Metamath Proof Explorer

Theorem uvtxnbgrvtx

Description: A universal vertex is neighbor of all other vertices. (Contributed by Alexander van der Vekens, 14-Oct-2017) (Revised by AV, 30-Oct-2020)

		Ref	Expression
	Hypothesis	uvtxel.v	$⊢ V = Vtx (G)$
	Assertion	uvtxnbgrvtx	$⊢ N \in UnivVtx (G) \to \forall v \in (V ∖ \{N\}) N \in (G NeighbVtx v)$

Proof

Step	Hyp	Ref	Expression
1		uvtxel.v	$⊢ V = Vtx (G)$
2	1	vtxnbuvtx	$⊢ N \in UnivVtx (G) \to \forall n \in (V ∖ \{N\}) n \in (G NeighbVtx N)$
3		eleq1w	$⊢ n = v \to (n \in (G NeighbVtx N) \leftrightarrow v \in (G NeighbVtx N))$
4	3	rspcva	$⊢ (v \in (V ∖ \{N\}) \land \forall n \in (V ∖ \{N\}) n \in (G NeighbVtx N)) \to v \in (G NeighbVtx N)$
5		nbgrsym	$⊢ v \in (G NeighbVtx N) \leftrightarrow N \in (G NeighbVtx v)$
6	5	a1i	$⊢ N \in UnivVtx (G) \to (v \in (G NeighbVtx N) \leftrightarrow N \in (G NeighbVtx v))$
7	4 6	syl5ibcom	$⊢ (v \in (V ∖ \{N\}) \land \forall n \in (V ∖ \{N\}) n \in (G NeighbVtx N)) \to (N \in UnivVtx (G) \to N \in (G NeighbVtx v))$
8	7	expcom	$⊢ \forall n \in (V ∖ \{N\}) n \in (G NeighbVtx N) \to (v \in (V ∖ \{N\}) \to (N \in UnivVtx (G) \to N \in (G NeighbVtx v)))$
9	8	com23	$⊢ \forall n \in (V ∖ \{N\}) n \in (G NeighbVtx N) \to (N \in UnivVtx (G) \to (v \in (V ∖ \{N\}) \to N \in (G NeighbVtx v)))$
10	2 9	mpcom	$⊢ N \in UnivVtx (G) \to (v \in (V ∖ \{N\}) \to N \in (G NeighbVtx v))$
11	10	ralrimiv	$⊢ N \in UnivVtx (G) \to \forall v \in (V ∖ \{N\}) N \in (G NeighbVtx v)$