--- a/src/HOL/Integ/nat_bin.ML Fri Oct 05 21:50:37 2001 +0200
+++ b/src/HOL/Integ/nat_bin.ML Fri Oct 05 21:52:39 2001 +0200
@@ -17,16 +17,16 @@
(*These rewrites should one day be re-oriented...*)
-Goal "#0 = (0::nat)";
+Goal "Numeral0 = (0::nat)";
by (simp_tac (HOL_basic_ss addsimps [nat_0, nat_number_of_def]) 1);
qed "numeral_0_eq_0";
-Goal "#1 = (1::nat)";
-by (simp_tac (HOL_basic_ss addsimps [nat_1, nat_number_of_def]) 1);
+Goal "Numeral1 = (1::nat)";
+by (simp_tac (HOL_basic_ss addsimps [nat_1, nat_number_of_def, One_nat_def]) 1);
qed "numeral_1_eq_1";
-Goal "#2 = (2::nat)";
-by (simp_tac (HOL_basic_ss addsimps [nat_2, nat_number_of_def]) 1);
+Goal "# 2 = Suc 1";
+by (simp_tac (HOL_basic_ss addsimps [nat_2, nat_number_of_def, One_nat_def]) 1);
qed "numeral_2_eq_2";
bind_thm ("zero_eq_numeral_0", numeral_0_eq_0 RS sym);
@@ -35,7 +35,7 @@
(*"neg" is used in rewrite rules for binary comparisons*)
Goal "int (number_of v :: nat) = \
-\ (if neg (number_of v) then #0 \
+\ (if neg (number_of v) then Numeral0 \
\ else (number_of v :: int))";
by (simp_tac
(simpset_of Int.thy addsimps [neg_nat, nat_number_of_def,
@@ -54,13 +54,13 @@
(** Successor **)
-Goal "(#0::int) <= z ==> Suc (nat z) = nat (#1 + z)";
+Goal "(Numeral0::int) <= z ==> Suc (nat z) = nat (Numeral1 + z)";
by (rtac sym 1);
by (asm_simp_tac (simpset() addsimps [nat_eq_iff]) 1);
qed "Suc_nat_eq_nat_zadd1";
Goal "Suc (number_of v) = \
-\ (if neg (number_of v) then #1 else number_of (bin_succ v))";
+\ (if neg (number_of v) then Numeral1 else number_of (bin_succ v))";
by (simp_tac
(simpset_of Int.thy addsimps [neg_nat, nat_1, not_neg_eq_ge_0,
nat_number_of_def, int_Suc,
@@ -69,21 +69,21 @@
Addsimps [Suc_nat_number_of];
Goal "Suc (number_of v + n) = \
-\ (if neg (number_of v) then #1+n else number_of (bin_succ v) + n)";
+\ (if neg (number_of v) then Numeral1+n else number_of (bin_succ v) + n)";
by (Simp_tac 1);
qed "Suc_nat_number_of_add";
-Goal "Suc #0 = #1";
+Goal "Suc Numeral0 = Numeral1";
by (Simp_tac 1);
qed "Suc_numeral_0_eq_1";
-Goal "Suc #1 = #2";
+Goal "Suc Numeral1 = # 2";
by (Simp_tac 1);
qed "Suc_numeral_1_eq_2";
(** Addition **)
-Goal "[| (#0::int) <= z; #0 <= z' |] ==> nat (z+z') = nat z + nat z'";
+Goal "[| (Numeral0::int) <= z; Numeral0 <= z' |] ==> nat (z+z') = nat z + nat z'";
by (rtac (inj_int RS injD) 1);
by (asm_simp_tac (simpset() addsimps [zadd_int RS sym]) 1);
qed "nat_add_distrib";
@@ -103,7 +103,7 @@
(** Subtraction **)
-Goal "[| (#0::int) <= z'; z' <= z |] ==> nat (z-z') = nat z - nat z'";
