#x #y * -x -y /2 width=2 by ex_intro/
qed-.
-lemma ylt_fwd_le_succ: ∀x,y. x < y → ⫯x ≤ y.
-#x #y * -x -y /2 width=1 by yle_inj/
+lemma ylt_fwd_lt_O1: ∀x,y:ynat. x < y → 0 < y.
+#x #y #H elim H -x -y /3 width=2 by ylt_inj, ltn_to_ltO/
qed-.
(* Basic inversion lemmas ***************************************************)
#y #H destruct
qed-.
-lemma ylt_inv_O1: ∀n. 0 < n → ⫯⫰n = n.
+lemma ylt_inv_Y2: ∀x:ynat. x < ∞ → ∃n. x = yinj n.
+* /2 width=2 by ex_intro/
+#H elim (ylt_inv_Y1 … H)
+qed-.
+
+lemma ylt_inv_O1: ∀n:ynat. 0 < n → ⫯⫰n = n.
* // #n #H lapply (ylt_inv_inj … H) -H normalize
/3 width=1 by S_pred, eq_f/
qed-.
(* Inversion lemmas on successor ********************************************)
-fact ylt_inv_succ1_aux: ∀x,y. x < y → ∀m. x = ⫯m → m < ⫰y ∧ ⫯⫰y = y.
+fact ylt_inv_succ1_aux: ∀x,y:ynat. x < y → ∀m. x = ⫯m → m < ⫰y ∧ ⫯⫰y = y.
#x #y * -x -y
[ #x #y #Hxy #m #H elim (ysucc_inv_inj_sn … H) -H
#n #H1 #H2 destruct elim (le_inv_S1 … Hxy) -Hxy
]
qed-.
-lemma ylt_inv_succ1: ∀m,y. ⫯m < y → m < ⫰y ∧ ⫯⫰y = y.
+lemma ylt_inv_succ1: ∀m,y:ynat. ⫯m < y → m < ⫰y ∧ ⫯⫰y = y.
/2 width=3 by ylt_inv_succ1_aux/ qed-.
lemma ylt_inv_succ: ∀m,n. ⫯m < ⫯n → m < n.
lemma ylt_fwd_succ2: ∀m,n. m < ⫯n → m ≤ n.
/2 width=3 by ylt_fwd_succ2_aux/ qed-.
-(* inversion and forward lemmas on yle **************************************)
+(* inversion and forward lemmas on order ************************************)
lemma ylt_fwd_le_succ1: ∀m,n. m < n → ⫯m ≤ n.
#m #n * -m -n /2 width=1 by yle_inj/
qed-.
+lemma ylt_fwd_le_pred2: ∀x,y:ynat. x < y → x ≤ ⫰y.
+#x #y #H elim H -x -y /3 width=1 by yle_inj, monotonic_pred/
+qed-.
+
lemma ylt_fwd_le: ∀m:ynat. ∀n:ynat. m < n → m ≤ n.
#m #n * -m -n /3 width=1 by lt_to_le, yle_inj/
qed-.
]
qed-.
+lemma ylt_inv_le: ∀x,y. x < y → x < ∞ ∧ ⫯x ≤ y.
+#x #y #H elim H -x -y /3 width=1 by yle_inj, conj/
+qed-.
+
(* Basic properties *********************************************************)
-lemma ylt_O: ∀x. ⫯⫰(yinj x) = yinj x → 0 < x.
-* /2 width=1 by/ normalize
+lemma ylt_O1: ∀x:ynat. ⫯⫰x = x → 0 < x.
+* // * /2 width=1 by ylt_inj/ normalize
#H destruct
qed.
(* Properties on predecessor ************************************************)
-lemma ylt_pred: ∀m,n. m < n → 0 < m → ⫰m < ⫰n.
+lemma ylt_pred: ∀m,n:ynat. m < n → 0 < m → ⫰m < ⫰n.
#m #n * -m -n
/4 width=1 by ylt_inv_inj, ylt_inj, monotonic_lt_pred/
qed.
#m #n #H elim H -m -n /3 width=1 by ylt_inj, le_S_S/
qed.
+lemma ylt_succ_Y: ∀x. x < ∞ → ⫯x < ∞.
+* /2 width=1 by/ qed.
+
+lemma yle_succ1_inj: ∀x. ∀y:ynat. ⫯yinj x ≤ y → x < y.
