canthwdom

Description: Cantor's Theorem, stated using weak dominance (this is actually a stronger statement than canth2 , equivalent to canth ). (Contributed by Mario Carneiro, 15-May-2015)

		Ref	Expression
	Assertion	canthwdom	$⊢ \neg 𝒫 A ≼^{*} A$

Proof

Step	Hyp	Ref	Expression
1		0elpw	$⊢ \emptyset \in 𝒫 A$
2		ne0i	$⊢ \emptyset \in 𝒫 A \to 𝒫 A \neq \emptyset$
3	1 2	mp1i	$⊢ 𝒫 A ≼^{*} A \to 𝒫 A \neq \emptyset$
4		brwdomn0	$⊢ 𝒫 A \neq \emptyset \to (𝒫 A ≼^{*} A \leftrightarrow \exists f f : A \underset{onto}{⟶} 𝒫 A)$
5	3 4	syl	$⊢ 𝒫 A ≼^{} A \to (𝒫 A ≼^{} A \leftrightarrow \exists f f : A \underset{onto}{⟶} 𝒫 A)$
6	5	ibi	$⊢ 𝒫 A ≼^{*} A \to \exists f f : A \underset{onto}{⟶} 𝒫 A$
7		relwdom	$⊢ Rel ≼^{*}$
8	7	brrelex2i	$⊢ 𝒫 A ≼^{*} A \to A \in V$
9		foeq2	$⊢ x = A \to (f : x \underset{onto}{⟶} 𝒫 x \leftrightarrow f : A \underset{onto}{⟶} 𝒫 x)$
10		pweq	$⊢ x = A \to 𝒫 x = 𝒫 A$
11		foeq3	$⊢ 𝒫 x = 𝒫 A \to (f : A \underset{onto}{⟶} 𝒫 x \leftrightarrow f : A \underset{onto}{⟶} 𝒫 A)$
12	10 11	syl	$⊢ x = A \to (f : A \underset{onto}{⟶} 𝒫 x \leftrightarrow f : A \underset{onto}{⟶} 𝒫 A)$
13	9 12	bitrd	$⊢ x = A \to (f : x \underset{onto}{⟶} 𝒫 x \leftrightarrow f : A \underset{onto}{⟶} 𝒫 A)$
14	13	notbid	$⊢ x = A \to (\neg f : x \underset{onto}{⟶} 𝒫 x \leftrightarrow \neg f : A \underset{onto}{⟶} 𝒫 A)$
15		vex	$⊢ x \in V$
16	15	canth	$⊢ \neg f : x \underset{onto}{⟶} 𝒫 x$
17	14 16	vtoclg	$⊢ A \in V \to \neg f : A \underset{onto}{⟶} 𝒫 A$
18	8 17	syl	$⊢ 𝒫 A ≼^{*} A \to \neg f : A \underset{onto}{⟶} 𝒫 A$
19	18	nexdv	$⊢ 𝒫 A ≼^{*} A \to \neg \exists f f : A \underset{onto}{⟶} 𝒫 A$
20	6 19	pm2.65i	$⊢ \neg 𝒫 A ≼^{*} A$

Metamath Proof Explorer

Theorem canthwdom

Proof