+Goal "[| (Numeral0::int) <= z'; z' <= z |] ==> nat (z-z') = nat z - nat z'";
by (rtac (inj_int RS injD) 1);
by (asm_simp_tac (simpset() addsimps [zdiff_int RS sym, nat_le_eq_zle]) 1);
qed "nat_diff_distrib";
@@ -122,7 +122,7 @@
"(number_of v :: nat) - number_of v' = \
\ (if neg (number_of v') then number_of v \
\ else let d = number_of (bin_add v (bin_minus v')) in \
-\ if neg d then #0 else nat d)";
+\ if neg d then Numeral0 else nat d)";
by (simp_tac
(simpset_of Int.thy delcongs [if_weak_cong]
addsimps [not_neg_eq_ge_0, nat_0,
@@ -134,22 +134,22 @@
(** Multiplication **)
-Goal "(#0::int) <= z ==> nat (z*z') = nat z * nat z'";
-by (case_tac "#0 <= z'" 1);
+Goal "(Numeral0::int) <= z ==> nat (z*z') = nat z * nat z'";
+by (case_tac "Numeral0 <= z'" 1);
by (asm_full_simp_tac (simpset() addsimps [zmult_le_0_iff]) 2);
by (rtac (inj_int RS injD) 1);
by (asm_simp_tac (simpset() addsimps [zmult_int RS sym,
int_0_le_mult_iff]) 1);
qed "nat_mult_distrib";
-Goal "z <= (#0::int) ==> nat(z*z') = nat(-z) * nat(-z')";
+Goal "z <= (Numeral0::int) ==> nat(z*z') = nat(-z) * nat(-z')";
by (rtac trans 1);
by (rtac nat_mult_distrib 2);
by Auto_tac;
qed "nat_mult_distrib_neg";
Goal "(number_of v :: nat) * number_of v' = \
-\ (if neg (number_of v) then #0 else number_of (bin_mult v v'))";
+\ (if neg (number_of v) then Numeral0 else number_of (bin_mult v v'))";
by (simp_tac
(simpset_of Int.thy addsimps [neg_nat, not_neg_eq_ge_0, nat_number_of_def,
nat_mult_distrib RS sym, number_of_mult,
@@ -161,15 +161,15 @@
(** Quotient **)
-Goal "(#0::int) <= z ==> nat (z div z') = nat z div nat z'";
-by (case_tac "#0 <= z'" 1);
+Goal "(Numeral0::int) <= z ==> nat (z div z') = nat z div nat z'";
+by (case_tac "Numeral0 <= z'" 1);
by (auto_tac (claset(),
simpset() addsimps [div_nonneg_neg_le0, DIVISION_BY_ZERO_DIV]));
-by (zdiv_undefined_case_tac "z' = #0" 1);
+by (zdiv_undefined_case_tac "z' = Numeral0" 1);
by (simp_tac (simpset() addsimps [numeral_0_eq_0, DIVISION_BY_ZERO_DIV]) 1);
by (auto_tac (claset() addSEs [nonneg_eq_int], simpset()));
by (rename_tac "m m'" 1);
-by (subgoal_tac "#0 <= int m div int m'" 1);
+by (subgoal_tac "Numeral0 <= int m div int m'" 1);
by (asm_full_simp_tac
(simpset() addsimps [numeral_0_eq_0, pos_imp_zdiv_nonneg_iff]) 2);
by (rtac (inj_int RS injD) 1);
@@ -184,7 +184,7 @@
qed "nat_div_distrib";
Goal "(number_of v :: nat) div number_of v' = \
-\ (if neg (number_of v) then #0 \
+\ (if neg (number_of v) then Numeral0 \
\ else nat (number_of v div number_of v'))";
by (simp_tac
(simpset_of Int.thy addsimps [not_neg_eq_ge_0, nat_number_of_def, neg_nat,
