Metamath Proof Explorer

Theorem isclwlke

Description: Properties of a pair of functions to be a closed walk (in an undirected graph). (Contributed by Alexander van der Vekens, 24-Jun-2018) (Revised by AV, 16-Feb-2021)

		Ref	Expression
	Hypotheses	isclwlke.v	$⊢ V = Vtx (G)$
		isclwlke.i	$⊢ I = iEdg (G)$
	Assertion	isclwlke	$⊢ G \in X \to (F ClWalks (G) P \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land (\forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k))) \land P (0) = P (\|F\|))))$

Proof

Step	Hyp	Ref	Expression
1		isclwlke.v	$⊢ V = Vtx (G)$
2		isclwlke.i	$⊢ I = iEdg (G)$
3		isclwlk	$⊢ F ClWalks (G) P \leftrightarrow (F Walks (G) P \land P (0) = P (\|F\|))$
4	1 2	iswlkg	$⊢ G \in X \to (F Walks (G) P \leftrightarrow (F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k)))))$
5		df-3an	$⊢ (F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k)))) \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k))))$
6	4 5	bitrdi	$⊢ G \in X \to (F Walks (G) P \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k)))))$
7	6	anbi1d	$⊢ G \in X \to ((F Walks (G) P \land P (0) = P (\|F\|)) \leftrightarrow (((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k)))) \land P (0) = P (\|F\|)))$
8		anass	$⊢ (((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land \forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k)))) \land P (0) = P (\|F\|)) \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land (\forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k))) \land P (0) = P (\|F\|)))$
9	7 8	bitrdi	$⊢ G \in X \to ((F Walks (G) P \land P (0) = P (\|F\|)) \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land (\forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k))) \land P (0) = P (\|F\|))))$
10	3 9	syl5bb	$⊢ G \in X \to (F ClWalks (G) P \leftrightarrow ((F \in Word dom I \land P : (0 \dots \|F\|) ⟶ V) \land (\forall k \in (0 ..^\|F\|) if- (P (k) = P (k + 1), I (F (k)) = \{P (k)\}, \{P (k), P (k + 1)\} \subseteq I (F (k))) \land P (0) = P (\|F\|))))$