src/HOL/Power.thy
author haftmann
Tue, 21 Jul 2009 17:02:18 +0200
changeset 32127 631546213601
parent 31998 2c7a24f74db9
child 33274 b6ff7db522b5
permissions -rw-r--r--
merged
Ignore whitespace changes - Everywhere: Within whitespace: At end of lines:
3390
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
     1
(*  Title:      HOL/Power.thy
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
     2
    Author:     Lawrence C Paulson, Cambridge University Computer Laboratory
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
     3
    Copyright   1997  University of Cambridge
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
     4
*)
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
     5
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
     6
header {* Exponentiation *}
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
     7
15131
c69542757a4d New theory header syntax.
nipkow
parents: 15066
diff changeset
     8
theory Power
21413
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
     9
imports Nat
15131
c69542757a4d New theory header syntax.
nipkow
parents: 15066
diff changeset
    10
begin
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    11
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    12
subsection {* Powers for Arbitrary Monoids *}
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    13
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    14
class power = one + times
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    15
begin
24996
ebd5f4cc7118 moved class power to theory Power
haftmann
parents: 24376
diff changeset
    16
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    17
primrec power :: "'a \<Rightarrow> nat \<Rightarrow> 'a" (infixr "^" 80) where
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    18
    power_0: "a ^ 0 = 1"
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    19
  | power_Suc: "a ^ Suc n = a * a ^ n"
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    20
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    21
notation (latex output)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    22
  power ("(_\<^bsup>_\<^esup>)" [1000] 1000)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    23
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    24
notation (HTML output)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    25
  power ("(_\<^bsup>_\<^esup>)" [1000] 1000)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    26
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
    27
end
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    28
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    29
context monoid_mult
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    30
begin
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    31
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    32
subclass power ..
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    33
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    34
lemma power_one [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    35
  "1 ^ n = 1"
30273
ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc
huffman
parents: 30242
diff changeset
    36
  by (induct n) simp_all
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    37
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    38
lemma power_one_right [simp]:
31001
7e6ffd8f51a9 cleaned up theory power further
haftmann
parents: 30997
diff changeset
    39
  "a ^ 1 = a"
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    40
  by simp
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    41
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    42
lemma power_commutes:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    43
  "a ^ n * a = a * a ^ n"
30273
ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc
huffman
parents: 30242
diff changeset
    44
  by (induct n) (simp_all add: mult_assoc)
21199
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0.
krauss
parents: 17149
diff changeset
    45
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    46
lemma power_Suc2:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    47
  "a ^ Suc n = a ^ n * a"
30273
ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc
huffman
parents: 30242
diff changeset
    48
  by (simp add: power_commutes)
28131
3130d7b3149d add lemma power_Suc2; generalize power_minus from class comm_ring_1 to ring_1
huffman
parents: 25874
diff changeset
    49
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    50
lemma power_add:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    51
  "a ^ (m + n) = a ^ m * a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    52
  by (induct m) (simp_all add: algebra_simps)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    53
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    54
lemma power_mult:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    55
  "a ^ (m * n) = (a ^ m) ^ n"
30273
ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc
huffman
parents: 30242
diff changeset
    56
  by (induct n) (simp_all add: power_add)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    57
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    58
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    59
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    60
context comm_monoid_mult
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    61
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    62
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    63
lemma power_mult_distrib:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    64
  "(a * b) ^ n = (a ^ n) * (b ^ n)"
30273
ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc
huffman
parents: 30242
diff changeset
    65
  by (induct n) (simp_all add: mult_ac)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
    66
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    67
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    68
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    69
context semiring_1
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    70
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    71
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    72
lemma of_nat_power:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    73
  "of_nat (m ^ n) = of_nat m ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    74
  by (induct n) (simp_all add: of_nat_mult)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    75
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    76
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    77
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    78
context comm_semiring_1
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    79
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    80
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    81
text {* The divides relation *}
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    82
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    83
lemma le_imp_power_dvd:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    84
  assumes "m \<le> n" shows "a ^ m dvd a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    85
proof
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    86
  have "a ^ n = a ^ (m + (n - m))"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    87
    using `m \<le> n` by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    88
  also have "\<dots> = a ^ m * a ^ (n - m)"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    89
    by (rule power_add)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    90
  finally show "a ^ n = a ^ m * a ^ (n - m)" .
