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Metamath Proof Explorer

Theorem clwwlkndivn

Description: The size of the set of closed walks (defined as words) of length N is divisible by N if N is a prime number. (Contributed by Alexander van der Vekens, 17-Jun-2018) (Revised by AV, 2-May-2021)

		Ref	Expression
	Assertion	clwwlkndivn	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> N \|\| ( # ` ( N ClWWalksN G ) ) )

Proof

Step	Hyp	Ref	Expression
1		eqid	\|- ( Vtx ` G ) = ( Vtx ` G )
2	1	fusgrvtxfi	\|- ( G e. FinUSGraph -> ( Vtx ` G ) e. Fin )
3	2	adantr	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> ( Vtx ` G ) e. Fin )
4		eqid	\|- ( N ClWWalksN G ) = ( N ClWWalksN G )
5		eqid	\|- { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } = { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) }
6	4 5	qerclwwlknfi	\|- ( ( Vtx ` G ) e. Fin -> ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) e. Fin )
7		hashcl	\|- ( ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) e. Fin -> ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) e. NN0 )
8	3 6 7	3syl	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) e. NN0 )
9	8	nn0zd	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) e. ZZ )
10		prmz	\|- ( N e. Prime -> N e. ZZ )
11	10	adantl	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> N e. ZZ )
12		dvdsmul2	\|- ( ( ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) e. ZZ /\ N e. ZZ ) -> N \|\| ( ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) x. N ) )
13	9 11 12	syl2anc	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> N \|\| ( ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) x. N ) )
14	4 5	fusgrhashclwwlkn	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> ( # ` ( N ClWWalksN G ) ) = ( ( # ` ( ( N ClWWalksN G ) /. { <. t , u >. \| ( t e. ( N ClWWalksN G ) /\ u e. ( N ClWWalksN G ) /\ E. n e. ( 0 ... N ) t = ( u cyclShift n ) ) } ) ) x. N ) )
15	13 14	breqtrrd	\|- ( ( G e. FinUSGraph /\ N e. Prime ) -> N \|\| ( # ` ( N ClWWalksN G ) ) )