| author | wenzelm |
| Thu, 26 Mar 2009 14:14:02 +0100 | |
| changeset 30722 | 623d4831c8cf |
| parent 30012 | a717c3dffe4f |
| child 30968 | 10fef94f40fc |
| permissions | -rw-r--r-- |
| 13936 | 1 |
(* |
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Title: Univariate Polynomials |
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Author: Clemens Ballarin, started 9 December 1996 |
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Copyright: Clemens Ballarin |
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*) |
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header {* Univariate Polynomials *}
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theory UnivPoly2 |
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imports "../abstract/Abstract" |
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begin |
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16640
03bdf544a552
Removed setsubgoaler hack (thanks to strong_setsum_cong).
berghofe
parents:
16052
diff
changeset
|
13 |
(* With this variant of setsum_cong, assumptions |
| 13936 | 14 |
like i:{m..n} get simplified (to m <= i & i <= n). *)
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15 |
||
|
16640
03bdf544a552
Removed setsubgoaler hack (thanks to strong_setsum_cong).
berghofe
parents:
16052
diff
changeset
|
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declare strong_setsum_cong [cong] |
| 13936 | 17 |
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section {* Definition of type up *}
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||
| 21423 | 20 |
definition |
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bound :: "[nat, nat => 'a::zero] => bool" where |
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"bound n f = (ALL i. n < i --> f i = 0)" |
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| 13936 | 23 |
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lemma boundI [intro!]: "[| !! m. n < m ==> f m = 0 |] ==> bound n f" |
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unfolding bound_def by blast |
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lemma boundE [elim?]: "[| bound n f; (!! m. n < m ==> f m = 0) ==> P |] ==> P" |
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unfolding bound_def by blast |
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lemma boundD [dest]: "[| bound n f; n < m |] ==> f m = 0" |
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unfolding bound_def by blast |
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lemma bound_below: |
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assumes bound: "bound m f" and nonzero: "f n ~= 0" shows "n <= m" |
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proof (rule classical) |
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assume "~ ?thesis" |
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then have "m < n" by arith |
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with bound have "f n = 0" .. |
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with nonzero show ?thesis by contradiction |
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qed |
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||
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typedef (UP) |
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('a) up = "{f :: nat => 'a::zero. EX n. bound n f}"
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by (rule+) (* Question: what does trace_rule show??? *) |
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section {* Constants *}
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||
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definition |
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coeff :: "['a up, nat] => ('a::zero)" where
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"coeff p n = Rep_UP p n" |
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definition |
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monom :: "['a::zero, nat] => 'a up" ("(3_*X^/_)" [71, 71] 70) where
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"monom a n = Abs_UP (%i. if i=n then a else 0)" |
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definition |
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smult :: "['a::{zero, times}, 'a up] => 'a up" (infixl "*s" 70) where
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"a *s p = Abs_UP (%i. a * Rep_UP p i)" |
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| 13936 | 60 |
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lemma coeff_bound_ex: "EX n. bound n (coeff p)" |
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proof - |
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have "(%n. coeff p n) : UP" by (simp add: coeff_def Rep_UP) |
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then obtain n where "bound n (coeff p)" by (unfold UP_def) fast |
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then show ?thesis .. |
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qed |
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lemma bound_coeff_obtain: |
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assumes prem: "(!!n. bound n (coeff p) ==> P)" shows "P" |
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proof - |
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have "(%n. coeff p n) : UP" by (simp add: coeff_def Rep_UP) |
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then obtain n where "bound n (coeff p)" by (unfold UP_def) fast |
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with prem show P . |
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qed |
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||
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|
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text {* Ring operations *}
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||
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instantiation up :: (zero) zero |
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begin |
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definition |
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up_zero_def: "0 = monom 0 0" |
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instance .. |
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end |
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instantiation up :: ("{one, zero}") one
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begin |
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definition |
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up_one_def: "1 = monom 1 0" |
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instance .. |
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end |
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instantiation up :: ("{plus, zero}") plus
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begin |
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definition |
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up_add_def: "p + q = Abs_UP (%n. Rep_UP p n + Rep_UP q n)" |
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instance .. |
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end |
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instantiation up :: ("{one, times, uminus, zero}") uminus
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begin |
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definition |
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(* note: - 1 is different from -1; latter is of class number *) |
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up_uminus_def:"- p = (- 1) *s p" |
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(* easier to use than "Abs_UP (%i. - Rep_UP p i)" *) |
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instance .. |
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end |
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instantiation up :: ("{one, plus, times, minus, uminus, zero}") minus
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begin |
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definition |
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up_minus_def: "(a :: 'a up) - b = a + (-b)" |
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instance .. |
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end |
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instantiation up :: ("{times, comm_monoid_add}") times
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begin |
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definition |
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up_mult_def: "p * q = Abs_UP (%n::nat. setsum |
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(%i. Rep_UP p i * Rep_UP q (n-i)) {..n})"
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| 25762 | 137 |
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instance .. |
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end |
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141 |
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27651
16a26996c30e
moved op dvd to theory Ring_and_Field; generalized a couple of lemmas
haftmann
parents:
27540
diff
changeset
|
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instance up :: ("{times, comm_monoid_add}") Ring_and_Field.dvd ..
