Metamath Proof Explorer

Theorem rusgrpropnb

Description: The properties of a k-regular simple graph expressed with neighbors. (Contributed by Alexander van der Vekens, 26-Jul-2018) (Revised by AV, 26-Dec-2020)

		Ref	Expression
	Hypothesis	rusgrpropnb.v	$⊢ V = Vtx (G)$
	Assertion	rusgrpropnb	$⊢ G RegUSGraph K \to (G \in USGraph \land K \in ℕ_{0}^{*} \land \forall v \in V \|G NeighbVtx v\| = K)$

Proof

Step	Hyp	Ref	Expression
1		rusgrpropnb.v	$⊢ V = Vtx (G)$
2		eqid	$⊢ VtxDeg (G) = VtxDeg (G)$
3	1 2	rusgrprop0	$⊢ G RegUSGraph K \to (G \in USGraph \land K \in ℕ_{0}^{*} \land \forall v \in V VtxDeg (G) (v) = K)$
4		simp1	$⊢ (G \in USGraph \land K \in ℕ_{0}^{*} \land \forall v \in V VtxDeg (G) (v) = K) \to G \in USGraph$
5		simp2	$⊢ (G \in USGraph \land K \in ℕ_{0}^{} \land \forall v \in V VtxDeg (G) (v) = K) \to K \in ℕ_{0}^{}$
6	1	hashnbusgrvd	$⊢ (G \in USGraph \land v \in V) \to \|G NeighbVtx v\| = VtxDeg (G) (v)$
7	6	adantlr	$⊢ ((G \in USGraph \land K \in ℕ_{0}^{*}) \land v \in V) \to \|G NeighbVtx v\| = VtxDeg (G) (v)$
8		eqeq2	$⊢ K = VtxDeg (G) (v) \to (\|G NeighbVtx v\| = K \leftrightarrow \|G NeighbVtx v\| = VtxDeg (G) (v))$
9	8	eqcoms	$⊢ VtxDeg (G) (v) = K \to (\|G NeighbVtx v\| = K \leftrightarrow \|G NeighbVtx v\| = VtxDeg (G) (v))$
10	7 9	syl5ibrcom	$⊢ ((G \in USGraph \land K \in ℕ_{0}^{*}) \land v \in V) \to (VtxDeg (G) (v) = K \to \|G NeighbVtx v\| = K)$
11	10	ralimdva	$⊢ (G \in USGraph \land K \in ℕ_{0}^{*}) \to (\forall v \in V VtxDeg (G) (v) = K \to \forall v \in V \|G NeighbVtx v\| = K)$
12	11	3impia	$⊢ (G \in USGraph \land K \in ℕ_{0}^{*} \land \forall v \in V VtxDeg (G) (v) = K) \to \forall v \in V \|G NeighbVtx v\| = K$
13	4 5 12	3jca	$⊢ (G \in USGraph \land K \in ℕ_{0}^{} \land \forall v \in V VtxDeg (G) (v) = K) \to (G \in USGraph \land K \in ℕ_{0}^{} \land \forall v \in V \|G NeighbVtx v\| = K)$
14	3 13	syl	$⊢ G RegUSGraph K \to (G \in USGraph \land K \in ℕ_{0}^{*} \land \forall v \in V \|G NeighbVtx v\| = K)$