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Metamath Proof Explorer

Theorem upgristrl

Description: Properties of a pair of functions to be a trail in a pseudograph, definition of walks expanded. (Contributed by Alexander van der Vekens, 20-Oct-2017) (Revised by AV, 7-Jan-2021) (Revised by AV, 29-Oct-2021)

Ref

Expression

Hypotheses

upgrtrls.v

|- V = ( Vtx ` G )

upgrtrls.i

|- I = ( iEdg ` G )

Assertion

|- ( G e. UPGraph -> ( F ( Trails ` G ) P <-> ( ( F e. Word dom I /\ Fun `' F ) /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )

Proof

Step	Hyp	Ref	Expression
1		upgrtrls.v	\|- V = ( Vtx ` G )
2		upgrtrls.i	\|- I = ( iEdg ` G )
3		istrl	\|- ( F ( Trails ` G ) P <-> ( F ( Walks ` G ) P /\ Fun `' F ) )
4	1 2	upgriswlk	\|- ( G e. UPGraph -> ( F ( Walks ` G ) P <-> ( F e. Word dom I /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )
5	4	anbi1d	\|- ( G e. UPGraph -> ( ( F ( Walks ` G ) P /\ Fun `' F ) <-> ( ( F e. Word dom I /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) /\ Fun `' F ) ) )
6		an32	\|- ( ( ( F e. Word dom I /\ ( P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) /\ Fun `' F ) <-> ( ( F e. Word dom I /\ Fun `' F ) /\ ( P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )
7		3anass	\|- ( ( F e. Word dom I /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) <-> ( F e. Word dom I /\ ( P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )
8	7	anbi1i	\|- ( ( ( F e. Word dom I /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) /\ Fun `' F ) <-> ( ( F e. Word dom I /\ ( P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) /\ Fun `' F ) )
9		3anass	\|- ( ( ( F e. Word dom I /\ Fun `' F ) /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) <-> ( ( F e. Word dom I /\ Fun `' F ) /\ ( P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )
10	6 8 9	3bitr4i	\|- ( ( ( F e. Word dom I /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) /\ Fun `' F ) <-> ( ( F e. Word dom I /\ Fun `' F ) /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) )
11	5 10	bitrdi	\|- ( G e. UPGraph -> ( ( F ( Walks ` G ) P /\ Fun `' F ) <-> ( ( F e. Word dom I /\ Fun `' F ) /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )
12	3 11	bitrid	\|- ( G e. UPGraph -> ( F ( Trails ` G ) P <-> ( ( F e. Word dom I /\ Fun `' F ) /\ P : ( 0 ... ( # ` F ) ) --> V /\ A. k e. ( 0 ..^ ( # ` F ) ) ( I ` ( F ` k ) ) = { ( P ` k ) , ( P ` ( k + 1 ) ) } ) ) )