(* Equalities ***************************************************************)
-lemma minus_plus_m_m_commutative: ∀n,m:nat. n = m + n - m.
-// qed-.
-
-lemma plus_minus_m_m_commutative (n) (m): m ≤ n → n = m+(n-m).
-/2 width=1 by plus_minus_associative/ qed-.
-
-lemma plus_to_minus_2: ∀m1,m2,n1,n2. n1 ≤ m1 → n2 ≤ m2 →
- m1+n2 = m2+n1 → m1-n1 = m2-n2.
-#m1 #m2 #n1 #n2 #H1 #H2 #H
-@plus_to_minus >plus_minus_associative //
-qed-.
-
-(* Note: uses minus_minus_comm, minus_plus_m_m, commutative_plus, plus_minus *)
-lemma plus_minus_minus_be: ∀x,y,z. y ≤ z → z ≤ x → (x - z) + (z - y) = x - y.
-#x #z #y #Hzy #Hyx >plus_minus // >commutative_plus >plus_minus //
-qed-.
-
-lemma lt_succ_pred: ∀m,n. n < m → m = ↑↓m.
-#m #n #Hm >S_pred /2 width=2 by ltn_to_ltO/
-qed-.
+(*** plus_minus_plus_plus_l *) (**)
+lemma plus_minus_plus_plus_l: ∀z,x,y,h. z + (x + h) - (y + h) = z + x - y.
+#H1 #H2 #H3 #H4
+<nplus_assoc <nminus_plus_dx_bi // qed-.
fact plus_minus_minus_be_aux: ∀i,x,y,z. y ≤ z → z ≤ x → i = z - y → x - z + i = x - y.
/2 width=1 by plus_minus_minus_be/ qed-.
-lemma le_plus_minus: ∀m,n,p. p ≤ n → m + n - p = m + (n - p).
-/2 by plus_minus/ qed-.
-
-lemma le_plus_minus_comm: ∀n,m,p. p ≤ m → m + n - p = m - p + n.
-/2 by plus_minus/ qed-.
-
-lemma minus_minus_comm3: ∀n,x,y,z. n-x-y-z = n-y-z-x.
-// qed.
-
(* Properties ***************************************************************)
-lemma eq_nat_dec: ∀n1,n2:nat. Decidable (n1 = n2).
-#n1 elim n1 -n1 [| #n1 #IHn1 ] * [2,4: #n2 ]
-[1,4: @or_intror #H destruct
-| elim (IHn1 n2) -IHn1 /3 width=1 by or_intror, or_introl/
-| /2 width=1 by or_introl/
-]
-qed-.
-
-lemma lt_or_eq_or_gt: ∀m,n. ∨∨ m < n | n = m | n < m.
-#m #n elim (lt_or_ge m n) /2 width=1 by or3_intro0/
-#H elim H -m /2 width=1 by or3_intro1/
-#m #Hm * /3 width=1 by not_le_to_lt, le_S_S, or3_intro2/
-qed-.
+(*** lt_plus_Sn_r *) (**)
+lemma lt_plus_Sn_r: ∀a,x,n. a < a + x + ↑n.
+/2 width=1/ qed-.
lemma monotonic_le_minus_l2: ∀x1,x2,y,z. x1 ≤ x2 → x1 - y - z ≤ x2 - y - z.
/3 width=1 by monotonic_le_minus_l/ qed.
-lemma minus_le_trans_sn: ∀x1,x2. x1 ≤ x2 → ∀x. x1-x ≤ x2.
-/2 width=3 by transitive_le/ qed.
-
-lemma le_plus_to_minus_l: ∀a,b,c. a + b ≤ c → b ≤ c-a.
-/2 width=1 by le_plus_to_minus_r/
-qed-.
-
-lemma le_plus_to_minus_comm: ∀n,m,p. n ≤ p+m → n-p ≤ m.
-/2 width=1 by le_plus_to_minus/ qed-.