+#x * /3 width=1 by yle_inv_inj, ylt_inj/
+qed.
+
+lemma ylt_succ2_refl: ∀x,y:ynat. x < y → x < ⫯x.
+#x #y #H elim (ylt_fwd_gen … H) -y /2 width=1 by ylt_inj/
+qed.
+
(* Properties on order ******************************************************)
-lemma yle_split_eq: ∀m:ynat. ∀n:ynat. m ≤ n → m < n ∨ m = n.
+lemma yle_split_eq: ∀m,n:ynat. m ≤ n → m < n ∨ m = n.
#m #n * -m -n
[ #m #n #Hmn elim (le_to_or_lt_eq … Hmn) -Hmn
/3 width=1 by or_introl, ylt_inj/
]
qed-.
-lemma ylt_split: ∀m,n:ynat. m < n ∨ n ≤ m..
+lemma ylt_split: ∀m,n:ynat. m < n ∨ n ≤ m.
#m #n elim (yle_split m n) /2 width=1 by or_intror/
#H elim (yle_split_eq … H) -H /2 width=1 by or_introl, or_intror/
-qed-.
+qed-.
+
+lemma ylt_split_eq: ∀m,n:ynat. ∨∨ m < n | n = m | n < m.
+#m #n elim (ylt_split m n) /2 width=1 by or3_intro0/
+#H elim (yle_split_eq … H) -H /2 width=1 by or3_intro1, or3_intro2/
+qed-.
lemma ylt_yle_trans: ∀x:ynat. ∀y:ynat. ∀z:ynat. y ≤ z → x < y → x < z.
#x #y #z * -y -z
]
qed-.
+lemma yle_inv_succ1_lt: ∀x,y:ynat. ⫯x ≤ y → 0 < y ∧ x ≤ ⫰y.
+#x #y #H elim (yle_inv_succ1 … H) -H /3 width=1 by ylt_O1, conj/
+qed-.
+
+lemma yle_lt: ∀x,y. x < ∞ → ⫯x ≤ y → x < y.
+#x * // #y #H elim (ylt_inv_Y2 … H) -H #n #H destruct
+/3 width=1 by ylt_inj, yle_inv_inj/
+qed-.
+
(* Main properties **********************************************************)
theorem ylt_trans: Transitive … ylt.
| #x #z #H elim (ylt_yle_false … H) //
]
qed-.
+
+(* Elimination principles ***************************************************)
+
+fact ynat_ind_lt_le_aux: ∀R:predicate ynat.
+ (∀y. (∀x. x < y → R x) → R y) →
+ ∀y:nat. ∀x. x ≤ y → R x.
+#R #IH #y elim y -y
+[ #x #H >(yle_inv_O2 … H) -x
+ @IH -IH #x #H elim (ylt_yle_false … H) -H //
+| /5 width=3 by ylt_yle_trans, ylt_fwd_succ2/
+]
+qed-.
+
+fact ynat_ind_lt_aux: ∀R:predicate ynat.
+ (∀y. (∀x. x < y → R x) → R y) →
+ ∀y:nat. R y.
+/4 width=2 by ynat_ind_lt_le_aux/ qed-.
+
+lemma ynat_ind_lt: ∀R:predicate ynat.
+ (∀y. (∀x. x < y → R x) → R y) →
+ ∀y. R y.
+#R #IH * /4 width=1 by ynat_ind_lt_aux/
+@IH #x #H elim (ylt_inv_Y2 … H) -H
+#n #H destruct /4 width=1 by ynat_ind_lt_aux/
+qed-.
+
+fact ynat_f_ind_aux: ∀A. ∀f:A→ynat. ∀R:predicate A.
+ (∀x. (∀a. f a < x → R a) → ∀a. f a = x → R a) →
+ ∀x,a. f a = x → R a.
+#A #f #R #IH #x @(ynat_ind_lt … x) -x
+/3 width=3 by/
+qed-.
+
+lemma ynat_f_ind: ∀A. ∀f:A→ynat. ∀R:predicate A.
+ (∀x. (∀a. f a < x → R a) → ∀a. f a = x → R a) → ∀a. R a.
+#A #f #R #IH #a
+@(ynat_f_ind_aux … IH) -IH [2: // | skip ]
+qed-.