Require
Bool.
Require
Sumbool.
Require
Arith.
Require
ZArith.
Require
Addr.
Require
Adist.
Require
Addec.
Require
Map.
Require
Mapaxioms.
Require
Mapiter.
Require
Fset.
Require
Mapsubset.
Require
PolyList.
Require
Lsort.
Require
Peano_dec.
Section
MapCard.
Variable
A, B : Set.
Lemma
MapCard_M0 : (MapCard A (M0 A))=O.
Proof
.
Trivial.
Qed
.
Lemma
MapCard_M1 : (a:ad) (y:A) (MapCard A (M1 A a y))=(1).
Proof
.
Trivial.
Qed
.
Lemma
MapCard_is_O : (m:(Map A)) (MapCard A m)=O ->
(a:ad) (MapGet A m a)=(NONE A).
Proof
.
Induction m. Trivial.
Intros a y H. Discriminate H.
Intros. Simpl in H1. Elim (plus_is_O ? ? H1). Intros. Rewrite (MapGet_M2_bit_0_if A m0 m1 a).
Case (ad_bit_0 a). Apply H0. Assumption.
Apply H. Assumption.
Qed
.
Lemma
MapCard_is_not_O : (m:(Map A)) (a:ad) (y:A) (MapGet A m a)=(SOME A y) ->
{n:nat | (MapCard A m)=(S n)}.
Proof
.
Induction m. Intros. Discriminate H.
Intros a y a0 y0 H. Simpl in H. Elim (sumbool_of_bool (ad_eq a a0)). Intro H0. Split with O.
Reflexivity.
Intro H0. Rewrite H0 in H. Discriminate H.
Intros. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H2.
Rewrite (MapGet_M2_bit_0_1 A a H2 m0 m1) in H1. Elim (H0 (ad_div_2 a) y H1). Intros n H3.
Simpl. Rewrite H3. Split with (plus (MapCard A m0) n).
Rewrite <- (plus_Snm_nSm (MapCard A m0) n). Reflexivity.
Intro H2. Rewrite (MapGet_M2_bit_0_0 A a H2 m0 m1) in H1. Elim (H (ad_div_2 a) y H1).
Intros n H3. Simpl. Rewrite H3. Split with (plus n (MapCard A m1)). Reflexivity.
Qed
.
Lemma
MapCard_is_one : (m:(Map A)) (MapCard A m)=(1) ->
{a:ad & {y:A | (MapGet A m a)=(SOME A y)}}.
Proof
.
Induction m. Intro. Discriminate H.
Intros a y H. Split with a. Split with y. Apply M1_semantics_1.
Intros. Simpl in H1. Elim (plus_is_one (MapCard A m0) (MapCard A m1) H1).
Intro H2. Elim H2. Intros. Elim (H0 H4). Intros a H5. Split with (ad_double_plus_un a).
Rewrite (MapGet_M2_bit_0_1 A ? (ad_double_plus_un_bit_0 a) m0 m1).
Rewrite ad_double_plus_un_div_2. Exact H5.
Intro H2. Elim H2. Intros. Elim (H H3). Intros a H5. Split with (ad_double a).
Rewrite (MapGet_M2_bit_0_0 A ? (ad_double_bit_0 a) m0 m1).
Rewrite ad_double_div_2. Exact H5.
Qed
.
Lemma
MapCard_is_one_unique : (m:(Map A)) (MapCard A m)=(1) -> (a,a':ad) (y,y':A)
(MapGet A m a)=(SOME A y) -> (MapGet A m a')=(SOME A y') ->
a=a' /\ y=y'.
Proof
.
Induction m. Intro. Discriminate H.
Intros. Elim (sumbool_of_bool (ad_eq a a1)). Intro H2. Rewrite (ad_eq_complete ? ? H2) in H0.
Rewrite (M1_semantics_1 A a1 a0) in H0. Inversion H0. Elim (sumbool_of_bool (ad_eq a a')).
Intro H5. Rewrite (ad_eq_complete ? ? H5) in H1. Rewrite (M1_semantics_1 A a' a0) in H1.
Inversion H1. Rewrite <- (ad_eq_complete ? ? H2). Rewrite <- (ad_eq_complete ? ? H5).
Rewrite <- H4. Rewrite <- H6. (Split; Reflexivity).
Intro H5. Rewrite (M1_semantics_2 A a a' a0 H5) in H1. Discriminate H1.
Intro H2. Rewrite (M1_semantics_2 A a a1 a0 H2) in H0. Discriminate H0.
Intros. Simpl in H1. Elim (plus_is_one ? ? H1). Intro H4. Elim H4. Intros.
Rewrite (MapGet_M2_bit_0_if A m0 m1 a) in H2. Elim (sumbool_of_bool (ad_bit_0 a)).
Intro H7. Rewrite H7 in H2. Rewrite (MapGet_M2_bit_0_if A m0 m1 a') in H3.
Elim (sumbool_of_bool (ad_bit_0 a')). Intro H8. Rewrite H8 in H3. Elim (H0 H6 ? ? ? ? H2 H3).
Intros. Split. Rewrite <- (ad_div_2_double_plus_un a H7).
Rewrite <- (ad_div_2_double_plus_un a' H8). Rewrite H9. Reflexivity.
Assumption.
Intro H8. Rewrite H8 in H3. Rewrite (MapCard_is_O m0 H5 (ad_div_2 a')) in H3.
Discriminate H3.
Intro H7. Rewrite H7 in H2. Rewrite (MapCard_is_O m0 H5 (ad_div_2 a)) in H2.