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    91
qed
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    92
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    93
lemma power_le_dvd:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    94
  "a ^ n dvd b \<Longrightarrow> m \<le> n \<Longrightarrow> a ^ m dvd b"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    95
  by (rule dvd_trans [OF le_imp_power_dvd])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    96
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    97
lemma dvd_power_same:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    98
  "x dvd y \<Longrightarrow> x ^ n dvd y ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
    99
  by (induct n) (auto simp add: mult_dvd_mono)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   100
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   101
lemma dvd_power_le:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   102
  "x dvd y \<Longrightarrow> m \<ge> n \<Longrightarrow> x ^ n dvd y ^ m"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   103
  by (rule power_le_dvd [OF dvd_power_same])
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   104
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   105
lemma dvd_power [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   106
  assumes "n > (0::nat) \<or> x = 1"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   107
  shows "x dvd (x ^ n)"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   108
using assms proof
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   109
  assume "0 < n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   110
  then have "x ^ n = x ^ Suc (n - 1)" by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   111
  then show "x dvd (x ^ n)" by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   112
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   113
  assume "x = 1"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   114
  then show "x dvd (x ^ n)" by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   115
qed
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   116
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   117
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   118
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   119
context ring_1
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   120
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   121
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   122
lemma power_minus:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   123
  "(- a) ^ n = (- 1) ^ n * a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   124
proof (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   125
  case 0 show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   126
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   127
  case (Suc n) then show ?case
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   128
    by (simp del: power_Suc add: power_Suc2 mult_assoc)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   129
qed
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   130
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   131
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   132
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   133
context ordered_semidom
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   134
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   135
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   136
lemma zero_less_power [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   137
  "0 < a \<Longrightarrow> 0 < a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   138
  by (induct n) (simp_all add: mult_pos_pos)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   139
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   140
lemma zero_le_power [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   141
  "0 \<le> a \<Longrightarrow> 0 \<le> a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   142
  by (induct n) (simp_all add: mult_nonneg_nonneg)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   143
25874
14819a95cf75 added simp attributes
nipkow
parents: 25836
diff changeset
   144
lemma one_le_power[simp]:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   145
  "1 \<le> a \<Longrightarrow> 1 \<le> a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   146
  apply (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   147
  apply simp_all
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   148
  apply (rule order_trans [OF _ mult_mono [of 1 _ 1]])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   149
  apply (simp_all add: order_trans [OF zero_le_one])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   150
  done
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   151
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   152
lemma power_gt1_lemma:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   153
  assumes gt1: "1 < a"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   154
  shows "1 < a * a ^ n"
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   155
proof -
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   156
  from gt1 have "0 \<le> a"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   157
    by (fact order_trans [OF zero_le_one less_imp_le])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   158
  have "1 * 1 < a * 1" using gt1 by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   159
  also have "\<dots> \<le> a * a ^ n" using gt1
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   160
    by (simp only: mult_mono `0 \<le> a` one_le_power order_less_imp_le
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   161
        zero_le_one order_refl)
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   162
  finally show ?thesis by simp
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   163
qed
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   164
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   165
lemma power_gt1:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   166
  "1 < a \<Longrightarrow> 1 < a ^ Suc n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   167
  by (simp add: power_gt1_lemma)
24376
e403ab5c9415 add lemma one_less_power
huffman
parents: 24286
diff changeset
   168
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   169
lemma one_less_power [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   170
  "1 < a \<Longrightarrow> 0 < n \<Longrightarrow> 1 < a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   171
  by (cases n) (simp_all add: power_gt1_lemma)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   172