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| 26563 | 143 |
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instantiation up :: ("{times, one, comm_monoid_add, uminus, minus}") inverse
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| 25762 | 145 |
begin |
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definition |
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up_inverse_def: "inverse (a :: 'a up) = (if a dvd 1 then |
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THE x. a * x = 1 else 0)" |
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definition |
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up_divide_def: "(a :: 'a up) / b = a * inverse b" |
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instance .. |
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end |
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instantiation up :: ("{times, one, comm_monoid_add}") power
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begin |
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160 |
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primrec power_up where |
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"(a \<Colon> 'a up) ^ 0 = 1" |
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| "(a \<Colon> 'a up) ^ Suc n = a ^ n * a" |
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instance .. |
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end |
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subsection {* Effect of operations on coefficients *}
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lemma coeff_monom [simp]: "coeff (monom a m) n = (if m=n then a else 0)" |
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proof - |
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have "(%n. if n = m then a else 0) : UP" |
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using UP_def by force |
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from this show ?thesis |
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by (simp add: coeff_def monom_def Abs_UP_inverse Rep_UP) |
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qed |
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lemma coeff_zero [simp]: "coeff 0 n = 0" |
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proof (unfold up_zero_def) |
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qed simp |
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lemma coeff_one [simp]: "coeff 1 n = (if n=0 then 1 else 0)" |
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proof (unfold up_one_def) |
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qed simp |
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(* term order |
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lemma coeff_smult [simp]: "coeff (a *s p) n = (a::'a::ring) * coeff p n" |
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proof - |
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have "!!f. f : UP ==> (%n. a * f n) : UP" |
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by (unfold UP_def) (force simp add: algebra_simps) |
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*) (* this force step is slow *) |
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(* then show ?thesis |
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apply (simp add: coeff_def smult_def Abs_UP_inverse Rep_UP) |
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qed |
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*) |
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lemma coeff_smult [simp]: "coeff (a *s p) n = (a::'a::ring) * coeff p n" |
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proof - |
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have "Rep_UP p : UP ==> (%n. a * Rep_UP p n) : UP" |
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by (unfold UP_def) (force simp add: algebra_simps) |
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(* this force step is slow *) |
202 |
then show ?thesis |
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by (simp add: coeff_def smult_def Abs_UP_inverse Rep_UP) |
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qed |
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205 |
