dvadiaN

Description: Any closed subspace is a member of the range of partial isomorphism A, showing the isomorphism maps onto the set of closed subspaces of partial vector space A. (Contributed by NM, 17-Jan-2014) (New usage is discouraged.)

	Ref	Expression
Hypotheses	dvadia.h	\|- H = ( LHyp ` K )
	dvadia.u	\|- U = ( ( DVecA ` K ) ` W )
	dvadia.i	\|- I = ( ( DIsoA ` K ) ` W )
	dvadia.n	\|- ._\|_ = ( ( ocA ` K ) ` W )
	dvadia.s	\|- S = ( LSubSp ` U )
Assertion	dvadiaN	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> X e. ran I )

Proof

Step	Hyp	Ref	Expression
1		dvadia.h	\|- H = ( LHyp ` K )
2		dvadia.u	\|- U = ( ( DVecA ` K ) ` W )
3		dvadia.i	\|- I = ( ( DIsoA ` K ) ` W )
4		dvadia.n	\|- ._\|_ = ( ( ocA ` K ) ` W )
5		dvadia.s	\|- S = ( LSubSp ` U )
6		simprr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> ( ._\|_ ` ( ._\|_ ` X ) ) = X )
7		eqid	\|- ( Base ` U ) = ( Base ` U )
8	7 5	lssss	\|- ( X e. S -> X C_ ( Base ` U ) )
9	8	ad2antrl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> X C_ ( Base ` U ) )
10		eqid	\|- ( ( LTrn ` K ) ` W ) = ( ( LTrn ` K ) ` W )
11	1 10 2 7	dvavbase	\|- ( ( K e. HL /\ W e. H ) -> ( Base ` U ) = ( ( LTrn ` K ) ` W ) )
12	11	adantr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> ( Base ` U ) = ( ( LTrn ` K ) ` W ) )
13	9 12	sseqtrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> X C_ ( ( LTrn ` K ) ` W ) )
14	1 10 3 4	docaclN	\|- ( ( ( K e. HL /\ W e. H ) /\ X C_ ( ( LTrn ` K ) ` W ) ) -> ( ._\|_ ` X ) e. ran I )
15	13 14	syldan	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> ( ._\|_ ` X ) e. ran I )
16	1 10 3	diaelrnN	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ._\|_ ` X ) e. ran I ) -> ( ._\|_ ` X ) C_ ( ( LTrn ` K ) ` W ) )
17	15 16	syldan	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> ( ._\|_ ` X ) C_ ( ( LTrn ` K ) ` W ) )
18	1 10 3 4	docaclN	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ._\|_ ` X ) C_ ( ( LTrn ` K ) ` W ) ) -> ( ._\|_ ` ( ._\|_ ` X ) ) e. ran I )
19	17 18	syldan	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> ( ._\|_ ` ( ._\|_ ` X ) ) e. ran I )
20	6 19	eqeltrrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. S /\ ( ._\|_ ` ( ._\|_ ` X ) ) = X ) ) -> X e. ran I )

Metamath Proof Explorer

Theorem dvadiaN

Proof