df-fin1a

Description: A set is Ia-finite iff it is not the union of two I-infinite sets. Equivalent to definition Ia of Levy58 p. 2. A I-infinite Ia-finite set is also known as an amorphous set. This is the second of Levy's eight definitions of finite set. Levy's I-finite is equivalent to our df-fin and not repeated here. These eight definitions are equivalent with Choice but strictly decreasing in strength in models where Choice fails; conversely, they provide a series of increasingly stronger notions of infiniteness. (Contributed by Stefan O'Rear, 12-Nov-2014)

		Ref	Expression
	Assertion	df-fin1a	$⊢ {Fin}^{Ia} = \{x \| \forall y \in 𝒫 x (y \in Fin \lor x ∖ y \in Fin)\}$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cfin1a	$class {Fin}^{Ia}$
1		vx	$setvar x$
2		vy	$setvar y$
3	1	cv	$setvar x$
4	3	cpw	$class 𝒫 x$
5	2	cv	$setvar y$
6		cfn	$class Fin$
7	5 6	wcel	$wff y \in Fin$
8	3 5	cdif	$class (x ∖ y)$
9	8 6	wcel	$wff x ∖ y \in Fin$
10	7 9	wo	$wff (y \in Fin \lor x ∖ y \in Fin)$
11	10 2 4	wral	$wff \forall y \in 𝒫 x (y \in Fin \lor x ∖ y \in Fin)$
12	11 1	cab	$class \{x \| \forall y \in 𝒫 x (y \in Fin \lor x ∖ y \in Fin)\}$
13	0 12	wceq	$wff {Fin}^{Ia} = \{x \| \forall y \in 𝒫 x (y \in Fin \lor x ∖ y \in Fin)\}$

Metamath Proof Explorer

Definition df-fin1a

Detailed syntax breakdown