uvtxupgrres

Description: A universal vertex is universal in a restricted pseudograph. (Contributed by Alexander van der Vekens, 2-Jan-2018) (Revised by AV, 8-Nov-2020)

	Ref	Expression
Hypotheses	nbupgruvtxres.v	\|- V = ( Vtx ` G )
	nbupgruvtxres.e	\|- E = ( Edg ` G )
	nbupgruvtxres.f	\|- F = { e e. E \| N e/ e }
	nbupgruvtxres.s	\|- S = <. ( V \ { N } ) , ( _I \|` F ) >.
Assertion	uvtxupgrres	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( K e. ( UnivVtx ` G ) -> K e. ( UnivVtx ` S ) ) )

Proof

Step	Hyp	Ref	Expression
1		nbupgruvtxres.v	\|- V = ( Vtx ` G )
2		nbupgruvtxres.e	\|- E = ( Edg ` G )
3		nbupgruvtxres.f	\|- F = { e e. E \| N e/ e }
4		nbupgruvtxres.s	\|- S = <. ( V \ { N } ) , ( _I \|` F ) >.
5	1	uvtxnbgr	\|- ( K e. ( UnivVtx ` G ) -> ( G NeighbVtx K ) = ( V \ { K } ) )
6	1 2 3 4	nbupgruvtxres	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( ( G NeighbVtx K ) = ( V \ { K } ) -> ( S NeighbVtx K ) = ( V \ { N , K } ) ) )
7	6	imp	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> ( S NeighbVtx K ) = ( V \ { N , K } ) )
8		difpr	\|- ( V \ { N , K } ) = ( ( V \ { N } ) \ { K } )
9	1 2 3 4	upgrres1lem2	\|- ( Vtx ` S ) = ( V \ { N } )
10	9	difeq1i	\|- ( ( Vtx ` S ) \ { K } ) = ( ( V \ { N } ) \ { K } )
11	10	a1i	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( ( Vtx ` S ) \ { K } ) = ( ( V \ { N } ) \ { K } ) )
12	8 11	eqtr4id	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( V \ { N , K } ) = ( ( Vtx ` S ) \ { K } ) )
13	12	adantr	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> ( V \ { N , K } ) = ( ( Vtx ` S ) \ { K } ) )
14	7 13	eqtrd	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> ( S NeighbVtx K ) = ( ( Vtx ` S ) \ { K } ) )
15		simpr	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> K e. ( V \ { N } ) )
16	15 9	eleqtrrdi	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> K e. ( Vtx ` S ) )
17	16	adantr	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> K e. ( Vtx ` S ) )
18		eqid	\|- ( Vtx ` S ) = ( Vtx ` S )
19	18	uvtxnbgrb	\|- ( K e. ( Vtx ` S ) -> ( K e. ( UnivVtx ` S ) <-> ( S NeighbVtx K ) = ( ( Vtx ` S ) \ { K } ) ) )
20	17 19	syl	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> ( K e. ( UnivVtx ` S ) <-> ( S NeighbVtx K ) = ( ( Vtx ` S ) \ { K } ) ) )
21	14 20	mpbird	\|- ( ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) /\ ( G NeighbVtx K ) = ( V \ { K } ) ) -> K e. ( UnivVtx ` S ) )
22	21	ex	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( ( G NeighbVtx K ) = ( V \ { K } ) -> K e. ( UnivVtx ` S ) ) )
23	5 22	syl5	\|- ( ( ( G e. UPGraph /\ N e. V ) /\ K e. ( V \ { N } ) ) -> ( K e. ( UnivVtx ` G ) -> K e. ( UnivVtx ` S ) ) )

Metamath Proof Explorer

Theorem uvtxupgrres

Proof