Discriminate H2.
Intro H4. Elim H4. Intros. Rewrite (MapGet_M2_bit_0_if A m0 m1 a) in H2.
Elim (sumbool_of_bool (ad_bit_0 a)). Intro H7. Rewrite H7 in H2.
Rewrite (MapCard_is_O m1 H6 (ad_div_2 a)) in H2. Discriminate H2.
Intro H7. Rewrite H7 in H2. Rewrite (MapGet_M2_bit_0_if A m0 m1 a') in H3.
Elim (sumbool_of_bool (ad_bit_0 a')). Intro H8. Rewrite H8 in H3.
Rewrite (MapCard_is_O m1 H6 (ad_div_2 a')) in H3. Discriminate H3.
Intro H8. Rewrite H8 in H3. Elim (H H5 ? ? ? ? H2 H3). Intros. Split.
Rewrite <- (ad_div_2_double a H7). Rewrite <- (ad_div_2_double a' H8).
Rewrite H9. Reflexivity.
Assumption.
Qed
.
Lemma
length_as_fold : (C:Set) (l:(list C))
(length l)=(fold_right [_:C][n:nat](S n) O l).
Proof
.
Induction l. Reflexivity.
Intros. Simpl. Rewrite H. Reflexivity.
Qed
.
Lemma
length_as_fold_2 : (l:(alist A))
(length l)=(fold_right [r:ad*A][n:nat]let (a,y)=r in (plus (1) n) O l).
Proof
.
Induction l. Reflexivity.
Intros. Simpl. Rewrite H. (Elim a; Reflexivity).
Qed
.
Lemma
MapCard_as_Fold_1 : (m:(Map A)) (pf:ad->ad)
(MapCard A m)=(MapFold1 A nat O plus [_:ad][_:A](1) pf m).
Proof
.
Induction m. Trivial.
Trivial.
Intros. Simpl. Rewrite <- (H [a0:ad](pf (ad_double a0))).
Rewrite <- (H0 [a0:ad](pf (ad_double_plus_un a0))). Reflexivity.
Qed
.
Lemma
MapCard_as_Fold :
(m:(Map A)) (MapCard A m)=(MapFold A nat O plus [_:ad][_:A](1) m).
Proof
.
Intro. Exact (MapCard_as_Fold_1 m [a0:ad]a0).
Qed
.
Lemma
MapCard_as_length : (m:(Map A)) (MapCard A m)=(length (alist_of_Map A m)).
Proof
.
Intro. Rewrite MapCard_as_Fold. Rewrite length_as_fold_2.
Apply MapFold_as_fold with op:=plus neutral:=O f:=[_:ad][_:A](1). Exact plus_assoc_r.
Trivial.
Intro. Rewrite <- plus_n_O. Reflexivity.
Qed
.
Lemma
MapCard_Put1_equals_2 : (p:positive) (a,a':ad) (y,y':A)
(MapCard A (MapPut1 A a y a' y' p))=(2).
Proof
.
Induction p. Intros. Simpl. (Case (ad_bit_0 a); Reflexivity).
Intros. Simpl. Case (ad_bit_0 a). Exact (H (ad_div_2 a) (ad_div_2 a') y y').
Simpl. Rewrite <- plus_n_O. Exact (H (ad_div_2 a) (ad_div_2 a') y y').
Intros. Simpl. (Case (ad_bit_0 a); Reflexivity).
Qed
.
Lemma
MapCard_Put_sum : (m,m':(Map A)) (a:ad) (y:A) (n,n':nat)
m'=(MapPut A m a y) -> n=(MapCard A m) -> n'=(MapCard A m') ->
{n'=n}+{n'=(S n)}.
Proof
.
Induction m. Simpl. Intros. Rewrite H in H1. Simpl in H1. Right .
Rewrite H0. Rewrite H1. Reflexivity.
Intros a y m' a0 y0 n n' H H0 H1. Simpl in H. Elim (ad_sum (ad_xor a a0)). Intro H2.
Elim H2. Intros p H3. Rewrite H3 in H. Rewrite H in H1.
Rewrite (MapCard_Put1_equals_2 p a a0 y y0) in H1. Simpl in H0. Right .
Rewrite H0. Rewrite H1. Reflexivity.
Intro H2. Rewrite H2 in H. Rewrite H in H1. Simpl in H1. Simpl in H0. Left .
Rewrite H0. Rewrite H1. Reflexivity.
Intros. Simpl in H2. Rewrite (MapPut_semantics_3_1 A m0 m1 a y) in H1.
Elim (sumbool_of_bool (ad_bit_0 a)). Intro H4. Rewrite H4 in H1.
Elim (H0 (MapPut A m1 (ad_div_2 a) y) (ad_div_2 a) y (MapCard A m1)
(MapCard A (MapPut A m1 (ad_div_2 a) y)) (refl_equal ? ?)
(refl_equal ? ?) (refl_equal ? ?)).
Intro H5. Rewrite H1 in H3. Simpl in H3. Rewrite H5 in H3. Rewrite <- H2 in H3. Left .
Assumption.
Intro H5. Rewrite H1 in H3. Simpl in H3. Rewrite H5 in H3.
Rewrite <- (plus_Snm_nSm (MapCard A m0) (MapCard A m1)) in H3.
Simpl in H3. Rewrite <- H2 in H3. Right . Assumption.
Intro H4. Rewrite H4 in H1.
Elim (H (MapPut A m0 (ad_div_2 a) y) (ad_div_2 a) y (MapCard A m0)
(MapCard A (MapPut A m0 (ad_div_2 a) y)) (refl_equal ? ?)
