pthacycspth

Description: A path in an acyclic graph is a simple path. (Contributed by BTernaryTau, 21-Oct-2023)

		Ref	Expression
	Assertion	pthacycspth	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to F SPaths (G) P$

Step	Hyp	Ref	Expression
1		cyclispth	$⊢ F Cycles (G) P \to F Paths (G) P$
2	1	a1i	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F Cycles (G) P \to F Paths (G) P)$
3		acycgrcycl	$⊢ (G \in AcyclicGraph \land F Cycles (G) P) \to F = \emptyset$
4	3	ex	$⊢ G \in AcyclicGraph \to (F Cycles (G) P \to F = \emptyset)$
5	4	adantr	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F Cycles (G) P \to F = \emptyset)$
6	2 5	jcad	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F Cycles (G) P \to (F Paths (G) P \land F = \emptyset))$
7		spthcycl	$⊢ (F Paths (G) P \land F = \emptyset) \leftrightarrow (F SPaths (G) P \land F Cycles (G) P)$
8	7	simplbi	$⊢ (F Paths (G) P \land F = \emptyset) \to F SPaths (G) P$
9	6 8	syl6	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F Cycles (G) P \to F SPaths (G) P)$
10		pthisspthorcycl	$⊢ F Paths (G) P \to (F SPaths (G) P \lor F Cycles (G) P)$
11	10	adantl	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F SPaths (G) P \lor F Cycles (G) P)$
12		orim2	$⊢ (F Cycles (G) P \to F SPaths (G) P) \to ((F SPaths (G) P \lor F Cycles (G) P) \to (F SPaths (G) P \lor F SPaths (G) P))$
13	9 11 12	sylc	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to (F SPaths (G) P \lor F SPaths (G) P)$
14		pm1.2	$⊢ (F SPaths (G) P \lor F SPaths (G) P) \to F SPaths (G) P$
15	13 14	syl	$⊢ (G \in AcyclicGraph \land F Paths (G) P) \to F SPaths (G) P$

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