@@ -197,12 +197,12 @@
(** Remainder **)
(*Fails if z'<0: the LHS collapses to (nat z) but the RHS doesn't*)
-Goal "[| (#0::int) <= z; #0 <= z' |] ==> nat (z mod z') = nat z mod nat z'";
-by (zdiv_undefined_case_tac "z' = #0" 1);
+Goal "[| (Numeral0::int) <= z; Numeral0 <= z' |] ==> nat (z mod z') = nat z mod nat z'";
+by (zdiv_undefined_case_tac "z' = Numeral0" 1);
by (simp_tac (simpset() addsimps [numeral_0_eq_0, DIVISION_BY_ZERO_MOD]) 1);
by (auto_tac (claset() addSEs [nonneg_eq_int], simpset()));
by (rename_tac "m m'" 1);
-by (subgoal_tac "#0 <= int m mod int m'" 1);
+by (subgoal_tac "Numeral0 <= int m mod int m'" 1);
by (asm_full_simp_tac
(simpset() addsimps [nat_less_iff, numeral_0_eq_0, pos_mod_sign]) 2);
by (rtac (inj_int RS injD) 1);
@@ -217,7 +217,7 @@
qed "nat_mod_distrib";
Goal "(number_of v :: nat) mod number_of v' = \
-\ (if neg (number_of v) then #0 \
+\ (if neg (number_of v) then Numeral0 \
\ else if neg (number_of v') then number_of v \
\ else nat (number_of v mod number_of v'))";
by (simp_tac
@@ -233,7 +233,7 @@
(** Equals (=) **)
-Goal "[| (#0::int) <= z; #0 <= z' |] ==> (nat z = nat z') = (z=z')";
+Goal "[| (Numeral0::int) <= z; Numeral0 <= z' |] ==> (nat z = nat z') = (z=z')";
by (auto_tac (claset() addSEs [nonneg_eq_int], simpset()));
qed "eq_nat_nat_iff";
@@ -280,22 +280,22 @@
(*** New versions of existing theorems involving 0, 1, 2 ***)
-(*Maps n to #n for n = 0, 1, 2*)
-val numeral_sym_ss =
- HOL_ss addsimps [numeral_0_eq_0 RS sym,
- numeral_1_eq_1 RS sym,
+(*Maps n to # n for n = 0, 1, 2*)
+val numeral_sym_ss =
+ HOL_ss addsimps [numeral_0_eq_0 RS sym,
+ numeral_1_eq_1 RS sym,
numeral_2_eq_2 RS sym,
Suc_numeral_1_eq_2, Suc_numeral_0_eq_1];
fun rename_numerals th = simplify numeral_sym_ss (Thm.transfer (the_context ()) th);
-(*Maps #n to n for n = 0, 1, 2*)
+(*Maps # n to n for n = 0, 1, 2*)
bind_thms ("numerals", [numeral_0_eq_0, numeral_1_eq_1, numeral_2_eq_2]);
val numeral_ss = simpset() addsimps numerals;
(** Nat **)
-Goal "#0 < n ==> n = Suc(n - #1)";
+Goal "Numeral0 < n ==> n = Suc(n - Numeral1)";
by (asm_full_simp_tac numeral_ss 1);
qed "Suc_pred'";
@@ -329,28 +329,28 @@
AddIffs (map rename_numerals [add_is_0, add_gr_0]);
-Goal "Suc n = n + #1";
+Goal "Suc n = n + Numeral1";
by (asm_simp_tac numeral_ss 1);
qed "Suc_eq_add_numeral_1";
(* These two can be useful when m = number_of... *)
-Goal "(m::nat) + n = (if m=#0 then n else Suc ((m - #1) + n))";
+Goal "(m::nat) + n = (if m=Numeral0 then n else Suc ((m - Numeral1) + n))";