-
-lemma le_inv_S1: ∀m,n. ↑m ≤ n → ∃∃p. m ≤ p & ↑p = n.
-#m *
-[ #H lapply (le_n_O_to_eq … H) -H
- #H destruct
-| /3 width=3 by monotonic_pred, ex2_intro/
-]
-qed-.
-
-(* Note: this might interfere with nat.ma *)
-lemma monotonic_lt_pred: ∀m,n. m < n → 0 < m → pred m < pred n.
-#m #n #Hmn #Hm whd >(S_pred … Hm)
-@le_S_S_to_le >S_pred /2 width=3 by transitive_lt/
-qed.
-
-lemma lt_S_S: ∀x,y. x < y → ↑x < ↑y.
-/2 width=1 by le_S_S/ qed.
-
-lemma lt_S: ∀n,m. n < m → n < ↑m.
-/2 width=1 by le_S/ qed.
-
-lemma monotonic_lt_minus_r:
-∀p,q,n. q < n -> q < p → n-p < n-q.
-#p #q #n #Hn #H
-lapply (monotonic_le_minus_r … n H) -H #H
-@(le_to_lt_to_lt … H) -H
-/2 width=1 by lt_plus_to_minus/
-qed.
-
(* Inversion & forward lemmas ***********************************************)
-lemma lt_refl_false: ∀n. n < n → ⊥.
-#n #H elim (lt_to_not_eq … H) -H /2 width=1 by/
-qed-.
-
-lemma lt_zero_false: ∀n. n < 0 → ⊥.
-#n #H elim (lt_to_not_le … H) -H /2 width=1 by/
-qed-.
-
-lemma lt_le_false: ∀x,y. x < y → y ≤ x → ⊥.
-/3 width=4 by lt_refl_false, lt_to_le_to_lt/ qed-.
-
-lemma le_dec (n) (m): Decidable (n≤m).
-#n elim n -n [ /2 width=1 by or_introl/ ]
-#n #IH * [ /3 width=2 by lt_zero_false, or_intror/ ]
-#m elim (IH m) -IH
-[ /3 width=1 by or_introl, le_S_S/
-| /4 width=1 by or_intror, le_S_S_to_le/
-]
-qed-.
-
-lemma succ_inv_refl_sn: ∀x. ↑x = x → ⊥.
-#x #H @(lt_le_false x (↑x)) //
-qed-.
-
-lemma le_plus_xSy_O_false: ∀x,y. x + S y ≤ 0 → ⊥.
-#x #y #H lapply (le_n_O_to_eq … H) -H <plus_n_Sm #H destruct
-qed-.
-
lemma le_plus_xySz_x_false: ∀y,z,x. x + y + S z ≤ x → ⊥.
#y #z #x elim x -x /3 width=1 by le_S_S_to_le/
#H elim (le_plus_xSy_O_false … H)
lemma plus_xySz_x_false: ∀z,x,y. x + y + S z = x → ⊥.
/2 width=4 by le_plus_xySz_x_false/ qed-.
-lemma plus_xSy_x_false: ∀y,x. x + S y = x → ⊥.
-/2 width=4 by plus_xySz_x_false/ qed-.
-
-lemma pred_inv_fix_sn: ∀x. ↓x = x → 0 = x.
-* // #x <pred_Sn #H
-elim (succ_inv_refl_sn x) //
-qed-.
-
-lemma discr_plus_xy_y: ∀x,y. x + y = y → x = 0.
-// qed-.
-
-lemma discr_plus_x_xy: ∀x,y. x = x + y → y = 0.
-/2 width=2 by le_plus_minus_comm/ qed-.
-
-lemma plus2_le_sn_sn: ∀m1,m2,n1,n2. m1 + n1 = m2 + n2 → m1 ≤ m2 → n2 ≤ n1.
-#m1 #m2 #n1 #n2 #H #Hm
-lapply (monotonic_le_plus_l n1 … Hm) -Hm >H -H
-/2 width=2 by le_plus_to_le/
-qed-.
