Metamath Proof Explorer


Theorem dalemcnes

Description: Lemma for dath . Frequently-used utility lemma. (Contributed by NM, 13-Aug-2012)

Ref Expression
Hypotheses dalema.ph φ K HL C Base K P A Q A R A S A T A U A Y O Z O ¬ C ˙ P ˙ Q ¬ C ˙ Q ˙ R ¬ C ˙ R ˙ P ¬ C ˙ S ˙ T ¬ C ˙ T ˙ U ¬ C ˙ U ˙ S C ˙ P ˙ S C ˙ Q ˙ T C ˙ R ˙ U
dalemc.l ˙ = K
dalemc.j ˙ = join K
dalemc.a A = Atoms K
Assertion dalemcnes φ C S

Proof

Step Hyp Ref Expression
1 dalema.ph φ K HL C Base K P A Q A R A S A T A U A Y O Z O ¬ C ˙ P ˙ Q ¬ C ˙ Q ˙ R ¬ C ˙ R ˙ P ¬ C ˙ S ˙ T ¬ C ˙ T ˙ U ¬ C ˙ U ˙ S C ˙ P ˙ S C ˙ Q ˙ T C ˙ R ˙ U
2 dalemc.l ˙ = K
3 dalemc.j ˙ = join K
4 dalemc.a A = Atoms K
5 1 dalemkelat φ K Lat
6 1 4 dalemceb φ C Base K
7 1 4 dalemseb φ S Base K
8 1 4 dalemteb φ T Base K
9 simp321 K HL C Base K P A Q A R A S A T A U A Y O Z O ¬ C ˙ P ˙ Q ¬ C ˙ Q ˙ R ¬ C ˙ R ˙ P ¬ C ˙ S ˙ T ¬ C ˙ T ˙ U ¬ C ˙ U ˙ S C ˙ P ˙ S C ˙ Q ˙ T C ˙ R ˙ U ¬ C ˙ S ˙ T
10 1 9 sylbi φ ¬ C ˙ S ˙ T
11 eqid Base K = Base K
12 11 2 3 latnlej1l K Lat C Base K S Base K T Base K ¬ C ˙ S ˙ T C S
13 5 6 7 8 10 12 syl131anc φ C S