by (case_tac "m" 1);
by (ALLGOALS (asm_simp_tac numeral_ss));
qed "add_eq_if";
-Goal "(m::nat) * n = (if m=#0 then #0 else n + ((m - #1) * n))";
+Goal "(m::nat) * n = (if m=Numeral0 then Numeral0 else n + ((m - Numeral1) * n))";
by (case_tac "m" 1);
by (ALLGOALS (asm_simp_tac numeral_ss));
qed "mult_eq_if";
-Goal "(p ^ m :: nat) = (if m=#0 then #1 else p * (p ^ (m - #1)))";
+Goal "(p ^ m :: nat) = (if m=Numeral0 then Numeral1 else p * (p ^ (m - Numeral1)))";
by (case_tac "m" 1);
by (ALLGOALS (asm_simp_tac numeral_ss));
qed "power_eq_if";
-Goal "[| #0<n; #0<m |] ==> m - n < (m::nat)";
+Goal "[| Numeral0<n; Numeral0<m |] ==> m - n < (m::nat)";
by (asm_full_simp_tac (numeral_ss addsimps [diff_less]) 1);
qed "diff_less'";
@@ -375,20 +375,20 @@
(** Power **)
-Goal "(p::nat) ^ #0 = #1";
+Goal "(p::nat) ^ Numeral0 = Numeral1";
by (simp_tac numeral_ss 1);
qed "power_zero";
-Goal "(p::nat) ^ #1 = p";
+Goal "(p::nat) ^ Numeral1 = p";
by (simp_tac numeral_ss 1);
qed "power_one";
Addsimps [power_zero, power_one];
-Goal "(p::nat) ^ #2 = p*p";
+Goal "(p::nat) ^ # 2 = p*p";
by (simp_tac numeral_ss 1);
qed "power_two";
-Goal "#0 < (i::nat) ==> #0 < i^n";
+Goal "Numeral0 < (i::nat) ==> Numeral0 < i^n";
by (asm_simp_tac numeral_ss 1);
qed "zero_less_power'";
Addsimps [zero_less_power'];
@@ -495,9 +495,9 @@
by Auto_tac;
val lemma1 = result();
-Goal "m+m ~= int 1' + n + n";
+Goal "m+m ~= int (Suc 0) + n + n";
by Auto_tac;
-by (dres_inst_tac [("f", "%x. x mod #2")] arg_cong 1);
+by (dres_inst_tac [("f", "%x. x mod # 2")] arg_cong 1);
by (full_simp_tac (simpset() addsimps [zmod_zadd1_eq]) 1);
val lemma2 = result();
@@ -514,7 +514,7 @@
by (res_inst_tac [("x", "number_of v")] spec 1);
by Safe_tac;
by (ALLGOALS Full_simp_tac);
-by (dres_inst_tac [("f", "%x. x mod #2")] arg_cong 1);
+by (dres_inst_tac [("f", "%x. x mod # 2")] arg_cong 1);
by (full_simp_tac (simpset() addsimps [zmod_zadd1_eq]) 1);
qed "eq_number_of_BIT_Pls";
@@ -524,7 +524,7 @@
[number_of_BIT, number_of_Min, eq_commute]) 1);
by (res_inst_tac [("x", "number_of v")] spec 1);
by Auto_tac;
-by (dres_inst_tac [("f", "%x. x mod #2")] arg_cong 1);
+by (dres_inst_tac [("f", "%x. x mod # 2")] arg_cong 1);
by Auto_tac;
qed "eq_number_of_BIT_Min";
@@ -536,7 +536,7 @@
(*** Further lemmas about "nat" ***)
Goal "nat (abs (w * z)) = nat (abs w) * nat (abs z)";
-by (case_tac "z=#0 | w=#0" 1);
+by (case_tac "z=Numeral0 | w=Numeral0" 1);
by Auto_tac;
by (simp_tac (simpset() addsimps [zabs_def, nat_mult_distrib RS sym,
nat_mult_distrib_neg RS sym, zmult_less_0_iff]) 1);