(refl_equal ? ?) (refl_equal ? ?)).
Intro H5. Rewrite H1 in H3. Simpl in H3. Rewrite H5 in H3. Rewrite <- H2 in H3.
Left . Assumption.
Intro H5. Rewrite H1 in H3. Simpl in H3. Rewrite H5 in H3. Simpl in H3. Rewrite <- H2 in H3.
Right . Assumption.
Qed
.
Lemma
MapCard_Put_lb : (m:(Map A)) (a:ad) (y:A)
(ge (MapCard A (MapPut A m a y)) (MapCard A m)).
Proof
.
Unfold ge. Intros.
Elim (MapCard_Put_sum m (MapPut A m a y) a y (MapCard A m)
(MapCard A (MapPut A m a y)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H. Rewrite H. Apply le_n.
Intro H. Rewrite H. Apply le_n_Sn.
Qed
.
Lemma
MapCard_Put_ub : (m:(Map A)) (a:ad) (y:A)
(le (MapCard A (MapPut A m a y)) (S (MapCard A m))).
Proof
.
Intros.
Elim (MapCard_Put_sum m (MapPut A m a y) a y (MapCard A m)
(MapCard A (MapPut A m a y)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H. Rewrite H. Apply le_n_Sn.
Intro H. Rewrite H. Apply le_n.
Qed
.
Lemma
MapCard_Put_1 : (m:(Map A)) (a:ad) (y:A)
(MapCard A (MapPut A m a y))=(MapCard A m) ->
{y:A | (MapGet A m a)=(SOME A y)}.
Proof
.
Induction m. Intros. Discriminate H.
Intros a y a0 y0 H. Simpl in H. Elim (ad_sum (ad_xor a a0)). Intro H0. Elim H0.
Intros p H1. Rewrite H1 in H. Rewrite (MapCard_Put1_equals_2 p a a0 y y0) in H.
Discriminate H.
Intro H0. Rewrite H0 in H. Rewrite (ad_xor_eq ? ? H0). Split with y. Apply M1_semantics_1.
Intros. Rewrite (MapPut_semantics_3_1 A m0 m1 a y) in H1. Elim (sumbool_of_bool (ad_bit_0 a)).
Intro H2. Rewrite H2 in H1. Simpl in H1. Elim (H0 (ad_div_2 a) y (simpl_plus_l ? ? ? H1)).
Intros y0 H3. Split with y0. Rewrite <- H3. Exact (MapGet_M2_bit_0_1 A a H2 m0 m1).
Intro H2. Rewrite H2 in H1. Simpl in H1.
Rewrite (plus_sym (MapCard A (MapPut A m0 (ad_div_2 a) y)) (MapCard A m1)) in H1.
Rewrite (plus_sym (MapCard A m0) (MapCard A m1)) in H1.
Elim (H (ad_div_2 a) y (simpl_plus_l ? ? ? H1)). Intros y0 H3. Split with y0.
Rewrite <- H3. Exact (MapGet_M2_bit_0_0 A a H2 m0 m1).
Qed
.
Lemma
MapCard_Put_2 : (m:(Map A)) (a:ad) (y:A)
(MapCard A (MapPut A m a y))=(S (MapCard A m)) -> (MapGet A m a)=(NONE A).
Proof
.
Induction m. Trivial.
Intros. Simpl in H. Elim (sumbool_of_bool (ad_eq a a1)). Intro H0.
Rewrite (ad_eq_complete ? ? H0) in H. Rewrite (ad_xor_nilpotent a1) in H. Discriminate H.
Intro H0. Exact (M1_semantics_2 A a a1 a0 H0).
Intros. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H2.
Rewrite (MapGet_M2_bit_0_1 A a H2 m0 m1). Apply (H0 (ad_div_2 a) y).
Apply simpl_plus_l with n:=(MapCard A m0).
Rewrite <- (plus_Snm_nSm (MapCard A m0) (MapCard A m1)). Simpl in H1. Simpl. Rewrite <- H1.
Clear H1.
NewInduction a. Discriminate H2.
NewInduction p. Reflexivity.
Discriminate H2.
Reflexivity.
Intro H2. Rewrite (MapGet_M2_bit_0_0 A a H2 m0 m1). Apply (H (ad_div_2 a) y).
Cut (plus (MapCard A (MapPut A m0 (ad_div_2 a) y)) (MapCard A m1))
=(plus (S (MapCard A m0)) (MapCard A m1)).
Intro. Rewrite (plus_sym (MapCard A (MapPut A m0 (ad_div_2 a) y)) (MapCard A m1)) in H3.
Rewrite (plus_sym (S (MapCard A m0)) (MapCard A m1)) in H3. Exact (simpl_plus_l ? ? ? H3).
Simpl. Simpl in H1. Rewrite <- H1. NewInduction a. Trivial.
NewInduction p. Discriminate H2.
Reflexivity.
Discriminate H2.
Qed
.
Lemma
MapCard_Put_1_conv : (m:(Map A)) (a:ad) (y,y':A)
(MapGet A m a)=(SOME A y) -> (MapCard A (MapPut A m a y'))=(MapCard A m).
Proof
.
Intros.
Elim (MapCard_Put_sum m (MapPut A m a y') a y' (MapCard A m)
(MapCard A (MapPut A m a y')) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Trivial.
Intro H0. Rewrite (MapCard_Put_2 m a y' H0) in H. Discriminate H.
Qed
.
