∀L1,f.
(∀g,I,K,n. ⬇*[n] L1 ≘ K.ⓘ{I} → ↑g = ⫱*[n] f → sex_transitive RN1 RN2 RN RN1 RP1 g K I) →
(∀g,I,K,n. ⬇*[n] L1 ≘ K.ⓘ{I} → ⫯g = ⫱*[n] f → sex_transitive RP1 RP2 RP RN1 RP1 g K I) →
- ∀L0. L1 ⪤[RN1, RP1, f] L0 →
- ∀L2. L0 ⪤[RN2, RP2, f] L2 →
- L1 ⪤[RN, RP, f] L2.
+ ∀L0. L1 ⪤[RN1,RP1,f] L0 →
+ ∀L2. L0 ⪤[RN2,RP2,f] L2 →
+ L1 ⪤[RN,RP,f] L2.
#RN1 #RP1 #RN2 #RP2 #RN #RP #L1 elim L1 -L1
[ #f #_ #_ #L0 #H1 #L2 #H2
lapply (sex_inv_atom1 … H1) -H1 #H destruct
Transitive … (sex RN RP f).
/2 width=9 by sex_trans_gen/ qed-.
-theorem sex_trans_id_cfull: ∀R1,R2,R3,L1,L,f. L1 ⪤[R1, cfull, f] L → 𝐈⦃f⦄ →
- ∀L2. L ⪤[R2, cfull, f] L2 → L1 ⪤[R3, cfull, f] L2.
+theorem sex_trans_id_cfull: ∀R1,R2,R3,L1,L,f. L1 ⪤[R1,cfull,f] L → 𝐈⦃f⦄ →
+ ∀L2. L ⪤[R2,cfull,f] L2 → L1 ⪤[R3,cfull,f] L2.
#R1 #R2 #R3 #L1 #L #f #H elim H -L1 -L -f
[ #f #Hf #L2 #H >(sex_inv_atom1 … H) -L2 // ]
#f #I1 #I #K1 #K #HK1 #_ #IH #Hf #L2 #H
/3 width=3 by/ qed-.
lemma sex_meet: ∀RN,RP,L1,L2.
- ∀f1. L1 ⪤[RN, RP, f1] L2 →
- ∀f2. L1 ⪤[RN, RP, f2] L2 →
- ∀f. f1 ⋒ f2 ≘ f → L1 ⪤[RN, RP, f] L2.
+ ∀f1. L1 ⪤[RN,RP,f1] L2 →
+ ∀f2. L1 ⪤[RN,RP,f2] L2 →
+ ∀f. f1 ⋒ f2 ≘ f → L1 ⪤[RN,RP,f] L2.
#RN #RP #L1 #L2 #f1 #H elim H -f1 -L1 -L2 //
#f1 #I1 #I2 #L1 #L2 #_ #HI12 #IH #f2 #H #f #Hf
elim (pn_split f2) * #g2 #H2 destruct
qed-.
lemma sex_join: ∀RN,RP,L1,L2.
- ∀f1. L1 ⪤[RN, RP, f1] L2 →
- ∀f2. L1 ⪤[RN, RP, f2] L2 →
- ∀f. f1 ⋓ f2 ≘ f → L1 ⪤[RN, RP, f] L2.
+ ∀f1. L1 ⪤[RN,RP,f1] L2 →
+ ∀f2. L1 ⪤[RN,RP,f2] L2 →
+ ∀f. f1 ⋓ f2 ≘ f → L1 ⪤[RN,RP,f] L2.
#RN #RP #L1 #L2 #f1 #H elim H -f1 -L1 -L2 //
#f1 #I1 #I2 #L1 #L2 #_ #HI12 #IH #f2 #H #f #Hf
elim (pn_split f2) * #g2 #H2 destruct