2pthfrgrrn

Description: Between any two (different) vertices in a friendship graph is a 2-path (path of length 2), see Proposition 1(b) of MertziosUnger p. 153 : "A friendship graph G ..., as well as the distance between any two nodes in G is at most two". (Contributed by Alexander van der Vekens, 15-Nov-2017) (Revised by AV, 1-Apr-2021)

	Ref	Expression
Hypotheses	2pthfrgrrn.v	$⊢ V = Vtx (G)$
	2pthfrgrrn.e	$⊢ E = Edg (G)$
Assertion	2pthfrgrrn	$⊢ G \in FriendGraph \to \forall a \in V \forall c \in (V ∖ \{a\}) \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E)$

Proof

Step	Hyp	Ref	Expression
1		2pthfrgrrn.v	$⊢ V = Vtx (G)$
2		2pthfrgrrn.e	$⊢ E = Edg (G)$
3	1 2	isfrgr	$⊢ G \in FriendGraph \leftrightarrow (G \in USGraph \land \forall a \in V \forall c \in (V ∖ \{a\}) \exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E)$
4		reurex	$⊢ \exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E \to \exists b \in V \{\{b, a\}, \{b, c\}\} \subseteq E$
5		prcom	$⊢ \{a, b\} = \{b, a\}$
6	5	eleq1i	$⊢ \{a, b\} \in E \leftrightarrow \{b, a\} \in E$
7	6	anbi1i	$⊢ (\{a, b\} \in E \land \{b, c\} \in E) \leftrightarrow (\{b, a\} \in E \land \{b, c\} \in E)$
8		zfpair2	$⊢ \{b, a\} \in V$
9		zfpair2	$⊢ \{b, c\} \in V$
10	8 9	prss	$⊢ (\{b, a\} \in E \land \{b, c\} \in E) \leftrightarrow \{\{b, a\}, \{b, c\}\} \subseteq E$
11	7 10	sylbbr	$⊢ \{\{b, a\}, \{b, c\}\} \subseteq E \to (\{a, b\} \in E \land \{b, c\} \in E)$
12	11	reximi	$⊢ \exists b \in V \{\{b, a\}, \{b, c\}\} \subseteq E \to \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E)$
13	4 12	syl	$⊢ \exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E \to \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E)$
14	13	a1i	$⊢ (G \in USGraph \land (a \in V \land c \in (V ∖ \{a\}))) \to (\exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E \to \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E))$
15	14	ralimdvva	$⊢ G \in USGraph \to (\forall a \in V \forall c \in (V ∖ \{a\}) \exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E \to \forall a \in V \forall c \in (V ∖ \{a\}) \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E))$
16	15	imp	$⊢ (G \in USGraph \land \forall a \in V \forall c \in (V ∖ \{a\}) \exists! b \in V \{\{b, a\}, \{b, c\}\} \subseteq E) \to \forall a \in V \forall c \in (V ∖ \{a\}) \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E)$
17	3 16	sylbi	$⊢ G \in FriendGraph \to \forall a \in V \forall c \in (V ∖ \{a\}) \exists b \in V (\{a, b\} \in E \land \{b, c\} \in E)$

Metamath Proof Explorer

Theorem 2pthfrgrrn

Proof