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lemma coeff_add [simp]: "coeff (p+q) n = (coeff p n + coeff q n::'a::ring)" |
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proof - |
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{
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fix f g |
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assume fup: "(f::nat=>'a::ring) : UP" and gup: "(g::nat=>'a::ring) : UP" |
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have "(%i. f i + g i) : UP" |
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proof - |
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from fup obtain n where boundn: "bound n f" |
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by (unfold UP_def) fast |
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from gup obtain m where boundm: "bound m g" |
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by (unfold UP_def) fast |
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have "bound (max n m) (%i. (f i + g i))" |
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proof |
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fix i |
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assume "max n m < i" |
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with boundn and boundm show "f i + g i = 0" |
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by (fastsimp simp add: algebra_simps) |
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qed |
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then show "(%i. (f i + g i)) : UP" |
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by (unfold UP_def) fast |
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qed |
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} |
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then show ?thesis |
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by (simp add: coeff_def up_add_def Abs_UP_inverse Rep_UP) |
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qed |
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lemma coeff_mult [simp]: |
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"coeff (p * q) n = (setsum (%i. coeff p i * coeff q (n-i)) {..n}::'a::ring)"
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proof - |
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{
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fix f g |
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assume fup: "(f::nat=>'a::ring) : UP" and gup: "(g::nat=>'a::ring) : UP" |
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have "(%n. setsum (%i. f i * g (n-i)) {..n}) : UP"
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proof - |
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from fup obtain n where "bound n f" |
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by (unfold UP_def) fast |
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from gup obtain m where "bound m g" |
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by (unfold UP_def) fast |
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have "bound (n + m) (%n. setsum (%i. f i * g (n-i)) {..n})"
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proof |
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fix k |
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assume bound: "n + m < k" |
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{
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fix i |
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have "f i * g (k-i) = 0" |
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proof cases |
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assume "n < i" |
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with `bound n f` show ?thesis by (auto simp add: algebra_simps) |
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next |
255 |
assume "~ (n < i)" |
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with bound have "m < k-i" by arith |
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with `bound m g` show ?thesis by (auto simp add: algebra_simps) |
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qed |
259 |
} |
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then show "setsum (%i. f i * g (k-i)) {..k} = 0"
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by (simp add: algebra_simps) |
