(* Properties on pointwise union for local environments **********************)
lemma llpx_sn_llor_dx: ∀R. (s_r_confluent1 … R (llpx_sn R 0)) → (frees_trans R) →
- ∀L1,L2,T,d. llpx_sn R d T L1 L2 → ∀L. L1 ⋓[T, d] L2 ≡ L → L2 ≡[T, d] L.
-#R #H1R #H2R #L1 #L2 #T #d #H1 #L #H2
+ ∀L1,L2,T,l. llpx_sn R l T L1 L2 → ∀L. L1 ⋓[T, l] L2 ≡ L → L2 ≡[T, l] L.
+#R #H1R #H2R #L1 #L2 #T #l #H1 #L #H2
lapply (llpx_sn_frees_trans … H1R H2R … H1) -H1R -H2R #HR
elim (llpx_sn_llpx_sn_alt … H1) -H1 #HL12 #IH1
elim H2 -H2 #_ #HL1 #IH2
qed.
lemma llpx_sn_llor_dx_sym: ∀R. (s_r_confluent1 … R (llpx_sn R 0)) → (frees_trans R) →
- ∀L1,L2,T,d. llpx_sn R d T L1 L2 → ∀L. L1 ⋓[T, d] L2 ≡ L → L ≡[T, d] L2.
+ ∀L1,L2,T,l. llpx_sn R l T L1 L2 → ∀L. L1 ⋓[T, l] L2 ≡ L → L ≡[T, l] L2.
/3 width=6 by llpx_sn_llor_dx, lleq_sym/ qed.