--- /dev/null
+(**************************************************************************)
+(* ___ *)
+(* ||M|| *)
+(* ||A|| A project by Andrea Asperti *)
+(* ||T|| *)
+(* ||I|| Developers: *)
+(* ||T|| The HELM team. *)
+(* ||A|| http://helm.cs.unibo.it *)
+(* \ / *)
+(* \ / This file is distributed under the terms of the *)
+(* v GNU General Public License Version 2 *)
+(* *)
+(**************************************************************************)
+
+include "re/lang.ma".
+
+inductive re (S: DeqSet) : Type[0] ≝
+ z: re S
+ | e: re S
+ | s: S → re S
+ | c: re S → re S → re S
+ | o: re S → re S → re S
+ | k: re S → re S.
+
+interpretation "re epsilon" 'epsilon = (e ?).
+interpretation "re or" 'plus a b = (o ? a b).
+interpretation "re cat" 'middot a b = (c ? a b).
+interpretation "re star" 'star a = (k ? a).
+
+notation < "a" non associative with precedence 90 for @{ 'ps $a}.
+notation > "` term 90 a" non associative with precedence 90 for @{ 'ps $a}.
+interpretation "atom" 'ps a = (s ? a).
+
+notation "`∅" non associative with precedence 90 for @{ 'empty }.
+interpretation "empty" 'empty = (z ?).
+
+let rec in_l (S : DeqSet) (r : re S) on r : word S → Prop ≝
+match r with
+[ z ⇒ ∅
+| e ⇒ {ϵ}
+| s x ⇒ {[x]}
+| c r1 r2 ⇒ (in_l ? r1) · (in_l ? r2)
+| o r1 r2 ⇒ (in_l ? r1) ∪ (in_l ? r2)
+| k r1 ⇒ (in_l ? r1) ^*].
+
+notation "\sem{term 19 E}" non associative with precedence 75 for @{'in_l $E}.
+interpretation "in_l" 'in_l E = (in_l ? E).
+interpretation "in_l mem" 'mem w l = (in_l ? l w).
+
+lemma rsem_star : ∀S.∀r: re S. \sem{r^*} = \sem{r}^*.
+// qed.
+
+
+(* pointed items *)
+inductive pitem (S: DeqSet) : Type[0] ≝
+ pz: pitem S
+ | pe: pitem S
+ | ps: S → pitem S
+ | pp: S → pitem S
+ | pc: pitem S → pitem S → pitem S
+ | po: pitem S → pitem S → pitem S
+ | pk: pitem S → pitem S.
+
+definition pre ≝ λS.pitem S × bool.
+
+interpretation "pitem star" 'star a = (pk ? a).
+interpretation "pitem or" 'plus a b = (po ? a b).
+interpretation "pitem cat" 'middot a b = (pc ? a b).
+notation < ".a" non associative with precedence 90 for @{ 'pp $a}.
+notation > "`. term 90 a" non associative with precedence 90 for @{ 'pp $a}.
+interpretation "pitem pp" 'pp a = (pp ? a).
+interpretation "pitem ps" 'ps a = (ps ? a).
+interpretation "pitem epsilon" 'epsilon = (pe ?).
+interpretation "pitem empty" 'empty = (pz ?).
+
+let rec forget (S: DeqSet) (l : pitem S) on l: re S ≝
+ match l with
+ [ pz ⇒ `∅
+ | pe ⇒ ϵ
+ | ps x ⇒ `x
+ | pp x ⇒ `x
+ | pc E1 E2 ⇒ (forget ? E1) · (forget ? E2)
+ | po E1 E2 ⇒ (forget ? E1) + (forget ? E2)
+ | pk E ⇒ (forget ? E)^* ].
+
+(* notation < "|term 19 e|" non associative with precedence 70 for @{'forget $e}.*)
+interpretation "forget" 'norm a = (forget ? a).
+
+let rec in_pl (S : DeqSet) (r : pitem S) on r : word S → Prop ≝
+match r with
+[ pz ⇒ ∅
+| pe ⇒ ∅
+| ps _ ⇒ ∅
+| pp x ⇒ { [x] }
+| pc r1 r2 ⇒ (in_pl ? r1) · \sem{forget ? r2} ∪ (in_pl ? r2)
+| po r1 r2 ⇒ (in_pl ? r1) ∪ (in_pl ? r2)
+| pk r1 ⇒ (in_pl ? r1) · \sem{forget ? r1}^* ].