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qed |
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then show "(%n. setsum (%i. f i * g (n-i)) {..n}) : UP"
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by (unfold UP_def) fast |
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qed |
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} |
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then show ?thesis |
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by (simp add: coeff_def up_mult_def Abs_UP_inverse Rep_UP) |
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qed |
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lemma coeff_uminus [simp]: "coeff (-p) n = (-coeff p n::'a::ring)" |
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by (unfold up_uminus_def) (simp add: algebra_simps) |
| 13936 | 273 |
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(* Other lemmas *) |
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lemma up_eqI: assumes prem: "(!! n. coeff p n = coeff q n)" shows "p = q" |
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proof - |
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have "p = Abs_UP (%u. Rep_UP p u)" by (simp add: Rep_UP_inverse) |
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also from prem have "... = Abs_UP (Rep_UP q)" by (simp only: coeff_def) |
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also have "... = q" by (simp add: Rep_UP_inverse) |
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finally show ?thesis . |
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qed |
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||
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(* ML {* Addsimprocs [ring_simproc] *} *)
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instance up :: (ring) ring |
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proof |
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fix p q r :: "'a::ring up" |
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show "(p + q) + r = p + (q + r)" |
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by (rule up_eqI) simp |
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show "0 + p = p" |
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by (rule up_eqI) simp |
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show "(-p) + p = 0" |
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by (rule up_eqI) simp |
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show "p + q = q + p" |
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by (rule up_eqI) simp |
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show "(p * q) * r = p * (q * r)" |
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proof (rule up_eqI) |
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fix n |
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{
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fix k and a b c :: "nat=>'a::ring" |
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have "k <= n ==> |
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setsum (%j. setsum (%i. a i * b (j-i)) {..j} * c (n-j)) {..k} =
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setsum (%j. a j * setsum (%i. b i * c (n-j-i)) {..k-j}) {..k}"
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(is "_ ==> ?eq k") |
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proof (induct k) |
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307 |
case 0 show ?case by simp |
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308 |
next |
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309 |
case (Suc k) |
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then have "k <= n" by arith |
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then have "?eq k" by (rule Suc) |
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then show ?case |
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by (simp add: Suc_diff_le natsum_ldistr) |
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qed |
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315 |
} |
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316 |
then show "coeff ((p * q) * r) n = coeff (p * (q * r)) n" |
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by simp |
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qed |