Lemma
MapCard_Put_2_conv : (m:(Map A)) (a:ad) (y:A)
(MapGet A m a)=(NONE A) -> (MapCard A (MapPut A m a y))=(S (MapCard A m)).
Proof
.
Intros.
Elim (MapCard_Put_sum m (MapPut A m a y) a y (MapCard A m)
(MapCard A (MapPut A m a y)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H0. Elim (MapCard_Put_1 m a y H0). Intros y' H1. Rewrite H1 in H. Discriminate H.
Trivial.
Qed
.
Lemma
MapCard_ext : (m,m':(Map A))
(eqm A (MapGet A m) (MapGet A m')) -> (MapCard A m)=(MapCard A m').
Proof
.
Unfold eqm. Intros. Rewrite (MapCard_as_length m). Rewrite (MapCard_as_length m').
Rewrite (alist_canonical A (alist_of_Map A m) (alist_of_Map A m')). Reflexivity.
Unfold eqm. Intro. Rewrite (Map_of_alist_semantics A (alist_of_Map A m) a).
Rewrite (Map_of_alist_semantics A (alist_of_Map A m') a). Rewrite (Map_of_alist_of_Map A m' a).
Rewrite (Map_of_alist_of_Map A m a). Exact (H a).
Apply alist_of_Map_sorts2.
Apply alist_of_Map_sorts2.
Qed
.
Lemma
MapCard_Dom : (m:(Map A)) (MapCard A m)=(MapCard unit (MapDom A m)).
Proof
.
(Induction m; Trivial). Intros. Simpl. Rewrite H. Rewrite H0. Reflexivity.
Qed
.
Lemma
MapCard_Dom_Put_behind : (m:(Map A)) (a:ad) (y:A)
(MapDom A (MapPut_behind A m a y))=(MapDom A (MapPut A m a y)).
Proof
.
Induction m. Trivial.
Intros a y a0 y0. Simpl. Elim (ad_sum (ad_xor a a0)). Intro H. Elim H.
Intros p H0. Rewrite H0. Reflexivity.
Intro H. Rewrite H. Rewrite (ad_xor_eq ? ? H). Reflexivity.
Intros. Simpl. Elim (ad_sum a). Intro H1. Elim H1. Intros p H2. Rewrite H2. Case p.
Intro p0. Simpl. Rewrite H0. Reflexivity.
Intro p0. Simpl. Rewrite H. Reflexivity.
Simpl. Rewrite H0. Reflexivity.
Intro H1. Rewrite H1. Simpl. Rewrite H. Reflexivity.
Qed
.
Lemma
MapCard_Put_behind_Put : (m:(Map A)) (a:ad) (y:A)
(MapCard A (MapPut_behind A m a y))=(MapCard A (MapPut A m a y)).
Proof
.
Intros. Rewrite MapCard_Dom. Rewrite MapCard_Dom. Rewrite MapCard_Dom_Put_behind.
Reflexivity.
Qed
.
Lemma
MapCard_Put_behind_sum : (m,m':(Map A)) (a:ad) (y:A) (n,n':nat)
m'=(MapPut_behind A m a y) -> n=(MapCard A m) -> n'=(MapCard A m') ->
{n'=n}+{n'=(S n)}.
Proof
.
Intros. (Apply (MapCard_Put_sum m (MapPut A m a y) a y n n'); Trivial).
Rewrite <- MapCard_Put_behind_Put. Rewrite <- H. Assumption.
Qed
.
Lemma
MapCard_makeM2 : (m,m':(Map A))
(MapCard A (makeM2 A m m'))=(plus (MapCard A m) (MapCard A m')).
Proof
.
Intros. Rewrite (MapCard_ext ? ? (makeM2_M2 A m m')). Reflexivity.
Qed
.
Lemma
MapCard_Remove_sum : (m,m':(Map A)) (a:ad) (n,n':nat)
m'=(MapRemove A m a) -> n=(MapCard A m) -> n'=(MapCard A m') ->
{n=n'}+{n=(S n')}.
Proof
.
Induction m. Simpl. Intros. Rewrite H in H1. Simpl in H1. Left . Rewrite H1. Assumption.
Simpl. Intros. Elim (sumbool_of_bool (ad_eq a a1)). Intro H2. Rewrite H2 in H.
Rewrite H in H1. Simpl in H1. Right . Rewrite H1. Assumption.
Intro H2. Rewrite H2 in H. Rewrite H in H1. Simpl in H1. Left . Rewrite H1. Assumption.
Intros. Simpl in H1. Simpl in H2. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H4.
Rewrite H4 in H1. Rewrite H1 in H3.
Rewrite (MapCard_makeM2 m0 (MapRemove A m1 (ad_div_2 a))) in H3.
Elim (H0 (MapRemove A m1 (ad_div_2 a)) (ad_div_2 a) (MapCard A m1)
(MapCard A (MapRemove A m1 (ad_div_2 a))) (refl_equal ? ?)
(refl_equal ? ?) (refl_equal ? ?)).
Intro H5. Rewrite H5 in H2. Left . Rewrite H3. Exact H2.
Intro H5. Rewrite H5 in H2.
Rewrite <- (plus_Snm_nSm (MapCard A m0) (MapCard A (MapRemove A m1 (ad_div_2 a)))) in H2.
Right . Rewrite H3. Exact H2.
Intro H4. Rewrite H4 in H1. Rewrite H1 in H3.
Rewrite (MapCard_makeM2 (MapRemove A m0 (ad_div_2 a)) m1) in H3.