+
+interpretation "in_pl" 'in_l E = (in_pl ? E).
+interpretation "in_pl mem" 'mem w l = (in_pl ? l w).
+
+definition in_prl ≝ λS : DeqSet.λp:pre S.
+ if (\snd p) then \sem{\fst p} ∪ {ϵ} else \sem{\fst p}.
+
+interpretation "in_prl mem" 'mem w l = (in_prl ? l w).
+interpretation "in_prl" 'in_l E = (in_prl ? E).
+
+lemma sem_pre_true : ∀S.∀i:pitem S.
+ \sem{〈i,true〉} = \sem{i} ∪ {ϵ}.
+// qed.
+
+lemma sem_pre_false : ∀S.∀i:pitem S.
+ \sem{〈i,false〉} = \sem{i}.
+// qed.
+
+lemma sem_cat: ∀S.∀i1,i2:pitem S.
+ \sem{i1 · i2} = \sem{i1} · \sem{|i2|} ∪ \sem{i2}.
+// qed.
+
+lemma sem_cat_w: ∀S.∀i1,i2:pitem S.∀w.
+ \sem{i1 · i2} w = ((\sem{i1} · \sem{|i2|}) w ∨ \sem{i2} w).
+// qed.
+
+lemma sem_plus: ∀S.∀i1,i2:pitem S.
+ \sem{i1 + i2} = \sem{i1} ∪ \sem{i2}.
+// qed.
+
+lemma sem_plus_w: ∀S.∀i1,i2:pitem S.∀w.
+ \sem{i1 + i2} w = (\sem{i1} w ∨ \sem{i2} w).
+// qed.
+
+lemma sem_star : ∀S.∀i:pitem S.
+ \sem{i^*} = \sem{i} · \sem{|i|}^*.
+// qed.
+
+lemma sem_star_w : ∀S.∀i:pitem S.∀w.
+ \sem{i^*} w = (∃w1,w2.w1 @ w2 = w ∧ \sem{i} w1 ∧ \sem{|i|}^* w2).
+// qed.
+
+lemma append_eq_nil : ∀S.∀w1,w2:word S. w1 @ w2 = ϵ → w1 = ϵ.
+#S #w1 #w2 cases w1 // #a #tl normalize #H destruct qed.
+
+lemma not_epsilon_lp : ∀S:DeqSet.∀e:pitem S. ¬ (ϵ ∈ e).
+#S #e elim e normalize /2/
+ [#r1 #r2 * #n1 #n2 % * /2/ * #w1 * #w2 * * #H
+ >(append_eq_nil …H…) /2/
+ |#r1 #r2 #n1 #n2 % * /2/
+ |#r #n % * #w1 * #w2 * * #H >(append_eq_nil …H…) /2/
+ ]
+qed.
+
+(* lemma 12 *)
+lemma epsilon_to_true : ∀S.∀e:pre S. ϵ ∈ e → \snd e = true.
+#S * #i #b cases b // normalize #H @False_ind /2/
+qed.
+
+lemma true_to_epsilon : ∀S.∀e:pre S. \snd e = true → ϵ ∈ e.
+#S * #i #b #btrue normalize in btrue; >btrue %2 //
+qed.
+
+definition lo ≝ λS:DeqSet.λa,b:pre S.〈\fst a + \fst b,\snd a ∨ \snd b〉.
+notation "a ⊕ b" left associative with precedence 60 for @{'oplus $a $b}.
+interpretation "oplus" 'oplus a b = (lo ? a b).
+
+lemma lo_def: ∀S.∀i1,i2:pitem S.∀b1,b2. 〈i1,b1〉⊕〈i2,b2〉=〈i1+i2,b1∨b2〉.
+// qed.
+
+definition pre_concat_r ≝ λS:DeqSet.λi:pitem S.λe:pre S.
+ match e with [ mk_Prod i1 b ⇒ 〈i · i1, b〉].
+
+notation "i ◂ e" left associative with precedence 60 for @{'ltrif $i $e}.