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   173
lemma power_le_imp_le_exp:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   174
  assumes gt1: "1 < a"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   175
  shows "a ^ m \<le> a ^ n \<Longrightarrow> m \<le> n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   176
proof (induct m arbitrary: n)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   177
  case 0
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   178
  show ?case by simp
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   179
next
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   180
  case (Suc m)
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   181
  show ?case
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   182
  proof (cases n)
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   183
    case 0
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   184
    with Suc.prems Suc.hyps have "a * a ^ m \<le> 1" by simp
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   185
    with gt1 show ?thesis
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   186
      by (force simp only: power_gt1_lemma
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   187
          not_less [symmetric])
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   188
  next
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   189
    case (Suc n)
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   190
    with Suc.prems Suc.hyps show ?thesis
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   191
      by (force dest: mult_left_le_imp_le
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   192
          simp add: less_trans [OF zero_less_one gt1])
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   193
  qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   194
qed
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   195
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   196
text{*Surely we can strengthen this? It holds for @{text "0<a<1"} too.*}
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   197
lemma power_inject_exp [simp]:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   198
  "1 < a \<Longrightarrow> a ^ m = a ^ n \<longleftrightarrow> m = n"
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   199
  by (force simp add: order_antisym power_le_imp_le_exp)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   200
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   201
text{*Can relax the first premise to @{term "0<a"} in the case of the
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   202
natural numbers.*}
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   203
lemma power_less_imp_less_exp:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   204
  "1 < a \<Longrightarrow> a ^ m < a ^ n \<Longrightarrow> m < n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   205
  by (simp add: order_less_le [of m n] less_le [of "a^m" "a^n"]
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   206
    power_le_imp_le_exp)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   207
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   208
lemma power_mono:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   209
  "a \<le> b \<Longrightarrow> 0 \<le> a \<Longrightarrow> a ^ n \<le> b ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   210
  by (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   211
    (auto intro: mult_mono order_trans [of 0 a b])
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   212
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   213
lemma power_strict_mono [rule_format]:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   214
  "a < b \<Longrightarrow> 0 \<le> a \<Longrightarrow> 0 < n \<longrightarrow> a ^ n < b ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   215
  by (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   216
   (auto simp add: mult_strict_mono le_less_trans [of 0 a b])
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   217
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   218
text{*Lemma for @{text power_strict_decreasing}*}
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   219
lemma power_Suc_less:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   220
  "0 < a \<Longrightarrow> a < 1 \<Longrightarrow> a * a ^ n < a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   221
  by (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   222
    (auto simp add: mult_strict_left_mono)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   223
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   224
lemma power_strict_decreasing [rule_format]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   225
  "n < N \<Longrightarrow> 0 < a \<Longrightarrow> a < 1 \<longrightarrow> a ^ N < a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   226
proof (induct N)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   227
  case 0 then show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   228
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   229
  case (Suc N) then show ?case 
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   230
  apply (auto simp add: power_Suc_less less_Suc_eq)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   231
  apply (subgoal_tac "a * a^N < 1 * a^n")
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   232
  apply simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   233
  apply (rule mult_strict_mono) apply auto
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   234
  done
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   235
qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   236
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   237
text{*Proof resembles that of @{text power_strict_decreasing}*}
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   238
lemma power_decreasing [rule_format]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   239
  "n \<le> N \<Longrightarrow> 0 \<le> a \<Longrightarrow> a \<le> 1 \<longrightarrow> a ^ N \<le> a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   240
proof (induct N)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   241
  case 0 then show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   242
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   243
  case (Suc N) then show ?case 
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   244
  apply (auto simp add: le_Suc_eq)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   245
  apply (subgoal_tac "a * a^N \<le> 1 * a^n", simp)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   246
  apply (rule mult_mono) apply auto