Elim (H (MapRemove A m0 (ad_div_2 a)) (ad_div_2 a) (MapCard A m0)
(MapCard A (MapRemove A m0 (ad_div_2 a))) (refl_equal ? ?)
(refl_equal ? ?) (refl_equal ? ?)).
Intro H5. Rewrite H5 in H2. Left . Rewrite H3. Exact H2.
Intro H5. Rewrite H5 in H2. Right . Rewrite H3. Exact H2.
Qed
.
Lemma
MapCard_Remove_ub : (m:(Map A)) (a:ad)
(le (MapCard A (MapRemove A m a)) (MapCard A m)).
Proof
.
Intros.
Elim (MapCard_Remove_sum m (MapRemove A m a) a (MapCard A m)
(MapCard A (MapRemove A m a)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H. Rewrite H. Apply le_n.
Intro H. Rewrite H. Apply le_n_Sn.
Qed
.
Lemma
MapCard_Remove_lb : (m:(Map A)) (a:ad)
(ge (S (MapCard A (MapRemove A m a))) (MapCard A m)).
Proof
.
Unfold ge. Intros.
Elim (MapCard_Remove_sum m (MapRemove A m a) a (MapCard A m)
(MapCard A (MapRemove A m a)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H. Rewrite H. Apply le_n_Sn.
Intro H. Rewrite H. Apply le_n.
Qed
.
Lemma
MapCard_Remove_1 : (m:(Map A)) (a:ad)
(MapCard A (MapRemove A m a))=(MapCard A m) -> (MapGet A m a)=(NONE A).
Proof
.
Induction m. Trivial.
Simpl. Intros a y a0 H. Elim (sumbool_of_bool (ad_eq a a0)). Intro H0.
Rewrite H0 in H. Discriminate H.
Intro H0. Rewrite H0. Reflexivity.
Intros. Simpl in H1. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H2. Rewrite H2 in H1.
Rewrite (MapCard_makeM2 m0 (MapRemove A m1 (ad_div_2 a))) in H1.
Rewrite (MapGet_M2_bit_0_1 A a H2 m0 m1). Apply H0. Exact (simpl_plus_l ? ? ? H1).
Intro H2. Rewrite H2 in H1.
Rewrite (MapCard_makeM2 (MapRemove A m0 (ad_div_2 a)) m1) in H1.
Rewrite (MapGet_M2_bit_0_0 A a H2 m0 m1). Apply H.
Rewrite (plus_sym (MapCard A (MapRemove A m0 (ad_div_2 a))) (MapCard A m1)) in H1.
Rewrite (plus_sym (MapCard A m0) (MapCard A m1)) in H1. Exact (simpl_plus_l ? ? ? H1).
Qed
.
Lemma
MapCard_Remove_2 : (m:(Map A)) (a:ad)
(S (MapCard A (MapRemove A m a)))=(MapCard A m) ->
{y:A | (MapGet A m a)=(SOME A y)}.
Proof
.
Induction m. Intros. Discriminate H.
Intros a y a0 H. Simpl in H. Elim (sumbool_of_bool (ad_eq a a0)). Intro H0.
Rewrite (ad_eq_complete ? ? H0). Split with y. Exact (M1_semantics_1 A a0 y).
Intro H0. Rewrite H0 in H. Discriminate H.
Intros. Simpl in H1. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H2. Rewrite H2 in H1.
Rewrite (MapCard_makeM2 m0 (MapRemove A m1 (ad_div_2 a))) in H1.
Rewrite (MapGet_M2_bit_0_1 A a H2 m0 m1). Apply H0.
Change (plus (S (MapCard A m0)) (MapCard A (MapRemove A m1 (ad_div_2 a))))
=(plus (MapCard A m0) (MapCard A m1)) in H1.
Rewrite (plus_Snm_nSm (MapCard A m0) (MapCard A (MapRemove A m1 (ad_div_2 a)))) in H1.
Exact (simpl_plus_l ? ? ? H1).
Intro H2. Rewrite H2 in H1. Rewrite (MapGet_M2_bit_0_0 A a H2 m0 m1). Apply H.
Rewrite (MapCard_makeM2 (MapRemove A m0 (ad_div_2 a)) m1) in H1.
Change (plus (S (MapCard A (MapRemove A m0 (ad_div_2 a)))) (MapCard A m1))
=(plus (MapCard A m0) (MapCard A m1)) in H1.
Rewrite (plus_sym (S (MapCard A (MapRemove A m0 (ad_div_2 a)))) (MapCard A m1)) in H1.
Rewrite (plus_sym (MapCard A m0) (MapCard A m1)) in H1. Exact (simpl_plus_l ? ? ? H1).
Qed
.
Lemma
MapCard_Remove_1_conv : (m:(Map A)) (a:ad)
(MapGet A m a)=(NONE A) -> (MapCard A (MapRemove A m a))=(MapCard A m).
Proof
.
Intros.
Elim (MapCard_Remove_sum m (MapRemove A m a) a (MapCard A m)
(MapCard A (MapRemove A m a)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H0. Rewrite H0. Reflexivity.
Intro H0. Elim (MapCard_Remove_2 m a (sym_eq ? ? ? H0)). Intros y H1. Rewrite H1 in H.
Discriminate H.
Qed
.
Lemma
MapCard_Remove_2_conv : (m:(Map A)) (a:ad) (y:A)
(MapGet A m a)=(SOME A y) ->
(S (MapCard A (MapRemove A m a)))=(MapCard A m).
Proof
.
Intros.
