+*)
+
+(* Set theory *)
+
+nlemma subseteq_intersection_l: ∀A.∀U,V,W:Ω^A.U ⊆ W ∨ V ⊆ W → U ∩ V ⊆ W.
+#A; #U; #V; #W; *; #H; #x; *; /2/.
+nqed.
+
+nlemma subseteq_union_l: ∀A.∀U,V,W:Ω^A.U ⊆ W → V ⊆ W → U ∪ V ⊆ W.
+#A; #U; #V; #W; #H; #H1; #x; *; /2/.
+nqed.
+
+nlemma subseteq_intersection_r: ∀A.∀U,V,W:Ω^A.W ⊆ U → W ⊆ V → W ⊆ U ∩ V.
+/3/. nqed.
+
+nlemma cupC : ∀S. ∀a,b:Ω^S.a ∪ b = b ∪ a.
+#S a b; @; #w; *; nnormalize; /2/; nqed.
+
+nlemma cupID : ∀S. ∀a:Ω^S.a ∪ a = a.
+#S a; @; #w; ##[*; //] /2/; nqed.
+
+(* XXX Bug notazione \cup, niente parentesi *)
+nlemma cupA : ∀S.∀a,b,c:Ω^S.a ∪ b ∪ c = a ∪ (b ∪ c).
+#S a b c; @; #w; *; /3/; *; /3/; nqed.
+
+ndefinition Empty_set : ∀A.Ω^A ≝ λA.{ x | False }.
+
+notation "∅" non associative with precedence 90 for @{ 'empty }.
+interpretation "empty set" 'empty = (Empty_set ?).
+
+nlemma cup0 :∀S.∀A:Ω^S.A ∪ ∅ = A.
+#S p; @; #w; ##[*; //| #; @1; //] *; nqed.
+