(* *)
(**************************************************************************)
-set "baseuri" "cic:/matita/nat/ord".
-
include "datatypes/constructors.ma".
include "nat/exp.ma".
-include "nat/gcd.ma".
-include "nat/relevant_equations.ma". (* required by auto paramod *)
-
-(* this definition of log is based on pairs, with a remainder *)
+include "nat/nth_prime.ma".
+include "nat/gcd.ma". (* for some properties of divides *)
+include "nat/relevant_equations.ma". (* required by autobatch paramod *)
let rec p_ord_aux p n m \def
match n \mod m with
apply le_times_l.
assumption.
apply le_times_r.assumption.
-alias id "not_eq_to_le_to_lt" = "cic:/matita/algebra/finite_groups/not_eq_to_le_to_lt.con".
-apply not_eq_to_le_to_lt.
+ apply not_eq_to_le_to_lt.
unfold.intro.apply H1.
rewrite < H3.
apply (witness ? r r ?).simplify.apply plus_n_O.
apply (absurd ? ? H10 H7).
(* rewrite > H6.
rewrite > H8. *)
-auto paramodulation.
+autobatch paramodulation.
unfold prime in H. elim H. assumption.
qed.
apply divides_to_le.unfold.apply le_n.assumption.
rewrite < times_n_SO.
apply exp_n_SO.
-qed.
\ No newline at end of file
+qed.
+
+(* p_ord and divides *)
+theorem divides_to_p_ord: \forall p,a,b,c,d,n,m:nat.
+O < n \to O < m \to prime p
+\to divides n m \to p_ord n p = pair ? ? a b \to
+p_ord m p = pair ? ? c d \to divides b d \land a \le c.
+intros.
+cut (S O < p)
+ [lapply (p_ord_to_exp1 ? ? ? ? Hcut H H4).
+ lapply (p_ord_to_exp1 ? ? ? ? Hcut H1 H5).
+ elim Hletin. clear Hletin.
+ elim Hletin1. clear Hletin1.
+ rewrite > H9 in H3.
+ split
+ [apply (gcd_SO_to_divides_times_to_divides (exp p c))
+ [elim (le_to_or_lt_eq ? ? (le_O_n b))
+ [assumption
+ |apply False_ind.
+ apply (lt_to_not_eq O ? H).
+ rewrite > H7.
+ rewrite < H10.
+ autobatch
+ ]
+ |elim c
+ [rewrite > sym_gcd.
+ apply gcd_SO_n
+ |simplify.
+ apply eq_gcd_times_SO
+ [apply lt_to_le.assumption
+ |apply lt_O_exp.apply lt_to_le.assumption
+ |rewrite > sym_gcd.
+ (* hint non trova prime_to_gcd_SO e
+ autobatch non chiude il goal *)
+ apply prime_to_gcd_SO
+ [assumption|assumption]
+ |assumption
+ ]
+ ]
+ |apply (trans_divides ? n)
+ [apply (witness ? ? (exp p a)).
+ rewrite > sym_times.
+ assumption
+ |assumption
+ ]
+ ]
+ |apply (le_exp_to_le p)
+ [assumption
+ |apply divides_to_le
+ [apply lt_O_exp.apply lt_to_le.assumption
+ |apply (gcd_SO_to_divides_times_to_divides d)
+ [apply lt_O_exp.apply lt_to_le.assumption
+ |elim a
+ [apply gcd_SO_n
+ |simplify.rewrite < sym_gcd.
+ apply eq_gcd_times_SO
+ [apply lt_to_le.assumption
+ |apply lt_O_exp.apply lt_to_le.assumption
+ |rewrite > sym_gcd.
+ (* hint non trova prime_to_gcd_SO e
+ autobatch non chiude il goal *)
+ apply prime_to_gcd_SO
+ [assumption|assumption]
+ |rewrite > sym_gcd. assumption
+ ]
+ ]
+ |apply (trans_divides ? n)
+ [apply (witness ? ? b).assumption
+ |rewrite > sym_times.assumption
+ ]
+ ]
+ ]
+ ]
+ ]
+ |elim H2.assumption
+ ]
+qed.
+
+(* p_ord and primes *)
+theorem not_divides_to_p_ord_O: \forall n,i.
+Not (divides (nth_prime i) n) \to p_ord n (nth_prime i) =
+pair nat nat O n.
+intros.
+apply p_ord_exp1
+ [apply lt_O_nth_prime_n
+ |assumption
+ |autobatch
+ ]
+qed.
+
+theorem p_ord_O_to_not_divides: \forall n,i,r.
+O < n \to
+p_ord n (nth_prime i) = pair nat nat O r
+\to Not (divides (nth_prime i) n).
+intros.
