paddasslem13

Description: Lemma for paddass . The case when r .<_ ( x .\/ y ) . (Unlike the proof in Maeda and Maeda, we don't need x =/= y .) (Contributed by NM, 11-Jan-2012)

	Ref	Expression
Hypotheses	paddasslem.l	\|- .<_ = ( le ` K )
	paddasslem.j	\|- .\/ = ( join ` K )
	paddasslem.a	\|- A = ( Atoms ` K )
	paddasslem.p	\|- .+ = ( +P ` K )
Assertion	paddasslem13	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p e. ( ( X .+ Y ) .+ Z ) )

Proof

Step	Hyp	Ref	Expression
1		paddasslem.l	\|- .<_ = ( le ` K )
2		paddasslem.j	\|- .\/ = ( join ` K )
3		paddasslem.a	\|- A = ( Atoms ` K )
4		paddasslem.p	\|- .+ = ( +P ` K )
5		simpl1l	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> K e. HL )
6		simpl21	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> X C_ A )
7		simpl22	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> Y C_ A )
8	3 4	paddssat	\|- ( ( K e. HL /\ X C_ A /\ Y C_ A ) -> ( X .+ Y ) C_ A )
9	5 6 7 8	syl3anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( X .+ Y ) C_ A )
10		simpl23	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> Z C_ A )
11	3 4	sspadd1	\|- ( ( K e. HL /\ ( X .+ Y ) C_ A /\ Z C_ A ) -> ( X .+ Y ) C_ ( ( X .+ Y ) .+ Z ) )
12	5 9 10 11	syl3anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( X .+ Y ) C_ ( ( X .+ Y ) .+ Z ) )
13	5	hllatd	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> K e. Lat )
14		simprll	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> x e. X )
15		simprlr	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> y e. Y )
16		simpl3l	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p e. A )
17		eqid	\|- ( Base ` K ) = ( Base ` K )
18	17 3	atbase	\|- ( p e. A -> p e. ( Base ` K ) )
19	16 18	syl	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p e. ( Base ` K ) )
20	6 14	sseldd	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> x e. A )
21	17 3	atbase	\|- ( x e. A -> x e. ( Base ` K ) )
22	20 21	syl	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> x e. ( Base ` K ) )
23		simpl3r	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> r e. A )
24	17 3	atbase	\|- ( r e. A -> r e. ( Base ` K ) )
25	23 24	syl	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> r e. ( Base ` K ) )
26	17 2	latjcl	\|- ( ( K e. Lat /\ x e. ( Base ` K ) /\ r e. ( Base ` K ) ) -> ( x .\/ r ) e. ( Base ` K ) )
27	13 22 25 26	syl3anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( x .\/ r ) e. ( Base ` K ) )
28	7 15	sseldd	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> y e. A )
29	17 3	atbase	\|- ( y e. A -> y e. ( Base ` K ) )
30	28 29	syl	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> y e. ( Base ` K ) )
31	17 2	latjcl	\|- ( ( K e. Lat /\ x e. ( Base ` K ) /\ y e. ( Base ` K ) ) -> ( x .\/ y ) e. ( Base ` K ) )
32	13 22 30 31	syl3anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( x .\/ y ) e. ( Base ` K ) )
33		simprrr	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p .<_ ( x .\/ r ) )
34	17 1 2	latlej1	\|- ( ( K e. Lat /\ x e. ( Base ` K ) /\ y e. ( Base ` K ) ) -> x .<_ ( x .\/ y ) )
35	13 22 30 34	syl3anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> x .<_ ( x .\/ y ) )
36		simprrl	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> r .<_ ( x .\/ y ) )
37	17 1 2	latjle12	\|- ( ( K e. Lat /\ ( x e. ( Base ` K ) /\ r e. ( Base ` K ) /\ ( x .\/ y ) e. ( Base ` K ) ) ) -> ( ( x .<_ ( x .\/ y ) /\ r .<_ ( x .\/ y ) ) <-> ( x .\/ r ) .<_ ( x .\/ y ) ) )
38	13 22 25 32 37	syl13anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( ( x .<_ ( x .\/ y ) /\ r .<_ ( x .\/ y ) ) <-> ( x .\/ r ) .<_ ( x .\/ y ) ) )
39	35 36 38	mpbi2and	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> ( x .\/ r ) .<_ ( x .\/ y ) )
40	17 1 13 19 27 32 33 39	lattrd	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p .<_ ( x .\/ y ) )
41	1 2 3 4	elpaddri	\|- ( ( ( K e. Lat /\ X C_ A /\ Y C_ A ) /\ ( x e. X /\ y e. Y ) /\ ( p e. A /\ p .<_ ( x .\/ y ) ) ) -> p e. ( X .+ Y ) )
42	13 6 7 14 15 16 40 41	syl322anc	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p e. ( X .+ Y ) )
43	12 42	sseldd	\|- ( ( ( ( K e. HL /\ p =/= z ) /\ ( X C_ A /\ Y C_ A /\ Z C_ A ) /\ ( p e. A /\ r e. A ) ) /\ ( ( x e. X /\ y e. Y ) /\ ( r .<_ ( x .\/ y ) /\ p .<_ ( x .\/ r ) ) ) ) -> p e. ( ( X .+ Y ) .+ Z ) )

Metamath Proof Explorer

Theorem paddasslem13

Proof