ (A ⊔︀ 1_{𝑜})$
21		infdifsn	$⊢ ω ≼ (A ⊔︀ 1_{𝑜}) \to ((A ⊔︀ 1_{𝑜}) ∖ \{⟨1_{𝑜}, \emptyset⟩\}) \approx (A ⊔︀ 1_{𝑜})$
22	20 21	syl	$⊢ ω ≼ A \to ((A ⊔︀ 1_{𝑜}) ∖ \{⟨1_{𝑜}, \emptyset⟩\}) \approx (A ⊔︀ 1_{𝑜})$
23	13 22	eqbrtrrid	$⊢ ω ≼ A \to (\{\emptyset\} \times A) \approx (A ⊔︀ 1_{𝑜})$
24	23	ensymd	$⊢ ω ≼ A \to (A ⊔︀ 1_{𝑜}) \approx (\{\emptyset\} \times A)$
25		xpsnen2g	$⊢ (\emptyset \in V \land A \in V) \to (\{\emptyset\} \times A) \approx A$
26	6 15 25	sylancr	$⊢ ω ≼ A \to (\{\emptyset\} \times A) \approx A$
27		entr	$⊢ ((A ⊔︀ 1_{𝑜}) \approx (\{\emptyset\} \times A) \land (\{\emptyset\} \times A) \approx A) \to (A ⊔︀ 1_{𝑜}) \approx A$
28	24 26 27	syl2anc	$⊢ ω ≼ A \to (A ⊔︀ 1_{𝑜}) \approx A$

Metamath Proof Explorer

Theorem infdju1

Proof