+lapply (p_ord_to_exp1 ? ? ? ? ? ? H1)
+ [apply lt_SO_nth_prime_n
+ |assumption
+ |elim Hletin.
+ simplify in H3.
+ rewrite > H3.
+ rewrite < plus_n_O.
+ assumption
+ ]
+qed.
+
+theorem p_ord_to_not_eq_O : \forall n,p,q,r.
+ (S O) < n \to
+ p_ord n (nth_prime p) = pair nat nat q r \to
+ Not (r=O).
+intros.
+unfold.intro.
+cut (O < n)
+ [lapply (p_ord_to_exp1 ? ? ? ? ? ? H1)
+ [apply lt_SO_nth_prime_n.
+ |assumption
+ |elim Hletin.
+ apply (lt_to_not_eq ? ? Hcut).
+ rewrite > H4.
+ rewrite > H2.
+ apply times_n_O
+ ]
+ |apply (trans_lt ? (S O))[apply lt_O_S|assumption]
+ ]
+qed.
+
+definition ord :nat \to nat \to nat \def
+\lambda n,p. fst ? ? (p_ord n p).
+
+definition ord_rem :nat \to nat \to nat \def
+\lambda n,p. snd ? ? (p_ord n p).
+
+theorem divides_to_ord: \forall p,n,m:nat.
+O < n \to O < m \to prime p
+\to divides n m
+\to divides (ord_rem n p) (ord_rem m p) \land (ord n p) \le (ord m p).
+intros.
+apply (divides_to_p_ord p ? ? ? ? n m H H1 H2 H3)
+ [unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ |unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ ]
+qed.
+
+theorem divides_to_divides_ord_rem: \forall p,n,m:nat.
+O < n \to O < m \to prime p \to divides n m \to
+divides (ord_rem n p) (ord_rem m p).
+intros.
+elim (divides_to_ord p n m H H1 H2 H3).assumption.
+qed.
+
+theorem divides_to_le_ord: \forall p,n,m:nat.
+O < n \to O < m \to prime p \to divides n m \to
+(ord n p) \le (ord m p).
+intros.
+elim (divides_to_ord p n m H H1 H2 H3).assumption.
+qed.
+
+theorem exp_ord: \forall p,n. (S O) \lt p
+\to O \lt n \to n = p \sup (ord n p) * (ord_rem n p).
+intros.
+elim (p_ord_to_exp1 p n (ord n p) (ord_rem n p))
+ [assumption
+ |assumption
+ |assumption
+ |unfold ord.unfold ord_rem.
+ apply eq_pair_fst_snd
+ ]
+qed.
+
+theorem divides_ord_rem: \forall p,n. (S O) < p \to O < n
+\to divides (ord_rem n p) n.
+intros.
+apply (witness ? ? (p \sup (ord n p))).
+rewrite > sym_times.
+apply exp_ord[assumption|assumption]
+qed.
+
+theorem lt_O_ord_rem: \forall p,n. (S O) < p \to O < n \to O < ord_rem n p.
+intros.
+elim (le_to_or_lt_eq O (ord_rem n p))
+ [assumption
+ |apply False_ind.
+ apply (lt_to_not_eq ? ? H1).
+ lapply (divides_ord_rem ? ? H H1).
+ rewrite < H2 in Hletin.
+ elim Hletin.
+ rewrite > H3.
+ reflexivity
+ |apply le_O_n
+ ]
+qed.
+
+(* properties of ord e ord_rem *)
+
+theorem ord_times: \forall p,m,n.O<m \to O<n \to prime p \to
+ord (m*n) p = ord m p+ord n p.
+intros.unfold ord.
+rewrite > (p_ord_times ? ? ? (ord m p) (ord_rem m p) (ord n p) (ord_rem n p))
+ [reflexivity
+ |assumption
+ |assumption
+ |assumption
+ |unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ |unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ ]
+qed.
+
+theorem ord_exp: \forall p,m.S O < p \to
+ord (exp p m) p = m.
+intros.
+unfold ord.
+rewrite > (p_ord_exp1 p (exp p m) m (S O))
+ [reflexivity
+ |apply lt_to_le.assumption
+ |intro.apply (lt_to_not_le ? ? H).
+ apply divides_to_le
+ [apply lt_O_S
+ |assumption
+ ]
+ |apply times_n_SO
+ ]
+qed.
+
+theorem not_divides_to_ord_O:
+\forall p,m. prime p \to \lnot (divides p m) \to
+ord m p = O.
+intros.unfold ord.
+rewrite > (p_ord_exp1 p m O m)
+ [reflexivity
+ |apply prime_to_lt_O.assumption
+ |assumption
+ |simplify.apply plus_n_O
+ ]
+qed.