+interpretation "pre_concat_r" 'ltrif i e = (pre_concat_r ? i e).
+
+lemma eq_to_ex_eq: ∀S.∀A,B:word S → Prop.
+ A = B → A =1 B.
+#S #A #B #H >H /2/ qed.
+
+lemma sem_pre_concat_r : ∀S,i.∀e:pre S.
+ \sem{i ◂ e} =1 \sem{i} · \sem{|\fst e|} ∪ \sem{e}.
+#S #i * #i1 #b1 cases b1 [2: @eq_to_ex_eq //]
+>sem_pre_true >sem_cat >sem_pre_true /2/
+qed.
+
+definition lc ≝ λS:DeqSet.λbcast:∀S:DeqSet.pitem S → pre S.λe1:pre S.λi2:pitem S.
+ match e1 with
+ [ mk_Prod i1 b1 ⇒ match b1 with
+ [ true ⇒ (i1 ◂ (bcast ? i2))
+ | false ⇒ 〈i1 · i2,false〉
+ ]
+ ].
+
+definition lift ≝ λS.λf:pitem S →pre S.λe:pre S.
+ match e with
+ [ mk_Prod i b ⇒ 〈\fst (f i), \snd (f i) ∨ b〉].
+
+notation "a ▸ b" left associative with precedence 60 for @{'lc eclose $a $b}.
+interpretation "lc" 'lc op a b = (lc ? op a b).
+
+definition lk ≝ λS:DeqSet.λbcast:∀S:DeqSet.∀E:pitem S.pre S.λe:pre S.
+ match e with
+ [ mk_Prod i1 b1 ⇒
+ match b1 with
+ [true ⇒ 〈(\fst (bcast ? i1))^*, true〉
+ |false ⇒ 〈i1^*,false〉
+ ]
+ ].
+
+(* notation < "a \sup ⊛" non associative with precedence 90 for @{'lk $op $a}.*)
+interpretation "lk" 'lk op a = (lk ? op a).
+notation "a^⊛" non associative with precedence 90 for @{'lk eclose $a}.
+
+notation "•" non associative with precedence 60 for @{eclose ?}.
+
+let rec eclose (S: DeqSet) (i: pitem S) on i : pre S ≝
+ match i with
+ [ pz ⇒ 〈 `∅, false 〉
+ | pe ⇒ 〈 ϵ, true 〉
+ | ps x ⇒ 〈 `.x, false〉
+ | pp x ⇒ 〈 `.x, false 〉
+ | po i1 i2 ⇒ •i1 ⊕ •i2
+ | pc i1 i2 ⇒ •i1 ▸ i2
+ | pk i ⇒ 〈(\fst (•i))^*,true〉].
+
+notation "• x" non associative with precedence 60 for @{'eclose $x}.
+interpretation "eclose" 'eclose x = (eclose ? x).
+
+lemma eclose_plus: ∀S:DeqSet.∀i1,i2:pitem S.
+ •(i1 + i2) = •i1 ⊕ •i2.
+// qed.
+
+lemma eclose_dot: ∀S:DeqSet.∀i1,i2:pitem S.
+ •(i1 · i2) = •i1 ▸ i2.
+// qed.
+
+lemma eclose_star: ∀S:DeqSet.∀i:pitem S.
+ •i^* = 〈(\fst(•i))^*,true〉.
+// qed.
+
+definition reclose ≝ λS. lift S (eclose S).
+interpretation "reclose" 'eclose x = (reclose ? x).
+
+(* theorem 16: 2 *)
+lemma sem_oplus: ∀S:DeqSet.∀e1,e2:pre S.
+ \sem{e1 ⊕ e2} =1 \sem{e1} ∪ \sem{e2}.
+#S * #i1 #b1 * #i2 #b2 #w %
+ [cases b1 cases b2 normalize /2/ * /3/ * /3/
+ |cases b1 cases b2 normalize /2/ * /3/ * /3/
+ ]
+qed.
+
+lemma odot_true :
+ ∀S.∀i1,i2:pitem S.
+ 〈i1,true〉 ▸ i2 = i1 ◂ (•i2).
+// qed.
+
+lemma odot_true_bis :
+ ∀S.∀i1,i2:pitem S.