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   247
  done
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   248
qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   249
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   250
lemma power_Suc_less_one:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   251
  "0 < a \<Longrightarrow> a < 1 \<Longrightarrow> a ^ Suc n < 1"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   252
  using power_strict_decreasing [of 0 "Suc n" a] by simp
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   253
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   254
text{*Proof again resembles that of @{text power_strict_decreasing}*}
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   255
lemma power_increasing [rule_format]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   256
  "n \<le> N \<Longrightarrow> 1 \<le> a \<Longrightarrow> a ^ n \<le> a ^ N"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   257
proof (induct N)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   258
  case 0 then show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   259
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   260
  case (Suc N) then show ?case 
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   261
  apply (auto simp add: le_Suc_eq)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   262
  apply (subgoal_tac "1 * a^n \<le> a * a^N", simp)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   263
  apply (rule mult_mono) apply (auto simp add: order_trans [OF zero_le_one])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   264
  done
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   265
qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   266
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   267
text{*Lemma for @{text power_strict_increasing}*}
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   268
lemma power_less_power_Suc:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   269
  "1 < a \<Longrightarrow> a ^ n < a * a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   270
  by (induct n) (auto simp add: mult_strict_left_mono less_trans [OF zero_less_one])
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   271
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   272
lemma power_strict_increasing [rule_format]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   273
  "n < N \<Longrightarrow> 1 < a \<longrightarrow> a ^ n < a ^ N"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   274
proof (induct N)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   275
  case 0 then show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   276
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   277
  case (Suc N) then show ?case 
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   278
  apply (auto simp add: power_less_power_Suc less_Suc_eq)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   279
  apply (subgoal_tac "1 * a^n < a * a^N", simp)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   280
  apply (rule mult_strict_mono) apply (auto simp add: less_trans [OF zero_less_one] less_imp_le)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   281
  done
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   282
qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   283
25134
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   284
lemma power_increasing_iff [simp]:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   285
  "1 < b \<Longrightarrow> b ^ x \<le> b ^ y \<longleftrightarrow> x \<le> y"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   286
  by (blast intro: power_le_imp_le_exp power_increasing less_imp_le)
15066
d2f2b908e0a4 two new results
paulson
parents: 15004
diff changeset
   287
d2f2b908e0a4 two new results
paulson
parents: 15004
diff changeset
   288
lemma power_strict_increasing_iff [simp]:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   289
  "1 < b \<Longrightarrow> b ^ x < b ^ y \<longleftrightarrow> x < y"
25134
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   290
by (blast intro: power_less_imp_less_exp power_strict_increasing) 
15066
d2f2b908e0a4 two new results
paulson
parents: 15004
diff changeset
   291
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   292
lemma power_le_imp_le_base:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   293
  assumes le: "a ^ Suc n \<le> b ^ Suc n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   294
    and ynonneg: "0 \<le> b"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   295
  shows "a \<le> b"
25134
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   296
proof (rule ccontr)
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   297
  assume "~ a \<le> b"
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   298
  then have "b < a" by (simp only: linorder_not_le)
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   299
  then have "b ^ Suc n < a ^ Suc n"
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   300
    by (simp only: prems power_strict_mono)
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   301
  from le and this show False
25134
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   302
    by (simp add: linorder_not_less [symmetric])
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents: 25062
diff changeset
   303
qed
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   304
22853
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   305
lemma power_less_imp_less_base:
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   306
  assumes less: "a ^ n < b ^ n"
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   307
  assumes nonneg: "0 \<le> b"
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   308
  shows "a < b"
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   309
proof (rule contrapos_pp [OF less])
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   310
  assume "~ a < b"
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   311
  hence "b \<le> a" by (simp only: linorder_not_less)
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   312
  hence "b ^ n \<le> a ^ n" using nonneg by (rule power_mono)
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   313
  thus "\<not> a ^ n < b ^ n" by (simp only: linorder_not_less)
22853
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   314
qed
7f000a385606 add lemma power_less_imp_less_base
huffman
parents: 22624
diff changeset
   315
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   316
lemma power_inject_base:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   317
