Metamath Proof Explorer

Theorem spthdifv

Description: The vertices of a simple path are distinct, so the vertex function is one-to-one. (Contributed by Alexander van der Vekens, 26-Jan-2018) (Revised by AV, 5-Jun-2021) (Proof shortened by AV, 30-Oct-2021)

		Ref	Expression
	Assertion	spthdifv	$⊢ F SPaths (G) P \to P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G)$

Proof

Step	Hyp	Ref	Expression
1		isspth	$⊢ F SPaths (G) P \leftrightarrow (F Trails (G) P \land Fun P^{-1})$
2		trliswlk	$⊢ F Trails (G) P \to F Walks (G) P$
3		eqid	$⊢ Vtx (G) = Vtx (G)$
4	3	wlkp	$⊢ F Walks (G) P \to P : (0 \dots \|F\|) ⟶ Vtx (G)$
5		df-f1	$⊢ P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G) \leftrightarrow (P : (0 \dots \|F\|) ⟶ Vtx (G) \land Fun P^{-1})$
6	5	simplbi2	$⊢ P : (0 \dots \|F\|) ⟶ Vtx (G) \to (Fun P^{-1} \to P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G))$
7	2 4 6	3syl	$⊢ F Trails (G) P \to (Fun P^{-1} \to P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G))$
8	7	imp	$⊢ (F Trails (G) P \land Fun P^{-1}) \to P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G)$
9	1 8	sylbi	$⊢ F SPaths (G) P \to P : (0 \dots \|F\|) \underset{1-1}{⟶} Vtx (G)$