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show "1 * p = p" |
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320 |
proof (rule up_eqI) |
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321 |
fix n |
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322 |
show "coeff (1 * p) n = coeff p n" |
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323 |
proof (cases n) |
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324 |
case 0 then show ?thesis by simp |
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next |
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| 16052 | 326 |
case Suc then show ?thesis by (simp del: setsum_atMost_Suc add: natsum_Suc2) |
| 13936 | 327 |
qed |
328 |
qed |
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329 |
show "(p + q) * r = p * r + q * r" |
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330 |
by (rule up_eqI) simp |
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331 |
show "p * q = q * p" |
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332 |
proof (rule up_eqI) |
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333 |
fix n |
|
334 |
{
|
|
335 |
fix k |
|
336 |
fix a b :: "nat=>'a::ring" |
|
337 |
have "k <= n ==> |
|
338 |
setsum (%i. a i * b (n-i)) {..k} =
|
|
339 |
setsum (%i. a (k-i) * b (i+n-k)) {..k}"
|
|
340 |
(is "_ ==> ?eq k") |
|
341 |
proof (induct k) |
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342 |
case 0 show ?case by simp |
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343 |
next |
|
344 |
case (Suc k) then show ?case by (subst natsum_Suc2) simp |
|
345 |
qed |
|
346 |
} |
|
347 |
then show "coeff (p * q) n = coeff (q * p) n" |
|
348 |
by simp |
|
349 |
qed |
|
350 |
||
351 |
show "p - q = p + (-q)" |
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352 |
by (simp add: up_minus_def) |
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353 |
show "inverse p = (if p dvd 1 then THE x. p*x = 1 else 0)" |
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354 |
by (simp add: up_inverse_def) |
|
355 |
show "p / q = p * inverse q" |
|
356 |
by (simp add: up_divide_def) |
|
| 15596 | 357 |
fix n |
| 27540 | 358 |
show "p ^ 0 = 1" by simp |
359 |
show "p ^ Suc n = p ^ n * p" by simp |
|
360 |
qed |
|
| 13936 | 361 |
|
362 |
(* Further properties of monom *) |
|
363 |
||
364 |
lemma monom_zero [simp]: |
|
365 |
"monom 0 n = 0" |
|
366 |
by (simp add: monom_def up_zero_def) |
|
367 |
(* term order: application of coeff_mult goes wrong: rule not symmetric |
|
368 |
lemma monom_mult_is_smult: |
|
369 |
"monom (a::'a::ring) 0 * p = a *s p" |
|
370 |
proof (rule up_eqI) |
|
371 |
fix k |
|
372 |
show "coeff (monom a 0 * p) k = coeff (a *s p) k" |
|
373 |
proof (cases k) |
|
374 |
case 0 then show ?thesis by simp |
|
375 |
next |
|
376 |
case Suc then show ?thesis by simp |
|
377 |
qed |
|
378 |
qed |
|
379 |
*) |
|
| 26480 | 380 |
ML {* Delsimprocs [ring_simproc] *}
|
| 13936 | 381 |
|
382 |
lemma monom_mult_is_smult: |
|
383 |
"monom (a::'a::ring) 0 * p = a *s p" |
|
384 |
proof (rule up_eqI) |
|
385 |
fix k |
|
386 |
have "coeff (p * monom a 0) k = coeff (a *s p) k" |
|
387 |
proof (cases k) |
|
388 |
case 0 then show ?thesis by simp ring |
|
389 |
next |
|
| 30012 | 390 |
case Suc then show ?thesis by simp (ring, simp) |
| 13936 | 391 |
qed |
392 |
then show "coeff (monom a 0 * p) k = coeff (a *s p) k" by ring |
|
393 |
qed |
|
394 |
||
| 26480 | 395 |
ML {* Addsimprocs [ring_simproc] *}
|
| 13936 | 396 |
|
397 |
lemma monom_add [simp]: |
|
398 |
"monom (a + b) n = monom (a::'a::ring) n + monom b n" |
|
399 |
by (rule up_eqI) simp |
|
400 |
||
401 |
lemma monom_mult_smult: |
|
402 |
"monom (a * b) n = a *s monom (b::'a::ring) n" |
|
403 |
by (rule up_eqI) simp |
|
404 |
||
405 |
lemma monom_uminus [simp]: |
|
406 |
"monom (-a) n = - monom (a::'a::ring) n" |
|
407 |
by (rule up_eqI) simp |
|
408 |
||
409 |
lemma monom_one [simp]: |
|
410 |
"monom 1 0 = 1" |
|
411 |
by (simp add: up_one_def) |
|
412 |
||
413 |
lemma monom_inj: |
|
414 |
"(monom a n = monom b n) = (a = b)" |
|
415 |
proof |
|
416 |
assume "monom a n = monom b n" |
|
417 |
then have "coeff (monom a n) n = coeff (monom b n) n" by simp |
|
418 |
then show "a = b" by simp |
|
419 |
next |
|
420 |
assume "a = b" then show "monom a n = monom b n" by simp |
