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Metamath Proof Explorer

Theorem erclwwlkeqlen

Description: If two classes are equivalent regarding .~ , then they are words of the same length. (Contributed by Alexander van der Vekens, 8-Apr-2018) (Revised by AV, 29-Apr-2021)

		Ref	Expression
	Hypothesis	erclwwlk.r	\|- .~ = { <. u , w >. \| ( u e. ( ClWWalks ` G ) /\ w e. ( ClWWalks ` G ) /\ E. n e. ( 0 ... ( # ` w ) ) u = ( w cyclShift n ) ) }
	Assertion	erclwwlkeqlen	\|- ( ( U e. X /\ W e. Y ) -> ( U .~ W -> ( # ` U ) = ( # ` W ) ) )

Proof

Step	Hyp	Ref	Expression
1		erclwwlk.r	\|- .~ = { <. u , w >. \| ( u e. ( ClWWalks ` G ) /\ w e. ( ClWWalks ` G ) /\ E. n e. ( 0 ... ( # ` w ) ) u = ( w cyclShift n ) ) }
2	1	erclwwlkeq	\|- ( ( U e. X /\ W e. Y ) -> ( U .~ W <-> ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) /\ E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) ) ) )
3		fveq2	\|- ( U = ( W cyclShift n ) -> ( # ` U ) = ( # ` ( W cyclShift n ) ) )
4		eqid	\|- ( Vtx ` G ) = ( Vtx ` G )
5	4	clwwlkbp	\|- ( W e. ( ClWWalks ` G ) -> ( G e. _V /\ W e. Word ( Vtx ` G ) /\ W =/= (/) ) )
6	5	simp2d	\|- ( W e. ( ClWWalks ` G ) -> W e. Word ( Vtx ` G ) )
7	6	ad2antlr	\|- ( ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) /\ ( U e. X /\ W e. Y ) ) -> W e. Word ( Vtx ` G ) )
8		elfzelz	\|- ( n e. ( 0 ... ( # ` W ) ) -> n e. ZZ )
9		cshwlen	\|- ( ( W e. Word ( Vtx ` G ) /\ n e. ZZ ) -> ( # ` ( W cyclShift n ) ) = ( # ` W ) )
10	7 8 9	syl2an	\|- ( ( ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) /\ ( U e. X /\ W e. Y ) ) /\ n e. ( 0 ... ( # ` W ) ) ) -> ( # ` ( W cyclShift n ) ) = ( # ` W ) )
11	3 10	sylan9eqr	\|- ( ( ( ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) /\ ( U e. X /\ W e. Y ) ) /\ n e. ( 0 ... ( # ` W ) ) ) /\ U = ( W cyclShift n ) ) -> ( # ` U ) = ( # ` W ) )
12	11	rexlimdva2	\|- ( ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) /\ ( U e. X /\ W e. Y ) ) -> ( E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) -> ( # ` U ) = ( # ` W ) ) )
13	12	ex	\|- ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) -> ( ( U e. X /\ W e. Y ) -> ( E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) -> ( # ` U ) = ( # ` W ) ) ) )
14	13	com23	\|- ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) ) -> ( E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) -> ( ( U e. X /\ W e. Y ) -> ( # ` U ) = ( # ` W ) ) ) )
15	14	3impia	\|- ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) /\ E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) ) -> ( ( U e. X /\ W e. Y ) -> ( # ` U ) = ( # ` W ) ) )
16	15	com12	\|- ( ( U e. X /\ W e. Y ) -> ( ( U e. ( ClWWalks ` G ) /\ W e. ( ClWWalks ` G ) /\ E. n e. ( 0 ... ( # ` W ) ) U = ( W cyclShift n ) ) -> ( # ` U ) = ( # ` W ) ) )
17	2 16	sylbid	\|- ( ( U e. X /\ W e. Y ) -> ( U .~ W -> ( # ` U ) = ( # ` W ) ) )