Elim (MapCard_Remove_sum m (MapRemove A m a) a (MapCard A m)
(MapCard A (MapRemove A m a)) (refl_equal ? ?) (refl_equal ? ?)
(refl_equal ? ?)).
Intro H0. Rewrite (MapCard_Remove_1 m a (sym_eq ? ? ? H0)) in H. Discriminate H.
Intro H0. Rewrite H0. Reflexivity.
Qed
.
Lemma
MapMerge_Restr_Card : (m,m':(Map A))
(plus (MapCard A m) (MapCard A m'))=
(plus (MapCard A (MapMerge A m m')) (MapCard A (MapDomRestrTo A A m m'))).
Proof
.
Induction m. Simpl. Intro. Apply plus_n_O.
Simpl. Intros a y m'. Elim (option_sum A (MapGet A m' a)). Intro H. Elim H. Intros y0 H0.
Rewrite H0. Rewrite MapCard_Put_behind_Put. Rewrite (MapCard_Put_1_conv m' a y0 y H0).
Simpl. Rewrite <- plus_Snm_nSm. Apply plus_n_O.
Intro H. Rewrite H. Rewrite MapCard_Put_behind_Put. Rewrite (MapCard_Put_2_conv m' a y H).
Apply plus_n_O.
Intros.
Change (plus (plus (MapCard A m0) (MapCard A m1)) (MapCard A m'))
=(plus (MapCard A (MapMerge A (M2 A m0 m1) m'))
(MapCard A (MapDomRestrTo A A (M2 A m0 m1) m'))).
Elim m'. Reflexivity.
Intros a y. Unfold MapMerge. Unfold MapDomRestrTo.
Elim (option_sum A (MapGet A (M2 A m0 m1) a)). Intro H1. Elim H1. Intros y0 H2. Rewrite H2.
Rewrite (MapCard_Put_1_conv (M2 A m0 m1) a y0 y H2). Reflexivity.
Intro H1. Rewrite H1. Rewrite (MapCard_Put_2_conv (M2 A m0 m1) a y H1). Simpl.
Rewrite <- (plus_Snm_nSm (plus (MapCard A m0) (MapCard A m1)) O). Reflexivity.
Intros. Simpl.
Rewrite (plus_permute_2_in_4 (MapCard A m0) (MapCard A m1) (MapCard A m2) (MapCard A m3)).
Rewrite (H m2). Rewrite (H0 m3).
Rewrite (MapCard_makeM2 (MapDomRestrTo A A m0 m2) (MapDomRestrTo A A m1 m3)).
Apply plus_permute_2_in_4.
Qed
.
Lemma
MapMerge_disjoint_Card : (m,m':(Map A)) (MapDisjoint A A m m') ->
(MapCard A (MapMerge A m m'))=(plus (MapCard A m) (MapCard A m')).
Proof
.
Intros. Rewrite (MapMerge_Restr_Card m m').
Rewrite (MapCard_ext ? ? (MapDisjoint_imp_2 ? ? ? ? H)). Apply plus_n_O.
Qed
.
Lemma
MapSplit_Card : (m:(Map A)) (m':(Map B))
(MapCard A m)=(plus (MapCard A (MapDomRestrTo A B m m'))
(MapCard A (MapDomRestrBy A B m m'))).
Proof
.
Intros. Rewrite (MapCard_ext ? ? (MapDom_Split_1 A B m m')). Apply MapMerge_disjoint_Card.
Apply MapDisjoint_2_imp. Unfold MapDisjoint_2. Apply MapDom_Split_3.
Qed
.
Lemma
MapMerge_Card_ub : (m,m':(Map A))
(le (MapCard A (MapMerge A m m')) (plus (MapCard A m) (MapCard A m'))).
Proof
.
Intros. Rewrite MapMerge_Restr_Card. Apply le_plus_l.
Qed
.
Lemma
MapDomRestrTo_Card_ub_l : (m:(Map A)) (m':(Map B))
(le (MapCard A (MapDomRestrTo A B m m')) (MapCard A m)).
Proof
.
Intros. Rewrite (MapSplit_Card m m'). Apply le_plus_l.
Qed
.
Lemma
MapDomRestrBy_Card_ub_l : (m:(Map A)) (m':(Map B))
(le (MapCard A (MapDomRestrBy A B m m')) (MapCard A m)).
Proof
.
Intros. Rewrite (MapSplit_Card m m'). Apply le_plus_r.
Qed
.
Lemma
MapMerge_Card_disjoint : (m,m':(Map A))
(MapCard A (MapMerge A m m'))=(plus (MapCard A m) (MapCard A m')) ->
(MapDisjoint A A m m').
Proof
.
Induction m. Intros. Apply Map_M0_disjoint.
Simpl. Intros. Rewrite (MapCard_Put_behind_Put m' a a0) in H. Unfold MapDisjoint in_dom.
Simpl. Intros. Elim (sumbool_of_bool (ad_eq a a1)). Intro H2.
Rewrite (ad_eq_complete ? ? H2) in H. Rewrite (MapCard_Put_2 m' a1 a0 H) in H1.
Discriminate H1.
Intro H2. Rewrite H2 in H0. Discriminate H0.
Induction m'. Intros. Apply Map_disjoint_M0.
Intros a y H1. Rewrite <- (MapCard_ext ? ? (MapPut_as_Merge A (M2 A m0 m1) a y)) in H1.
Unfold 3 MapCard in H1. Rewrite <- (plus_Snm_nSm (MapCard A (M2 A m0 m1)) O) in H1.