|
421 |
qed |
|
422 |
||
423 |
(* Properties of *s: |
|
424 |
Polynomials form a module *) |
|
425 |
||
426 |
lemma smult_l_distr: |
|
427 |
"(a + b::'a::ring) *s p = a *s p + b *s p" |
|
428 |
by (rule up_eqI) simp |
|
429 |
||
430 |
lemma smult_r_distr: |
|
431 |
"(a::'a::ring) *s (p + q) = a *s p + a *s q" |
|
432 |
by (rule up_eqI) simp |
|
433 |
||
434 |
lemma smult_assoc1: |
|
435 |
"(a * b::'a::ring) *s p = a *s (b *s p)" |
|
436 |
by (rule up_eqI) simp |
|
437 |
||
438 |
lemma smult_one [simp]: |
|
439 |
"(1::'a::ring) *s p = p" |
|
440 |
by (rule up_eqI) simp |
|
441 |
||
442 |
(* Polynomials form an algebra *) |
|
443 |
||
| 26480 | 444 |
ML {* Delsimprocs [ring_simproc] *}
|
| 13936 | 445 |
|
446 |
lemma smult_assoc2: |
|
447 |
"(a *s p) * q = (a::'a::ring) *s (p * q)" |
|
448 |
by (rule up_eqI) (simp add: natsum_rdistr m_assoc) |
|
449 |
(* Simproc fails. *) |
|
450 |
||
| 26480 | 451 |
ML {* Addsimprocs [ring_simproc] *}
|
| 13936 | 452 |
|
453 |
(* the following can be derived from the above ones, |
|
454 |
for generality reasons, it is therefore done *) |
|
455 |
||
456 |
lemma smult_l_null [simp]: |
|
457 |
"(0::'a::ring) *s p = 0" |
|
458 |
proof - |
|
459 |
fix a |
|
460 |
have "0 *s p = (0 *s p + a *s p) + - (a *s p)" by simp |
|
461 |
also have "... = (0 + a) *s p + - (a *s p)" by (simp only: smult_l_distr) |
|
462 |
also have "... = 0" by simp |
|
463 |
finally show ?thesis . |
|
464 |
qed |
|
465 |
||
466 |
lemma smult_r_null [simp]: |
|
467 |
"(a::'a::ring) *s 0 = 0"; |
|
468 |
proof - |
|
469 |
fix p |
|
470 |
have "a *s 0 = (a *s 0 + a *s p) + - (a *s p)" by simp |
|
471 |
also have "... = a *s (0 + p) + - (a *s p)" by (simp only: smult_r_distr) |
|
472 |
also have "... = 0" by simp |
|
473 |
finally show ?thesis . |
|
474 |
qed |
|
475 |
||
476 |
lemma smult_l_minus: |
|
477 |
"(-a::'a::ring) *s p = - (a *s p)" |
|
478 |
proof - |
|
479 |
have "(-a) *s p = (-a *s p + a *s p) + -(a *s p)" by simp |
|
480 |
also have "... = (-a + a) *s p + -(a *s p)" by (simp only: smult_l_distr) |
|
481 |
also have "... = -(a *s p)" by simp |
|
482 |
finally show ?thesis . |
|
483 |
qed |
|
484 |
||
485 |
lemma smult_r_minus: |
|
486 |
"(a::'a::ring) *s (-p) = - (a *s p)" |
|
487 |
proof - |
|
488 |
have "a *s (-p) = (a *s -p + a *s p) + -(a *s p)" by simp |
|
489 |
also have "... = a *s (-p + p) + -(a *s p)" by (simp only: smult_r_distr) |
|
490 |
also have "... = -(a *s p)" by simp |
|
491 |
finally show ?thesis . |
|
492 |
qed |
|
493 |
||
494 |
section {* The degree function *}
|
|
495 |
||
| 21423 | 496 |
definition |
497 |
deg :: "('a::zero) up => nat" where
|
|
498 |
"deg p = (LEAST n. bound n (coeff p))" |
|
| 13936 | 499 |
|
500 |
lemma deg_aboveI: |
|
501 |
"(!!m. n < m ==> coeff p m = 0) ==> deg p <= n" |
|
502 |
by (unfold deg_def) (fast intro: Least_le) |
|
503 |
||
504 |
lemma deg_aboveD: |
|
| 23350 | 505 |
assumes "deg p < m" shows "coeff p m = 0" |
| 13936 | 506 |
proof - |
507 |
obtain n where "bound n (coeff p)" by (rule bound_coeff_obtain) |
|
508 |
then have "bound (deg p) (coeff p)" by (unfold deg_def, rule LeastI) |
|
| 23350 | 509 |
then show "coeff p m = 0" using `deg p < m` by (rule boundD) |
| 13936 | 510 |
qed |
511 |
||
512 |
lemma deg_belowI: |
|
513 |
assumes prem: "n ~= 0 ==> coeff p n ~= 0" shows "n <= deg p" |
|
514 |
(* logically, this is a slightly stronger version of deg_aboveD *) |
|
515 |
proof (cases "n=0") |
|
516 |
case True then show ?thesis by simp |
|
517 |
next |
|
518 |
case False then have "coeff p n ~= 0" by (rule prem) |
|
519 |
then have "~ deg p < n" by (fast dest: deg_aboveD) |
|
520 |
then show ?thesis by arith |
|
521 |
qed |
|
522 |
||
523 |
lemma lcoeff_nonzero_deg: |
|
524 |
assumes deg: "deg p ~= 0" shows "coeff p (deg p) ~= 0" |
|
525 |
proof - |
|
526 |
obtain m where "deg p <= m" and m_coeff: "coeff p m ~= 0" |
|
527 |
proof - |
|
528 |
have minus: "!!(n::nat) m. n ~= 0 ==> (n - Suc 0 < m) = (n <= m)" |
|
529 |
by arith (* make public?, why does proof not work with "1" *) |
|
530 |
from deg have "deg p - 1 < (LEAST n. bound n (coeff p))" |
|
531 |
by (unfold deg_def) arith |
|
532 |
then have "~ bound (deg p - 1) (coeff p)" by (rule not_less_Least) |
|
533 |
then have "EX m. deg p - 1 < m & coeff p m ~= 0" |
|
534 |
by (unfold bound_def) fast |
|
535 |
