lcvat

Description: If a subspace covers another, it equals the other joined with some atom. This is a consequence of relative atomicity. ( cvati analog.) (Contributed by NM, 11-Jan-2015)

	Ref	Expression
Hypotheses	lcvat.s	\|- S = ( LSubSp ` W )
	lcvat.p	\|- .(+) = ( LSSum ` W )
	lcvat.a	\|- A = ( LSAtoms ` W )
	icvat.c	\|- C = (
	lcvat.w	\|- ( ph -> W e. LMod )
	lcvat.t	\|- ( ph -> T e. S )
	lcvat.u	\|- ( ph -> U e. S )
	lcvat.l	\|- ( ph -> T C U )
Assertion	lcvat	\|- ( ph -> E. q e. A ( T .(+) q ) = U )

Proof

Step	Hyp	Ref	Expression
1		lcvat.s	\|- S = ( LSubSp ` W )
2		lcvat.p	\|- .(+) = ( LSSum ` W )
3		lcvat.a	\|- A = ( LSAtoms ` W )
4		icvat.c	\|- C = (
5		lcvat.w	\|- ( ph -> W e. LMod )
6		lcvat.t	\|- ( ph -> T e. S )
7		lcvat.u	\|- ( ph -> U e. S )
8		lcvat.l	\|- ( ph -> T C U )
9	1 4 5 6 7 8	lcvpss	\|- ( ph -> T C. U )
10	1 2 3 5 6 7 9	lrelat	\|- ( ph -> E. q e. A ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) )
11	5	3ad2ant1	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> W e. LMod )
12	6	3ad2ant1	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> T e. S )
13	7	3ad2ant1	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> U e. S )
14		simp2	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> q e. A )
15	1 3 11 14	lsatlssel	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> q e. S )
16	1 2	lsmcl	\|- ( ( W e. LMod /\ T e. S /\ q e. S ) -> ( T .(+) q ) e. S )
17	11 12 15 16	syl3anc	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> ( T .(+) q ) e. S )
18	8	3ad2ant1	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> T C U )
19		simp3l	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> T C. ( T .(+) q ) )
20		simp3r	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> ( T .(+) q ) C_ U )
21	1 4 11 12 13 17 18 19 20	lcvnbtwn2	\|- ( ( ph /\ q e. A /\ ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) ) -> ( T .(+) q ) = U )
22	21	3exp	\|- ( ph -> ( q e. A -> ( ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) -> ( T .(+) q ) = U ) ) )
23	22	reximdvai	\|- ( ph -> ( E. q e. A ( T C. ( T .(+) q ) /\ ( T .(+) q ) C_ U ) -> E. q e. A ( T .(+) q ) = U ) )
24	10 23	mpd	\|- ( ph -> E. q e. A ( T .(+) q ) = U )

Metamath Proof Explorer

Theorem lcvat

Proof