+lemma reduce_bas_seq:
+ ∀O:ordered_set.∀a:nat→O.∀p.∀i.
+ bas_seq ? (mk_bounded_above_sequence ? a p) i = a i.
+ intros;
+ reflexivity.
+qed.
+
+(*lemma reduce_bbs_seq:
+ ∀C.∀O:ordered_set C.∀a:nat→O.∀p.∀i.
+ bbs_seq ? ? (mk_bounded_below_sequence ? ? a p) i = a i.
+ intros;
+ reflexivity.
+qed.*)
+
+axiom inf_extensional:
+ ∀O:dedekind_sigma_complete_ordered_set.
+ ∀a,b:bounded_below_sequence O.
+ (∀i.a i = b i) → inf ? a = inf O b.
+
+lemma eq_to_le: ∀O:ordered_set.∀x,y:O.x=y → x ≤ y.
+ intros;
+ rewrite > H;
+ apply (or_reflexive ? ? O).
+qed.
+