Rewrite <- (plus_n_O (S (MapCard A (M2 A m0 m1)))) in H1. Unfold MapDisjoint in_dom.
Unfold 2 MapGet. Intros. Elim (sumbool_of_bool (ad_eq a a0)). Intro H4.
Rewrite <- (ad_eq_complete ? ? H4) in H2. Rewrite (MapCard_Put_2 ? ? ? H1) in H2.
Discriminate H2.
Intro H4. Rewrite H4 in H3. Discriminate H3.
Intros. Unfold MapDisjoint. Intros. Elim (sumbool_of_bool (ad_bit_0 a)). Intro H6.
Unfold MapDisjoint in H0. Apply H0 with m':=m3 a:=(ad_div_2 a). Apply le_antisym.
Apply MapMerge_Card_ub.
Apply simpl_le_plus_l with p:=(plus (MapCard A m0) (MapCard A m2)).
Rewrite (plus_permute_2_in_4 (MapCard A m0) (MapCard A m2) (MapCard A m1) (MapCard A m3)).
Change (MapCard A (M2 A (MapMerge A m0 m2) (MapMerge A m1 m3)))
=(plus (plus (MapCard A m0) (MapCard A m1)) (plus (MapCard A m2) (MapCard A m3))) in H3.
Rewrite <- H3. Simpl. Apply le_reg_r. Apply MapMerge_Card_ub.
Elim (in_dom_some ? ? ? H4). Intros y H7. Rewrite (MapGet_M2_bit_0_1 ? a H6 m0 m1) in H7.
Unfold in_dom. Rewrite H7. Reflexivity.
Elim (in_dom_some ? ? ? H5). Intros y H7. Rewrite (MapGet_M2_bit_0_1 ? a H6 m2 m3) in H7.
Unfold in_dom. Rewrite H7. Reflexivity.
Intro H6. Unfold MapDisjoint in H. Apply H with m':=m2 a:=(ad_div_2 a). Apply le_antisym.
Apply MapMerge_Card_ub.
Apply simpl_le_plus_l with p:=(plus (MapCard A m1) (MapCard A m3)).
Rewrite (plus_sym (plus (MapCard A m1) (MapCard A m3)) (plus (MapCard A m0) (MapCard A m2))).
Rewrite (plus_permute_2_in_4 (MapCard A m0) (MapCard A m2) (MapCard A m1) (MapCard A m3)).
Rewrite (plus_sym (plus (MapCard A m1) (MapCard A m3)) (MapCard A (MapMerge A m0 m2))).
Change (plus (MapCard A (MapMerge A m0 m2)) (MapCard A (MapMerge A m1 m3)))
=(plus (plus (MapCard A m0) (MapCard A m1)) (plus (MapCard A m2) (MapCard A m3))) in H3.
Rewrite <- H3. Apply le_reg_l. Apply MapMerge_Card_ub.
Elim (in_dom_some ? ? ? H4). Intros y H7. Rewrite (MapGet_M2_bit_0_0 ? a H6 m0 m1) in H7.
Unfold in_dom. Rewrite H7. Reflexivity.
Elim (in_dom_some ? ? ? H5). Intros y H7. Rewrite (MapGet_M2_bit_0_0 ? a H6 m2 m3) in H7.
Unfold in_dom. Rewrite H7. Reflexivity.
Qed
.
Lemma
MapCard_is_Sn : (m:(Map A)) (n:nat) (MapCard ? m)=(S n) ->
{a:ad | (in_dom ? a m)=true}.
Proof
.
Induction m. Intros. Discriminate H.
Intros a y n H. Split with a. Unfold in_dom. Rewrite (M1_semantics_1 ? a y). Reflexivity.
Intros. Simpl in H1. Elim (O_or_S (MapCard ? m0)). Intro H2. Elim H2. Intros m2 H3.
Elim (H ? (sym_eq ? ? ? H3)). Intros a H4. Split with (ad_double a). Unfold in_dom.
Rewrite (MapGet_M2_bit_0_0 A (ad_double a) (ad_double_bit_0 a) m0 m1).
Rewrite (ad_double_div_2 a). Elim (in_dom_some ? ? ? H4). Intros y H5. Rewrite H5. Reflexivity.
Intro H2. Rewrite <- H2 in H1. Simpl in H1. Elim (H0 ? H1). Intros a H3.
Split with (ad_double_plus_un a). Unfold in_dom.
Rewrite (MapGet_M2_bit_0_1 A (ad_double_plus_un a) (ad_double_plus_un_bit_0 a) m0 m1).
Rewrite (ad_double_plus_un_div_2 a). Elim (in_dom_some ? ? ? H3). Intros y H4. Rewrite H4.
Reflexivity.
Qed
.
End
MapCard.
Section
MapCard2.
Variable
A, B : Set.
Lemma
MapSubset_card_eq_1 : (n:nat) (m:(Map A)) (m':(Map B))
(MapSubset ? ? m m') -> (MapCard ? m)=n -> (MapCard ? m')=n ->
(MapSubset ? ? m' m).
Proof
.
Induction n. Intros. Unfold MapSubset in_dom. Intro. Rewrite (MapCard_is_O ? m H0 a).
Rewrite (MapCard_is_O ? m' H1 a). Intro H2. Discriminate H2.
Intros. Elim (MapCard_is_Sn A m n0 H1). Intros a H3. Elim (in_dom_some ? ? ? H3).
Intros y H4. Elim (in_dom_some ? ? ? (H0 ? H3)). Intros y' H6.