+ 〈i1,true〉 ▸ i2 = 〈i1 · \fst (•i2), \snd (•i2)〉.
+#S #i1 #i2 normalize cases (•i2) // qed.
+
+lemma odot_false:
+ ∀S.∀i1,i2:pitem S.
+ 〈i1,false〉 ▸ i2 = 〈i1 · i2, false〉.
+// qed.
+
+lemma LcatE : ∀S.∀e1,e2:pitem S.
+ \sem{e1 · e2} = \sem{e1} · \sem{|e2|} ∪ \sem{e2}.
+// qed.
+
+lemma erase_dot : ∀S.∀e1,e2:pitem S. |e1 · e2| = c ? (|e1|) (|e2|).
+// qed.
+
+lemma erase_plus : ∀S.∀i1,i2:pitem S.
+ |i1 + i2| = |i1| + |i2|.
+// qed.
+
+lemma erase_star : ∀S.∀i:pitem S.|i^*| = |i|^*.
+// qed.
+
+lemma erase_bull : ∀S.∀i:pitem S. |\fst (•i)| = |i|.
+#S #i elim i //
+ [ #i1 #i2 #IH1 #IH2 >erase_dot <IH1 >eclose_dot
+ cases (•i1) #i11 #b1 cases b1 // <IH2 >odot_true_bis //
+ | #i1 #i2 #IH1 #IH2 >eclose_plus >(erase_plus … i1) <IH1 <IH2
+ cases (•i1) #i11 #b1 cases (•i2) #i21 #b2 //
+ | #i #IH >eclose_star >(erase_star … i) <IH cases (•i) //
+ ]
+qed.
+
+lemma sem_eclose_star: ∀S:DeqSet.∀i:pitem S.
+ \sem{〈i^*,true〉} =1 \sem{〈i,false〉}·\sem{|i|}^* ∪ {ϵ}.
+/2/ qed.
+
+(* theorem 16: 1 → 3 *)
+lemma odot_dot_aux : ∀S.∀e1:pre S.∀i2:pitem S.
+ \sem{•i2} =1 \sem{i2} ∪ \sem{|i2|} →
+ \sem{e1 ▸ i2} =1 \sem{e1} · \sem{|i2|} ∪ \sem{i2}.
+#S * #i1 #b1 #i2 cases b1
+ [2:#th >odot_false >sem_pre_false >sem_pre_false >sem_cat /2/
+ |#H >odot_true >sem_pre_true @(eqP_trans … (sem_pre_concat_r …))
+ >erase_bull @eqP_trans [|@(eqP_union_l … H)]
+ @eqP_trans [|@eqP_union_l[|@union_comm ]]
+ @eqP_trans [|@eqP_sym @union_assoc ] /3/
+ ]
+qed.
+
+lemma sem_fst: ∀S.∀e:pre S. \sem{\fst e} =1 \sem{e}-{[ ]}.
+#S * #i *
+ [>sem_pre_true normalize in ⊢ (??%?); #w %
+ [/3/ | * * // #H1 #H2 @False_ind @(absurd …H1 H2)]
+ |>sem_pre_false normalize in ⊢ (??%?); #w % [ /3/ | * // ]
+ ]
+qed.
+
+lemma item_eps: ∀S.∀i:pitem S. \sem{i} =1 \sem{i}-{[ ]}.
+#S #i #w %
+ [#H whd % // normalize @(not_to_not … (not_epsilon_lp …i)) //
+ |* //
+ ]
+qed.
+
+lemma sem_fst_aux: ∀S.∀e:pre S.∀i:pitem S.∀A.
+ \sem{e} =1 \sem{i} ∪ A → \sem{\fst e} =1 \sem{i} ∪ (A - {[ ]}).
+#S #e #i #A #seme
+@eqP_trans [|@sem_fst]
+@eqP_trans [||@eqP_union_r [|@eqP_sym @item_eps]]
+@eqP_trans [||@distribute_substract]
+@eqP_substract_r //
+qed.
+
+(* theorem 16: 1 *)
+theorem sem_bull: ∀S:DeqSet. ∀e:pitem S. \sem{•e} =1 \sem{e} ∪ \sem{|e|}.