then have "EX m. deg p <= m & coeff p m ~= 0" by (simp add: deg minus) |
|
| 23350 | 536 |
then show ?thesis by (auto intro: that) |
| 13936 | 537 |
qed |
538 |
with deg_belowI have "deg p = m" by fastsimp |
|
539 |
with m_coeff show ?thesis by simp |
|
540 |
qed |
|
541 |
||
542 |
lemma lcoeff_nonzero_nonzero: |
|
543 |
assumes deg: "deg p = 0" and nonzero: "p ~= 0" shows "coeff p 0 ~= 0" |
|
544 |
proof - |
|
545 |
have "EX m. coeff p m ~= 0" |
|
546 |
proof (rule classical) |
|
547 |
assume "~ ?thesis" |
|
548 |
then have "p = 0" by (auto intro: up_eqI) |
|
549 |
with nonzero show ?thesis by contradiction |
|
550 |
qed |
|
551 |
then obtain m where coeff: "coeff p m ~= 0" .. |
|
552 |
then have "m <= deg p" by (rule deg_belowI) |
|
553 |
then have "m = 0" by (simp add: deg) |
|
554 |
with coeff show ?thesis by simp |
|
555 |
qed |
|
556 |
||
557 |
lemma lcoeff_nonzero: |
|
558 |
"p ~= 0 ==> coeff p (deg p) ~= 0" |
|
559 |
proof (cases "deg p = 0") |
|
560 |
case True |
|
561 |
assume "p ~= 0" |
|
562 |
with True show ?thesis by (simp add: lcoeff_nonzero_nonzero) |
|
563 |
next |
|
564 |
case False |
|
565 |
assume "p ~= 0" |
|
566 |
with False show ?thesis by (simp add: lcoeff_nonzero_deg) |
|
567 |
qed |
|
568 |
||
569 |
lemma deg_eqI: |
|
570 |
"[| !!m. n < m ==> coeff p m = 0; |
|
571 |
!!n. n ~= 0 ==> coeff p n ~= 0|] ==> deg p = n" |
|
572 |
by (fast intro: le_anti_sym deg_aboveI deg_belowI) |
|
573 |
||
574 |
(* Degree and polynomial operations *) |
|
575 |
||
576 |
lemma deg_add [simp]: |
|
577 |
"deg ((p::'a::ring up) + q) <= max (deg p) (deg q)" |
|
578 |
proof (cases "deg p <= deg q") |
|
579 |
case True show ?thesis by (rule deg_aboveI) (simp add: True deg_aboveD) |
|
580 |
next |
|
581 |
case False show ?thesis by (rule deg_aboveI) (simp add: False deg_aboveD) |
|
582 |
qed |
|
583 |
||
584 |
lemma deg_monom_ring: |
|
585 |
"deg (monom a n::'a::ring up) <= n" |
|
586 |
by (rule deg_aboveI) simp |
|
587 |
||
588 |
lemma deg_monom [simp]: |
|
589 |
"a ~= 0 ==> deg (monom a n::'a::ring up) = n" |
|
590 |
by (fastsimp intro: le_anti_sym deg_aboveI deg_belowI) |
|
591 |
||
592 |
lemma deg_const [simp]: |
|
593 |
"deg (monom (a::'a::ring) 0) = 0" |
|
594 |
proof (rule le_anti_sym) |
|
595 |
show "deg (monom a 0) <= 0" by (rule deg_aboveI) simp |
|
596 |
next |
|
597 |
show "0 <= deg (monom a 0)" by (rule deg_belowI) simp |
|
598 |
qed |
|
599 |
||
600 |
lemma deg_zero [simp]: |
|
601 |
"deg 0 = 0" |
|
602 |
proof (rule le_anti_sym) |
|
603 |
show "deg 0 <= 0" by (rule deg_aboveI) simp |
|
604 |
next |
|
605 |
show "0 <= deg 0" by (rule deg_belowI) simp |
|
606 |
qed |
|
607 |
||
608 |
lemma deg_one [simp]: |
|
609 |
"deg 1 = 0" |
|
610 |
proof (rule le_anti_sym) |
|
611 |
show "deg 1 <= 0" by (rule deg_aboveI) simp |
|
612 |
next |
|
613 |
show "0 <= deg 1" by (rule deg_belowI) simp |
|
614 |
qed |
|
615 |
||
616 |
lemma uminus_monom: |
|
617 |
"!!a::'a::ring. (-a = 0) = (a = 0)" |
|
618 |
proof |
|
619 |
fix a::"'a::ring" |
|
620 |
assume "a = 0" |
|
621 |
then show "-a = 0" by simp |
|
622 |
next |
|
623 |
fix a::"'a::ring" |
|
624 |
assume "- a = 0" |
|
625 |
then have "-(- a) = 0" by simp |
|
626 |
then show "a = 0" by simp |
|
627 |
qed |
|
628 |
||
629 |
lemma deg_uminus [simp]: |
|
630 |
"deg (-p::('a::ring) up) = deg p"
|
|
631 |
proof (rule le_anti_sym) |
|
632 |
show "deg (- p) <= deg p" by (simp add: deg_aboveI deg_aboveD) |
|
633 |
next |
|
634 |
show "deg p <= deg (- p)" |
|
635 |
by (simp add: deg_belowI lcoeff_nonzero_deg uminus_monom) |
|
636 |
qed |
|
637 |
||
638 |
lemma deg_smult_ring: |
|
639 |
"deg ((a::'a::ring) *s p) <= (if a = 0 then 0 else deg p)" |
|
640 |
proof (cases "a = 0") |
|
641 |
qed (simp add: deg_aboveI deg_aboveD)+ |
|
642 |
||
643 |
lemma deg_smult [simp]: |
|
644 |
"deg ((a::'a::domain) *s p) = (if a = 0 then 0 else deg p)" |
|
645 |
proof (rule le_anti_sym) |
|
646 |
show "deg (a *s p) <= (if a = 0 then 0 else deg p)" by (rule deg_smult_ring) |
|
647 |
next |
|
648 |
show "(if a = 0 then 0 else deg p) <= deg (a *s p)" |
|
649 |
proof (cases "a = 0") |
|
650 |
qed (simp, simp add: deg_belowI lcoeff_nonzero_deg integral_iff) |
|
651 |
qed |
|
652 |
||
653 |
lemma deg_mult_ring: |
|
654 |
"deg (p * q::'a::ring up) <= deg p + deg q" |
|
655 |
proof (rule deg_aboveI) |
|
656 |
fix m |
|
657 |
assume boundm: "deg p + deg q < m" |