  "a ^ Suc n = b ^ Suc n \<Longrightarrow> 0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> a = b"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   318
by (blast intro: power_le_imp_le_base antisym eq_refl sym)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   319
22955
48dc37776d1e add lemma power_eq_imp_eq_base
huffman
parents: 22853
diff changeset
   320
lemma power_eq_imp_eq_base:
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   321
  "a ^ n = b ^ n \<Longrightarrow> 0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> 0 < n \<Longrightarrow> a = b"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   322
  by (cases n) (simp_all del: power_Suc, rule power_inject_base)
22955
48dc37776d1e add lemma power_eq_imp_eq_base
huffman
parents: 22853
diff changeset
   323
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   324
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   325
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   326
context ordered_idom
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   327
begin
29978
33df3c4eb629 generalize le_imp_power_dvd and power_le_dvd; move from Divides to Power
huffman
parents: 29608
diff changeset
   328
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   329
lemma power_abs:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   330
  "abs (a ^ n) = abs a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   331
  by (induct n) (auto simp add: abs_mult)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   332
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   333
lemma abs_power_minus [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   334
  "abs ((-a) ^ n) = abs (a ^ n)"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   335
  by (simp add: abs_minus_cancel power_abs) 
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   336
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   337
lemma zero_less_power_abs_iff [simp, noatp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   338
  "0 < abs a ^ n \<longleftrightarrow> a \<noteq> 0 \<or> n = 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   339
proof (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   340
  case 0 show ?case by simp
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   341
next
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   342
  case (Suc n) show ?case by (auto simp add: Suc zero_less_mult_iff)
29978
33df3c4eb629 generalize le_imp_power_dvd and power_le_dvd; move from Divides to Power
huffman
parents: 29608
diff changeset
   343
qed
33df3c4eb629 generalize le_imp_power_dvd and power_le_dvd; move from Divides to Power
huffman
parents: 29608
diff changeset
   344
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   345
lemma zero_le_power_abs [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   346
  "0 \<le> abs a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   347
  by (rule zero_le_power [OF abs_ge_zero])
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   348
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   349
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   350
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   351
context ring_1_no_zero_divisors
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   352
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   353
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   354
lemma field_power_not_zero:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   355
  "a \<noteq> 0 \<Longrightarrow> a ^ n \<noteq> 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   356
  by (induct n) auto
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   357
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   358
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   359
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   360
context division_ring
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   361
begin
29978
33df3c4eb629 generalize le_imp_power_dvd and power_le_dvd; move from Divides to Power
huffman
parents: 29608
diff changeset
   362
30997
081e825c2218 fixed document generation
haftmann
parents: 30996
diff changeset
   363
text {* FIXME reorient or rename to @{text nonzero_inverse_power} *}
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   364
lemma nonzero_power_inverse:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   365
  "a \<noteq> 0 \<Longrightarrow> inverse (a ^ n) = (inverse a) ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   366
  by (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   367
    (simp_all add: nonzero_inverse_mult_distrib power_commutes field_power_not_zero)
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   368
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   369
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   370
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   371
context field
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   372
begin
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   373
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   374
lemma nonzero_power_divide:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   375
  "b \<noteq> 0 \<Longrightarrow> (a / b) ^ n = a ^ n / b ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   376
  by (simp add: divide_inverse power_mult_distrib nonzero_power_inverse)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   377
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   378
end
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   379
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   380
lemma power_0_Suc [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   381
  "(0::'a::{power, semiring_0}) ^ Suc n = 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   382
  by simp
30313
b2441b0c8d38 added lemmas
nipkow
parents: 30273
diff changeset
   383
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   384
text{*It looks plausible as a simprule, but its effect can be strange.*}
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   385
lemma power_0_left:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   386
  "0 ^ n = (if n = 0 then 1 else (0::'a::{power, semiring_0}))"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   387
  by (induct n) simp_all
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   388
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   389
lemma power_eq_0_iff [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   390
  "a ^ n = 0 \<longleftrightarrow>
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   391
     a = (0::'a::{mult_zero,zero_neq_one,no_zero_divisors,power}) \<and> n \<noteq> 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   392
  by (induct n)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   393
