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Metamath Proof Explorer

Theorem fmla0

Description: The valid Godel formulas of height 0 is the set of all formulas of the form v_i e. v_j ("Godel-set of membership") coded as <. (/) , <. i , j >. >. . (Contributed by AV, 14-Sep-2023)

		Ref	Expression
	Assertion	fmla0	\|- ( Fmla ` (/) ) = { x e. _V \| E. i e. _om E. j e. _om x = ( i e.g j ) }

Proof

Step	Hyp	Ref	Expression
1		peano1	\|- (/) e. _om
2		elelsuc	\|- ( (/) e. _om -> (/) e. suc _om )
3		fmlafv	\|- ( (/) e. suc _om -> ( Fmla ` (/) ) = dom ( ( (/) Sat (/) ) ` (/) ) )
4	1 2 3	mp2b	\|- ( Fmla ` (/) ) = dom ( ( (/) Sat (/) ) ` (/) )
5		satf00	\|- ( ( (/) Sat (/) ) ` (/) ) = { <. x , y >. \| ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) }
6	5	dmeqi	\|- dom ( ( (/) Sat (/) ) ` (/) ) = dom { <. x , y >. \| ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) }
7		0ex	\|- (/) e. _V
8	7	isseti	\|- E. y y = (/)
9		19.41v	\|- ( E. y ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) <-> ( E. y y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) )
10	8 9	mpbiran	\|- ( E. y ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) <-> E. i e. _om E. j e. _om x = ( i e.g j ) )
11	10	abbii	\|- { x \| E. y ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) } = { x \| E. i e. _om E. j e. _om x = ( i e.g j ) }
12		dmopab	\|- dom { <. x , y >. \| ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) } = { x \| E. y ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) }
13		rabab	\|- { x e. _V \| E. i e. _om E. j e. _om x = ( i e.g j ) } = { x \| E. i e. _om E. j e. _om x = ( i e.g j ) }
14	11 12 13	3eqtr4i	\|- dom { <. x , y >. \| ( y = (/) /\ E. i e. _om E. j e. _om x = ( i e.g j ) ) } = { x e. _V \| E. i e. _om E. j e. _om x = ( i e.g j ) }
15	4 6 14	3eqtri	\|- ( Fmla ` (/) ) = { x e. _V \| E. i e. _om E. j e. _om x = ( i e.g j ) }