+
+theorem ord_O_to_not_divides:
+\forall p,m. O < m \to prime p \to ord m p = O \to
+\lnot (divides p m).
+intros.
+lapply (p_ord_to_exp1 p m (ord m p) (ord_rem m p))
+ [elim Hletin.
+ rewrite > H4.
+ rewrite > H2.
+ rewrite > sym_times.
+ rewrite < times_n_SO.
+ assumption
+ |apply prime_to_lt_SO.assumption
+ |assumption
+ |unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ ]
+qed.
+
+theorem divides_to_not_ord_O:
+\forall p,m. O < m \to prime p \to divides p m \to
+\lnot(ord m p = O).
+intros.intro.
+apply (ord_O_to_not_divides ? ? H H1 H3).
+assumption.
+qed.
+
+theorem not_ord_O_to_divides:
+\forall p,m. O < m \to prime p \to \lnot (ord m p = O) \to
+divides p m.
+intros.
+rewrite > (exp_ord p) in ⊢ (? ? %)
+ [apply (trans_divides ? (exp p (ord m p)))
+ [generalize in match H2.
+ cases (ord m p);intro
+ [apply False_ind.apply H3.reflexivity
+ |simplify.autobatch
+ ]
+ |autobatch
+ ]
+ |apply prime_to_lt_SO.
+ assumption
+ |assumption
+ ]
+qed.
+
+theorem not_divides_ord_rem: \forall m,p.O< m \to S O < p \to
+\lnot (divides p (ord_rem m p)).
+intros.
+elim (p_ord_to_exp1 p m (ord m p) (ord_rem m p))
+ [assumption
+ |assumption
+ |assumption
+ |unfold ord.unfold ord_rem.apply eq_pair_fst_snd
+ ]
+qed.
+
+theorem ord_ord_rem: \forall p,q,m. O < m \to
+prime p \to prime q \to
+q < p \to ord (ord_rem m p) q = ord m q.
+intros.
+rewrite > (exp_ord p) in ⊢ (? ? ? (? % ?))
+ [rewrite > ord_times
+ [rewrite > not_divides_to_ord_O in ⊢ (? ? ? (? % ?))
+ [reflexivity
+ |assumption
+ |intro.
+ apply (lt_to_not_eq ? ? H3).
+ apply (divides_exp_to_eq ? ? ? H2 H1 H4)
+ ]
+ |apply lt_O_exp.
+ apply (ltn_to_ltO ? ? H3)
+ |apply lt_O_ord_rem
+ [elim H1.assumption
+ |assumption
+
+ ]
+ |assumption
+ ]
+ |elim H1.assumption
+ |assumption
+ ]
+qed.
+
+theorem lt_ord_rem: \forall n,m. prime n \to O < m \to
+divides n m \to ord_rem m n < m.
+intros.
+elim (le_to_or_lt_eq (ord_rem m n) m)
+ [assumption
+ |apply False_ind.
+ apply (ord_O_to_not_divides ? ? H1 H ? H2).
+ apply (inj_exp_r n)
+ [apply prime_to_lt_SO.assumption
+ |apply (inj_times_l1 m)
+ [assumption
+ |rewrite > sym_times in ⊢ (? ? ? %).
+ rewrite < times_n_SO.
+ rewrite < H3 in ⊢ (? ? (? ? %) ?).
+ apply sym_eq.
+ apply exp_ord
+ [apply prime_to_lt_SO.assumption
+ |assumption
+ ]
+ ]
+ ]
+ |apply divides_to_le
+ [assumption
+ |apply divides_ord_rem
+ [apply prime_to_lt_SO.assumption
+ |assumption
+ ]
+ ]
+ ]
+qed.
+
+(* p_ord_inv is used to encode the pair ord and rem into
+ a single natural number. *)
+
+definition p_ord_inv \def
+\lambda p,m,x.
+ match p_ord x p with
+ [pair q r \Rightarrow r*m+q].
+
+theorem eq_p_ord_inv: \forall p,m,x.
+p_ord_inv p m x = (ord_rem x p)*m+(ord x p).
+intros.unfold p_ord_inv. unfold ord_rem.
+unfold ord.
+elim (p_ord x p).
+reflexivity.
+qed.
+
+theorem div_p_ord_inv:
+\forall p,m,x. ord x p < m \to p_ord_inv p m x / m = ord_rem x p.
+intros.rewrite > eq_p_ord_inv.
+apply div_plus_times.
+assumption.
+qed.
+
+theorem mod_p_ord_inv:
+\forall p,m,x. ord x p < m \to p_ord_inv p m x \mod m = ord x p.
+intros.rewrite > eq_p_ord_inv.
+apply mod_plus_times.
+assumption.
+qed.