+#S #e elim e
+ [#w normalize % [/2/ | * //]
+ |/2/
+ |#x normalize #w % [ /2/ | * [@False_ind | //]]
+ |#x normalize #w % [ /2/ | * // ]
+ |#i1 #i2 #IH1 #IH2 >eclose_dot
+ @eqP_trans [|@odot_dot_aux //] >sem_cat
+ @eqP_trans
+ [|@eqP_union_r
+ [|@eqP_trans [|@(cat_ext_l … IH1)] @distr_cat_r]]
+ @eqP_trans [|@union_assoc]
+ @eqP_trans [||@eqP_sym @union_assoc]
+ @eqP_union_l //
+ |#i1 #i2 #IH1 #IH2 >eclose_plus
+ @eqP_trans [|@sem_oplus] >sem_plus >erase_plus
+ @eqP_trans [|@(eqP_union_l … IH2)]
+ @eqP_trans [|@eqP_sym @union_assoc]
+ @eqP_trans [||@union_assoc] @eqP_union_r
+ @eqP_trans [||@eqP_sym @union_assoc]
+ @eqP_trans [||@eqP_union_l [|@union_comm]]
+ @eqP_trans [||@union_assoc] /2/
+ |#i #H >sem_pre_true >sem_star >erase_bull >sem_star
+ @eqP_trans [|@eqP_union_r [|@cat_ext_l [|@sem_fst_aux //]]]
+ @eqP_trans [|@eqP_union_r [|@distr_cat_r]]
+ @eqP_trans [|@union_assoc] @eqP_union_l >erase_star
+ @eqP_sym @star_fix_eps
+ ]
+qed.
+
+definition lifted_cat ≝ λS:DeqSet.λe:pre S.
+ lift S (lc S eclose e).
+
+notation "e1 ⊙ e2" left associative with precedence 70 for @{'odot $e1 $e2}.
+
+interpretation "lifted cat" 'odot e1 e2 = (lifted_cat ? e1 e2).
+
+lemma odot_true_b : ∀S.∀i1,i2:pitem S.∀b.
+ 〈i1,true〉 ⊙ 〈i2,b〉 = 〈i1 · (\fst (•i2)),\snd (•i2) ∨ b〉.
+#S #i1 #i2 #b normalize in ⊢ (??%?); cases (•i2) //
+qed.
+
+lemma odot_false_b : ∀S.∀i1,i2:pitem S.∀b.
+ 〈i1,false〉 ⊙ 〈i2,b〉 = 〈i1 · i2 ,b〉.
+//
+qed.
+
+lemma erase_odot:∀S.∀e1,e2:pre S.
+ |\fst (e1 ⊙ e2)| = |\fst e1| · (|\fst e2|).
+#S * #i1 * * #i2 #b2 // >odot_true_b //
+qed.
+
+lemma ostar_true: ∀S.∀i:pitem S.
+ 〈i,true〉^⊛ = 〈(\fst (•i))^*, true〉.
+// qed.
+
+lemma ostar_false: ∀S.∀i:pitem S.
+ 〈i,false〉^⊛ = 〈i^*, false〉.
+// qed.
+
+lemma erase_ostar: ∀S.∀e:pre S.
+ |\fst (e^⊛)| = |\fst e|^*.
+#S * #i * // qed.
+
+lemma sem_odot_true: ∀S:DeqSet.∀e1:pre S.∀i.
+ \sem{e1 ⊙ 〈i,true〉} =1 \sem{e1 ▸ i} ∪ { [ ] }.
+#S #e1 #i
+cut (e1 ⊙ 〈i,true〉 = 〈\fst (e1 ▸ i), \snd(e1 ▸ i) ∨ true〉) [//]
+#H >H cases (e1 ▸ i) #i1 #b1 cases b1
+ [>sem_pre_true @eqP_trans [||@eqP_sym @union_assoc]
+ @eqP_union_l /2/
+ |/2/
+ ]
+qed.
+
+lemma eq_odot_false: ∀S:DeqSet.∀e1:pre S.∀i.
+ e1 ⊙ 〈i,false〉 = e1 ▸ i.
+#S #e1 #i
+cut (e1 ⊙ 〈i,false〉 = 〈\fst (e1 ▸ i), \snd(e1 ▸ i) ∨ false〉) [//]
+cases (e1 ▸ i) #i1 #b1 cases b1 #H @H
+qed.