-
-lemma plus2_le_sn_dx: ∀m1,m2,n1,n2. m1 + n1 = n2 + m2 → m1 ≤ m2 → n2 ≤ n1.
-/2 width=4 by plus2_le_sn_sn/ qed-.
-
-lemma plus2_le_dx_sn: ∀m1,m2,n1,n2. n1 + m1 = m2 + n2 → m1 ≤ m2 → n2 ≤ n1.
-/2 width=4 by plus2_le_sn_sn/ qed-.
-
-lemma plus2_le_dx_dx: ∀m1,m2,n1,n2. n1 + m1 = n2 + m2 → m1 ≤ m2 → n2 ≤ n1.
-/2 width=4 by plus2_le_sn_sn/ qed-.
-
-lemma lt_S_S_to_lt: ∀x,y. ↑x < ↑y → x < y.
-/2 width=1 by le_S_S_to_le/ qed-.
-
-(* Note this should go in nat.ma *)
-lemma discr_x_minus_xy: ∀x,y. x = x - y → x = 0 ∨ y = 0.
-#x @(nat_ind_plus … x) -x /2 width=1 by or_introl/
-#x #_ #y @(nat_ind_plus … y) -y /2 width=1 by or_intror/
-#y #_ >minus_plus_plus_l
-#H lapply (discr_plus_xy_minus_xz … H) -H
-#H destruct
-qed-.
-
-lemma lt_inv_O1: ∀n. 0 < n → ∃m. ↑m = n.
-* /2 width=2 by ex_intro/
-#H cases (lt_le_false … H) -H //
-qed-.
-
-lemma lt_inv_S1: ∀m,n. ↑m < n → ∃∃p. m < p & ↑p = n.
-#m * /3 width=3 by lt_S_S_to_lt, ex2_intro/
-#H cases (lt_le_false … H) -H //
-qed-.
-
-lemma lt_inv_gen: ∀y,x. x < y → ∃∃z. x ≤ z & ↑z = y.
-* /3 width=3 by le_S_S_to_le, ex2_intro/
-#x #H elim (lt_le_false … H) -H //
-qed-.
-
-lemma plus_inv_O3: ∀x,y. x + y = 0 → x = 0 ∧ y = 0.
-/2 width=1 by plus_le_0/ qed-.
-
-lemma plus_inv_S3_sn: ∀x1,x2,x3. x1+x2 = ↑x3 →
- ∨∨ ∧∧ x1 = 0 & x2 = ↑x3
- | ∃∃y1. x1 = ↑y1 & y1 + x2 = x3.
-* /3 width=1 by or_introl, conj/
-#x1 #x2 #x3 <plus_S1 #H destruct
-/3 width=3 by ex2_intro, or_intror/
-qed-.
-
-lemma plus_inv_S3_dx: ∀x2,x1,x3. x1+x2 = ↑x3 →
- ∨∨ ∧∧ x2 = 0 & x1 = ↑x3
- | ∃∃y2. x2 = ↑y2 & x1 + y2 = x3.
-* /3 width=1 by or_introl, conj/
-#x2 #x1 #x3 <plus_n_Sm #H destruct
-/3 width=3 by ex2_intro, or_intror/
-qed-.
-
-lemma zero_eq_plus: ∀x,y. 0 = x + y → 0 = x ∧ 0 = y.
-* /2 width=1 by conj/ #x #y normalize #H destruct
-qed-.
-
-lemma nat_split: ∀x. x = 0 ∨ ∃y. ↑y = x.
-* /3 width=2 by ex_intro, or_introl, or_intror/
-qed-.
-
lemma nat_elim_le_sn (Q:relation …):
(∀m1,m2. (∀m. m < m2-m1 → Q (m2-m) m2) → m1 ≤ m2 → Q m1 m2) →
∀n1,n2. n1 ≤ n2 → Q n1 n2.
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