    (auto simp add: no_zero_divisors elim: contrapos_pp)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   394
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   395
lemma power_diff:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   396
  fixes a :: "'a::field"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   397
  assumes nz: "a \<noteq> 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   398
  shows "n \<le> m \<Longrightarrow> a ^ (m - n) = a ^ m / a ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   399
  by (induct m n rule: diff_induct) (simp_all add: nz)
30313
b2441b0c8d38 added lemmas
nipkow
parents: 30273
diff changeset
   400
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   401
text{*Perhaps these should be simprules.*}
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   402
lemma power_inverse:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   403
  fixes a :: "'a::{division_ring,division_by_zero,power}"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   404
  shows "inverse (a ^ n) = (inverse a) ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   405
apply (cases "a = 0")
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   406
apply (simp add: power_0_left)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   407
apply (simp add: nonzero_power_inverse)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   408
done (* TODO: reorient or rename to inverse_power *)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   409
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   410
lemma power_one_over:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   411
  "1 / (a::'a::{field,division_by_zero, power}) ^ n =  (1 / a) ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   412
  by (simp add: divide_inverse) (rule power_inverse)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   413
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   414
lemma power_divide:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   415
  "(a / b) ^ n = (a::'a::{field,division_by_zero}) ^ n / b ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   416
apply (cases "b = 0")
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   417
apply (simp add: power_0_left)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   418
apply (rule nonzero_power_divide)
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   419
apply assumption
30313
b2441b0c8d38 added lemmas
nipkow
parents: 30273
diff changeset
   420
done
b2441b0c8d38 added lemmas
nipkow
parents: 30273
diff changeset
   421
b2441b0c8d38 added lemmas
nipkow
parents: 30273
diff changeset
   422
30960
fec1a04b7220 power operation defined generic
haftmann
parents: 30730
diff changeset
   423
subsection {* Exponentiation for the Natural Numbers *}
14577
dbb95b825244 tuned document;
wenzelm
parents: 14438
diff changeset
   424
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   425
lemma nat_one_le_power [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   426
  "Suc 0 \<le> i \<Longrightarrow> Suc 0 \<le> i ^ n"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   427
  by (rule one_le_power [of i n, unfolded One_nat_def])
23305
8ae6f7b0903b add lemma of_nat_power
huffman
parents: 23183
diff changeset
   428
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   429
lemma nat_zero_less_power_iff [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   430
  "x ^ n > 0 \<longleftrightarrow> x > (0::nat) \<or> n = 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   431
  by (induct n) auto
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   432
30056
0a35bee25c20 added lemmas
nipkow
parents: 29978
diff changeset
   433
lemma nat_power_eq_Suc_0_iff [simp]: 
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   434
  "x ^ m = Suc 0 \<longleftrightarrow> m = 0 \<or> x = Suc 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   435
  by (induct m) auto
30056
0a35bee25c20 added lemmas
nipkow
parents: 29978
diff changeset
   436
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   437
lemma power_Suc_0 [simp]:
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   438
  "Suc 0 ^ n = Suc 0"
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   439
  by simp
30056
0a35bee25c20 added lemmas
nipkow
parents: 29978
diff changeset
   440
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   441
text{*Valid for the naturals, but what if @{text"0<i<1"}?
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   442
Premises cannot be weakened: consider the case where @{term "i=0"},
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   443
@{term "m=1"} and @{term "n=0"}.*}
21413
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   444
lemma nat_power_less_imp_less:
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   445
  assumes nonneg: "0 < (i\<Colon>nat)"
30996
648d02b124d8 cleaned up Power theory
haftmann
parents: 30960
diff changeset
   446
  assumes less: "i ^ m < i ^ n"
21413
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   447
  shows "m < n"
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   448
proof (cases "i = 1")
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   449
  case True with less power_one [where 'a = nat] show ?thesis by simp
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   450
next
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   451
  case False with nonneg have "1 < i" by auto
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   452
  from power_strict_increasing_iff [OF this] less show ?thesis ..
0951647209f2 moved dvd stuff to theory Divides
haftmann
parents: 21199
diff changeset
   453
qed
14348
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents: 8844
diff changeset
   454
31155
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   455
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   456
subsection {* Code generator tweak *}
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   457
31998
2c7a24f74db9 code attributes use common underscore convention
haftmann
parents: 31155
diff changeset
   458
lemma power_power_power [code, code_unfold, code_inline del]:
31155
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   459
  "power = power.power (1::'a::{power}) (op *)"
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   460
  unfolding power_def power.power_def ..
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   461
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   462
declare power.power.simps [code]
92d8ff6af82c monomorphic code generation for power operations
haftmann
parents: 31021
diff changeset
   463
3390
0c7625196d95 New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff changeset
   464
end