spthdep

Description: A simple path (at least of length 1) has different start and end points (in an undirected graph). (Contributed by AV, 31-Jan-2021) (Proof shortened by AV, 30-Oct-2021)

		Ref	Expression
	Assertion	spthdep	\|- ( ( F ( SPaths ` G ) P /\ ( # ` F ) =/= 0 ) -> ( P ` 0 ) =/= ( P ` ( # ` F ) ) )

Proof

Step	Hyp	Ref	Expression
1		isspth	\|- ( F ( SPaths ` G ) P <-> ( F ( Trails ` G ) P /\ Fun `' P ) )
2		trliswlk	\|- ( F ( Trails ` G ) P -> F ( Walks ` G ) P )
3		eqid	\|- ( Vtx ` G ) = ( Vtx ` G )
4	3	wlkp	\|- ( F ( Walks ` G ) P -> P : ( 0 ... ( # ` F ) ) --> ( Vtx ` G ) )
5	2 4	syl	\|- ( F ( Trails ` G ) P -> P : ( 0 ... ( # ` F ) ) --> ( Vtx ` G ) )
6	5	anim1i	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> ( P : ( 0 ... ( # ` F ) ) --> ( Vtx ` G ) /\ Fun `' P ) )
7		df-f1	\|- ( P : ( 0 ... ( # ` F ) ) -1-1-> ( Vtx ` G ) <-> ( P : ( 0 ... ( # ` F ) ) --> ( Vtx ` G ) /\ Fun `' P ) )
8	6 7	sylibr	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> P : ( 0 ... ( # ` F ) ) -1-1-> ( Vtx ` G ) )
9		wlkcl	\|- ( F ( Walks ` G ) P -> ( # ` F ) e. NN0 )
10		nn0fz0	\|- ( ( # ` F ) e. NN0 <-> ( # ` F ) e. ( 0 ... ( # ` F ) ) )
11	10	biimpi	\|- ( ( # ` F ) e. NN0 -> ( # ` F ) e. ( 0 ... ( # ` F ) ) )
12		0elfz	\|- ( ( # ` F ) e. NN0 -> 0 e. ( 0 ... ( # ` F ) ) )
13	11 12	jca	\|- ( ( # ` F ) e. NN0 -> ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) )
14	2 9 13	3syl	\|- ( F ( Trails ` G ) P -> ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) )
15	14	adantr	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) )
16	8 15	jca	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> ( P : ( 0 ... ( # ` F ) ) -1-1-> ( Vtx ` G ) /\ ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) ) )
17		eqcom	\|- ( ( P ` 0 ) = ( P ` ( # ` F ) ) <-> ( P ` ( # ` F ) ) = ( P ` 0 ) )
18		f1veqaeq	\|- ( ( P : ( 0 ... ( # ` F ) ) -1-1-> ( Vtx ` G ) /\ ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) ) -> ( ( P ` ( # ` F ) ) = ( P ` 0 ) -> ( # ` F ) = 0 ) )
19	17 18	biimtrid	\|- ( ( P : ( 0 ... ( # ` F ) ) -1-1-> ( Vtx ` G ) /\ ( ( # ` F ) e. ( 0 ... ( # ` F ) ) /\ 0 e. ( 0 ... ( # ` F ) ) ) ) -> ( ( P ` 0 ) = ( P ` ( # ` F ) ) -> ( # ` F ) = 0 ) )
20	16 19	syl	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> ( ( P ` 0 ) = ( P ` ( # ` F ) ) -> ( # ` F ) = 0 ) )
21	20	necon3d	\|- ( ( F ( Trails ` G ) P /\ Fun `' P ) -> ( ( # ` F ) =/= 0 -> ( P ` 0 ) =/= ( P ` ( # ` F ) ) ) )
22	1 21	sylbi	\|- ( F ( SPaths ` G ) P -> ( ( # ` F ) =/= 0 -> ( P ` 0 ) =/= ( P ` ( # ` F ) ) ) )
23	22	imp	\|- ( ( F ( SPaths ` G ) P /\ ( # ` F ) =/= 0 ) -> ( P ` 0 ) =/= ( P ` ( # ` F ) ) )

Metamath Proof Explorer

Theorem spthdep

Proof