lsslinds

Description: Linear independence is unchanged by working in a subspace. (Contributed by Stefan O'Rear, 24-Feb-2015)

	Ref	Expression
Hypotheses	lsslindf.u	\|- U = ( LSubSp ` W )
	lsslindf.x	\|- X = ( W \|`s S )
Assertion	lsslinds	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F e. ( LIndS ` X ) <-> F e. ( LIndS ` W ) ) )

Proof

Step	Hyp	Ref	Expression
1		lsslindf.u	\|- U = ( LSubSp ` W )
2		lsslindf.x	\|- X = ( W \|`s S )
3		eqid	\|- ( Base ` W ) = ( Base ` W )
4	3 1	lssss	\|- ( S e. U -> S C_ ( Base ` W ) )
5	2 3	ressbas2	\|- ( S C_ ( Base ` W ) -> S = ( Base ` X ) )
6	4 5	syl	\|- ( S e. U -> S = ( Base ` X ) )
7	6	3ad2ant2	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> S = ( Base ` X ) )
8	7	sseq2d	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F C_ S <-> F C_ ( Base ` X ) ) )
9	4	3ad2ant2	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> S C_ ( Base ` W ) )
10		sstr2	\|- ( F C_ S -> ( S C_ ( Base ` W ) -> F C_ ( Base ` W ) ) )
11	9 10	mpan9	\|- ( ( ( W e. LMod /\ S e. U /\ F C_ S ) /\ F C_ S ) -> F C_ ( Base ` W ) )
12		simpl3	\|- ( ( ( W e. LMod /\ S e. U /\ F C_ S ) /\ F C_ ( Base ` W ) ) -> F C_ S )
13	11 12	impbida	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F C_ S <-> F C_ ( Base ` W ) ) )
14	8 13	bitr3d	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F C_ ( Base ` X ) <-> F C_ ( Base ` W ) ) )
15		rnresi	\|- ran ( _I \|` F ) = F
16	15	sseq1i	\|- ( ran ( _I \|` F ) C_ S <-> F C_ S )
17	1 2	lsslindf	\|- ( ( W e. LMod /\ S e. U /\ ran ( _I \|` F ) C_ S ) -> ( ( _I \|` F ) LIndF X <-> ( _I \|` F ) LIndF W ) )
18	16 17	syl3an3br	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( ( _I \|` F ) LIndF X <-> ( _I \|` F ) LIndF W ) )
19	14 18	anbi12d	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( ( F C_ ( Base ` X ) /\ ( _I \|` F ) LIndF X ) <-> ( F C_ ( Base ` W ) /\ ( _I \|` F ) LIndF W ) ) )
20	2	ovexi	\|- X e. _V
21		eqid	\|- ( Base ` X ) = ( Base ` X )
22	21	islinds	\|- ( X e. _V -> ( F e. ( LIndS ` X ) <-> ( F C_ ( Base ` X ) /\ ( _I \|` F ) LIndF X ) ) )
23	20 22	mp1i	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F e. ( LIndS ` X ) <-> ( F C_ ( Base ` X ) /\ ( _I \|` F ) LIndF X ) ) )
24	3	islinds	\|- ( W e. LMod -> ( F e. ( LIndS ` W ) <-> ( F C_ ( Base ` W ) /\ ( _I \|` F ) LIndF W ) ) )
25	24	3ad2ant1	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F e. ( LIndS ` W ) <-> ( F C_ ( Base ` W ) /\ ( _I \|` F ) LIndF W ) ) )
26	19 23 25	3bitr4d	\|- ( ( W e. LMod /\ S e. U /\ F C_ S ) -> ( F e. ( LIndS ` X ) <-> F e. ( LIndS ` W ) ) )

Metamath Proof Explorer

Theorem lsslinds

Proof