+
+lemma sem_odot:
+ ∀S.∀e1,e2: pre S. \sem{e1 ⊙ e2} =1 \sem{e1}· \sem{|\fst e2|} ∪ \sem{e2}.
+#S #e1 * #i2 *
+ [>sem_pre_true
+ @eqP_trans [|@sem_odot_true]
+ @eqP_trans [||@union_assoc] @eqP_union_r @odot_dot_aux //
+ |>sem_pre_false >eq_odot_false @odot_dot_aux //
+ ]
+qed.
+
+(* theorem 16: 4 *)
+theorem sem_ostar: ∀S.∀e:pre S.
+ \sem{e^⊛} =1 \sem{e} · \sem{|\fst e|}^*.
+#S * #i #b cases b
+ [>sem_pre_true >sem_pre_true >sem_star >erase_bull
+ @eqP_trans [|@eqP_union_r[|@cat_ext_l [|@sem_fst_aux //]]]
+ @eqP_trans [|@eqP_union_r [|@distr_cat_r]]
+ @eqP_trans [||@eqP_sym @distr_cat_r]
+ @eqP_trans [|@union_assoc] @eqP_union_l
+ @eqP_trans [||@eqP_sym @epsilon_cat_l] @eqP_sym @star_fix_eps
+ |>sem_pre_false >sem_pre_false >sem_star /2/
+ ]
+qed.
+
--- /dev/null
+include "basics/logic.ma".
+
+(* Given a universe A, we can consider sets of elements of type A by means of their
+characteristic predicates A → Prop. *)
+
+definition set ≝ λA:Type[0].A → Prop.
+
+(* For instance, the empty set is the set defined by an always False predicate *)
+
+definition empty : ∀A.\ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A ≝ λA.λa:A.\ 5a href="cic:/matita/basics/logic/False.ind(1,0,0)"\ 6False\ 5/a\ 6.
+
+(* the singleton set {a} can be defined by the characteristic predicate stating
+equality with a *)
+
+definition singleton: ∀A.A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A ≝ λA.λa,x.a\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x.
+
+(* Complement, union and intersection are easily defined, by means of logical
+connectives *)
+
+definition complement: ∀A. \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A ≝ λA,P,x.\ 5a title="logical not" href="cic:/fakeuri.def(1)"\ 6¬\ 5/a\ 6(P x).
+
+definition intersection: ∀A. \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A ≝ λA,P,Q,x.(P x) \ 5a title="logical and" href="cic:/fakeuri.def(1)"\ 6∧\ 5/a\ 6 (Q x).
+
+definition union: ∀A. \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A → \ 5a href="cic:/matita/tutorial/chapter4/set.def(1)"\ 6set\ 5/a\ 6 A ≝ λA,P,Q,x.(P x) \ 5a title="logical or" href="cic:/fakeuri.def(1)"\ 6∨\ 5/a\ 6 (Q x).
+
+
+
+
+
+
+
+ (* The reader could probably wonder what is the difference between Prop and bool.
+In fact, they are quite distinct entities. In type theory, all objects are structured
+in a three levels hierarchy
+ t : A : s
+where, t is a term, A is a type, and s is called a sort. Sorts are special, primitive
+constants used to give a type to types. Now, Prop is a primitive sort, while bool is
+just a user defined data type (whose sort his Type[0]). In particular, Prop is the
+sort of Propositions: its elements are logical statements in the usual sense. The important
+point is that statements are inhabited by their proofs: a triple of the kind
+ p : Q : Prop
+should be read as p is a proof of the proposition Q.*)
+
+
+
+include "arithmetics/nat.ma".
+include "basics/list.ma".
+
+interpretation "iff" 'iff a b = (iff a b).
+
+record Alpha : Type[1] ≝ { carr :> Type[0];
+ eqb: carr → carr → \ 5a href="cic:/matita/basics/bool/bool.ind(1,0,0)"\ 6bool\ 5/a\ 6;
+ eqb_true: ∀x,y. (eqb x y \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 \ 5a href="cic:/matita/basics/bool/bool.con(0,1,0)"\ 6true\ 5/a\ 6) \ 5a title="iff" href="cic:/fakeuri.def(1)"\ 6↔\ 5/a\ 6 (x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 y)
+}.