Cut (eqmap ? (MapPut ? (MapRemove ? m a) a y) m). Intro.
Cut (eqmap ? (MapPut ? (MapRemove ? m' a) a y') m'). Intro.
Apply MapSubset_ext with m0:=(MapPut ? (MapRemove ? m' a) a y')
m2:=(MapPut ? (MapRemove ? m a) a y).
Assumption.
Assumption.
Apply MapSubset_Put_mono. Apply H. Apply MapSubset_Remove_mono. Assumption.
Rewrite <- (MapCard_Remove_2_conv ? m a y H4) in H1. Inversion_clear H1. Reflexivity.
Rewrite <- (MapCard_Remove_2_conv ? m' a y' H6) in H2. Inversion_clear H2. Reflexivity.
Unfold eqmap eqm. Intro. Rewrite (MapPut_semantics ? (MapRemove B m' a) a y' a0).
Elim (sumbool_of_bool (ad_eq a a0)). Intro H7. Rewrite H7. Rewrite <- (ad_eq_complete ? ? H7).
Apply sym_eq. Assumption.
Intro H7. Rewrite H7. Rewrite (MapRemove_semantics ? m' a a0). Rewrite H7. Reflexivity.
Unfold eqmap eqm. Intro. Rewrite (MapPut_semantics ? (MapRemove A m a) a y a0).
Elim (sumbool_of_bool (ad_eq a a0)). Intro H7. Rewrite H7. Rewrite <- (ad_eq_complete ? ? H7).
Apply sym_eq. Assumption.
Intro H7. Rewrite H7. Rewrite (MapRemove_semantics A m a a0). Rewrite H7. Reflexivity.
Qed
.
Lemma
MapDomRestrTo_Card_ub_r : (m:(Map A)) (m':(Map B))
(le (MapCard A (MapDomRestrTo A B m m')) (MapCard B m')).
Proof
.
Induction m. Intro. Simpl. Apply le_O_n.
Intros a y m'. Simpl. Elim (option_sum B (MapGet B m' a)). Intro H. Elim H. Intros y0 H0.
Rewrite H0. Elim (MapCard_is_not_O B m' a y0 H0). Intros n H1. Rewrite H1. Simpl.
Apply le_n_S. Apply le_O_n.
Intro H. Rewrite H. Simpl. Apply le_O_n.
Induction m'. Simpl. Apply le_O_n.
Intros a y. Unfold MapDomRestrTo. Case (MapGet A (M2 A m0 m1) a). Simpl. Apply le_O_n.
Intro. Simpl. Apply le_n.
Intros. Simpl. Rewrite (MapCard_makeM2 A (MapDomRestrTo A B m0 m2) (MapDomRestrTo A B m1 m3)).
Apply le_plus_plus. Apply H.
Apply H0.
Qed
.
End
MapCard2.
Section
MapCard3.
Variable
A, B : Set.
Lemma
MapMerge_Card_lb_l : (m,m':(Map A))
(ge (MapCard A (MapMerge A m m')) (MapCard A m)).
Proof
.
Unfold ge. Intros. Apply (simpl_le_plus_l (MapCard A m')).
Rewrite (plus_sym (MapCard A m') (MapCard A m)).
Rewrite (plus_sym (MapCard A m') (MapCard A (MapMerge A m m'))).
Rewrite (MapMerge_Restr_Card A m m'). Apply le_reg_l. Apply MapDomRestrTo_Card_ub_r.
Qed
.
Lemma
MapMerge_Card_lb_r : (m,m':(Map A))
(ge (MapCard A (MapMerge A m m')) (MapCard A m')).
Proof
.
Unfold ge. Intros. Apply (simpl_le_plus_l (MapCard A m)). Rewrite (MapMerge_Restr_Card A m m').
Rewrite (plus_sym (MapCard A (MapMerge A m m')) (MapCard A (MapDomRestrTo A A m m'))).
Apply le_reg_r. Apply MapDomRestrTo_Card_ub_l.
Qed
.
Lemma
MapDomRestrBy_Card_lb : (m:(Map A)) (m':(Map B))
(ge (plus (MapCard B m') (MapCard A (MapDomRestrBy A B m m'))) (MapCard A m)).
Proof
.
Unfold ge. Intros. Rewrite (MapSplit_Card A B m m'). Apply le_reg_r.
Apply MapDomRestrTo_Card_ub_r.
Qed
.
Lemma
MapSubset_Card_le : (m:(Map A)) (m':(Map B))
(MapSubset A B m m') -> (le (MapCard A m) (MapCard B m')).
Proof
.
Intros. Apply le_trans with m:=(plus (MapCard B m') (MapCard A (MapDomRestrBy A B m m'))).
Exact (MapDomRestrBy_Card_lb m m').
Rewrite (MapCard_ext ? ? ? (MapSubset_imp_2 ? ? ? ? H)). Simpl. Rewrite <- plus_n_O.
Apply le_n.
Qed
.
Lemma
MapSubset_card_eq : (m:(Map A)) (m':(Map B))
(MapSubset ? ? m m') -> (le (MapCard ? m') (MapCard ? m)) ->
(eqmap ? (MapDom ? m) (MapDom ? m')).
Proof
.
Intros. Apply MapSubset_antisym. Assumption.
Cut (MapCard B m')=(MapCard A m). Intro. Apply (MapSubset_card_eq_1 A B (MapCard A m)).
Assumption.
Reflexivity.
Assumption.
Apply le_antisym. Assumption.
Apply MapSubset_Card_le. Assumption.
Qed
.
End
MapCard3.