+
+notation "a == b" non associative with precedence 45 for @{ 'eqb $a $b }.
+interpretation "eqb" 'eqb a b = (eqb ? a b).
+
+definition word ≝ λS:\ 5a href="cic:/matita/tutorial/re/Alpha.ind(1,0,0)"\ 6Alpha\ 5/a\ 6.\ 5a href="cic:/matita/basics/list/list.ind(1,0,1)"\ 6list\ 5/a\ 6 S.
+
+inductive re (S: \ 5a href="cic:/matita/tutorial/re/Alpha.ind(1,0,0)"\ 6Alpha\ 5/a\ 6) : Type[0] ≝
+ z: re S
+ | e: re S
+ | s: S → re S
+ | c: re S → re S → re S
+ | o: re S → re S → re S
+ | k: re S → re S.
+
+notation < "a \sup ⋇" non associative with precedence 90 for @{ 'pk $a}.
+notation > "a ^ *" non associative with precedence 90 for @{ 'pk $a}.
+interpretation "star" 'pk a = (k ? a).
+interpretation "or" 'plus a b = (o ? a b).
+
+notation "a · b" non associative with precedence 60 for @{ 'pc $a $b}.
+interpretation "cat" 'pc a b = (c ? a b).
+
+(* to get rid of \middot
+coercion c : ∀S:Alpha.∀p:re S. re S → re S ≝ c on _p : re ? to ∀_:?.?. *)
+
+notation < "a" non associative with precedence 90 for @{ 'ps $a}.
+notation > "` term 90 a" non associative with precedence 90 for @{ 'ps $a}.
+interpretation "atom" 'ps a = (s ? a).
+
+notation "ϵ" non associative with precedence 90 for @{ 'epsilon }.
+interpretation "epsilon" 'epsilon = (e ?).
+
+notation "∅" non associative with precedence 90 for @{ 'empty }.
+interpretation "empty" 'empty = (z ?).
+
+let rec flatten (S : \ 5a href="cic:/matita/tutorial/re/Alpha.ind(1,0,0)"\ 6Alpha\ 5/a\ 6) (l : \ 5a href="cic:/matita/basics/list/list.ind(1,0,1)"\ 6list\ 5/a\ 6 (\ 5a href="cic:/matita/tutorial/re/word.def(3)"\ 6word\ 5/a\ 6 S)) on l : \ 5a href="cic:/matita/tutorial/re/word.def(3)"\ 6word\ 5/a\ 6 S ≝
+match l with [ nil ⇒ \ 5a title="nil" href="cic:/fakeuri.def(1)"\ 6[\ 5/a\ 6 ] | cons w tl ⇒ w \ 5a title="append" href="cic:/fakeuri.def(1)"\ 6@\ 5/a\ 6 flatten ? tl ].
+
+let rec conjunct (S : \ 5a href="cic:/matita/tutorial/re/Alpha.ind(1,0,0)"\ 6Alpha\ 5/a\ 6) (l : \ 5a href="cic:/matita/basics/list/list.ind(1,0,1)"\ 6list\ 5/a\ 6 (\ 5a href="cic:/matita/tutorial/re/word.def(3)"\ 6word\ 5/a\ 6 S)) (r : \ 5a href="cic:/matita/tutorial/re/word.def(3)"\ 6word\ 5/a\ 6 S → Prop) on l: Prop ≝
+match l with [ nil ⇒ \ 5a href="cic:/matita/basics/logic/True.ind(1,0,0)"\ 6True\ 5/a\ 6 | cons w tl ⇒ r w \ 5a title="logical and" href="cic:/fakeuri.def(1)"\ 6∧\ 5/a\ 6 conjunct ? tl r ].
+
+definition empty_lang ≝ λS.λw:\ 5a href="cic:/matita/tutorial/re/word.def(3)"\ 6word\ 5/a\ 6 S.\ 5a href="cic:/matita/basics/logic/False.ind(1,0,0)"\ 6False\ 5/a\ 6.
+notation "{}" non associative with precedence 90 f
\ No newline at end of file
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