|
658 |
{
|
|
659 |
fix k i |
|
660 |
assume boundk: "deg p + deg q < k" |
|
661 |
then have "coeff p i * coeff q (k - i) = 0" |
|
662 |
proof (cases "deg p < i") |
|
663 |
case True then show ?thesis by (simp add: deg_aboveD) |
|
664 |
next |
|
665 |
case False with boundk have "deg q < k - i" by arith |
|
666 |
then show ?thesis by (simp add: deg_aboveD) |
|
667 |
qed |
|
668 |
} |
|
669 |
(* This is similar to bound_mult_zero and deg_above_mult_zero in the old |
|
670 |
proofs. *) |
|
671 |
with boundm show "coeff (p * q) m = 0" by simp |
|
672 |
qed |
|
673 |
||
674 |
lemma deg_mult [simp]: |
|
675 |
"[| (p::'a::domain up) ~= 0; q ~= 0|] ==> deg (p * q) = deg p + deg q" |
|
676 |
proof (rule le_anti_sym) |
|
677 |
show "deg (p * q) <= deg p + deg q" by (rule deg_mult_ring) |
|
678 |
next |
|
679 |
let ?s = "(%i. coeff p i * coeff q (deg p + deg q - i))" |
|
680 |
assume nz: "p ~= 0" "q ~= 0" |
|
681 |
have less_add_diff: "!!(k::nat) n m. k < n ==> m < n + m - k" by arith |
|
682 |
show "deg p + deg q <= deg (p * q)" |
|
683 |
proof (rule deg_belowI, simp) |
|
684 |
have "setsum ?s {.. deg p + deg q}
|
|
| 15045 | 685 |
= setsum ?s ({..< deg p} Un {deg p .. deg p + deg q})"
|
| 13936 | 686 |
by (simp only: ivl_disj_un_one) |
687 |
also have "... = setsum ?s {deg p .. deg p + deg q}"
|
|
688 |
by (simp add: setsum_Un_disjoint ivl_disj_int_one |
|
689 |
setsum_0 deg_aboveD less_add_diff) |
|
| 15045 | 690 |
also have "... = setsum ?s ({deg p} Un {deg p <.. deg p + deg q})"
|
| 13936 | 691 |
by (simp only: ivl_disj_un_singleton) |
692 |
also have "... = coeff p (deg p) * coeff q (deg q)" |
|
693 |
by (simp add: setsum_Un_disjoint ivl_disj_int_singleton |
|
694 |
setsum_0 deg_aboveD) |
|
695 |
finally have "setsum ?s {.. deg p + deg q}
|
|
696 |
= coeff p (deg p) * coeff q (deg q)" . |
|
697 |
with nz show "setsum ?s {.. deg p + deg q} ~= 0"
|
|
698 |
by (simp add: integral_iff lcoeff_nonzero) |
|
699 |
qed |
|
700 |
qed |
|
701 |
||
702 |
lemma coeff_natsum: |
|
703 |
"((coeff (setsum p A) k)::'a::ring) = |
|
704 |
setsum (%i. coeff (p i) k) A" |
|
705 |
proof (cases "finite A") |
|
706 |
case True then show ?thesis by induct auto |
|
707 |
next |
|
708 |
case False then show ?thesis by (simp add: setsum_def) |
|
709 |
qed |
|
710 |
(* Instance of a more general result!!! *) |
|
711 |
||
712 |
(* |
|
713 |
lemma coeff_natsum: |
|
714 |
"((coeff (setsum p {..n::nat}) k)::'a::ring) =
|
|
715 |
setsum (%i. coeff (p i) k) {..n}"
|
|
716 |
by (induct n) auto |
|
717 |
*) |
|
718 |
||
719 |
lemma up_repr: |
|
720 |
"setsum (%i. monom (coeff p i) i) {..deg (p::'a::ring up)} = p"
|
|
721 |
proof (rule up_eqI) |
|
722 |
let ?s = "(%i. monom (coeff p i) i)" |
|
723 |
fix k |
|
724 |
show "coeff (setsum ?s {..deg p}) k = coeff p k"
|
|
725 |
proof (cases "k <= deg p") |
|
726 |
case True |
|
727 |
hence "coeff (setsum ?s {..deg p}) k =
|
|
| 15045 | 728 |
coeff (setsum ?s ({..k} Un {k<..deg p})) k"
|
| 13936 | 729 |
by (simp only: ivl_disj_un_one) |
730 |
also from True |
|
731 |
have "... = coeff (setsum ?s {..k}) k"
|
|
732 |
by (simp add: setsum_Un_disjoint ivl_disj_int_one order_less_imp_not_eq2 |
|
733 |
setsum_0 coeff_natsum ) |
|
734 |
also |
|
| 15045 | 735 |
have "... = coeff (setsum ?s ({..<k} Un {k})) k"
|
| 13936 | 736 |
by (simp only: ivl_disj_un_singleton) |
737 |
also have "... = coeff p k" |
|
738 |
by (simp add: setsum_Un_disjoint ivl_disj_int_singleton |
|
739 |
setsum_0 coeff_natsum deg_aboveD) |
|
740 |
finally show ?thesis . |
|
741 |
next |
|
742 |
case False |
|
743 |
hence "coeff (setsum ?s {..deg p}) k =
|
|
| 15045 | 744 |
coeff (setsum ?s ({..<deg p} Un {deg p})) k"
|
| 13936 | 745 |
by (simp only: ivl_disj_un_singleton) |
746 |
also from False have "... = coeff p k" |
|
747 |
by (simp add: setsum_Un_disjoint ivl_disj_int_singleton |
|
748 |
setsum_0 coeff_natsum deg_aboveD) |
|
749 |
finally show ?thesis . |
|
750 |
qed |
|
751 |
qed |
|
752 |
||
753 |
lemma up_repr_le: |
|
754 |
"deg (p::'a::ring up) <= n ==> setsum (%i. monom (coeff p i) i) {..n} = p"
|
|
755 |
proof - |
|
756 |
let ?s = "(%i. monom (coeff p i) i)" |
|
757 |
assume "deg p <= n" |
|
| 15045 | 758 |
then have "setsum ?s {..n} = setsum ?s ({..deg p} Un {deg p<..n})"
|
| 13936 | 759 |
by (simp only: ivl_disj_un_one) |
760 |
also have "... = setsum ?s {..deg p}"
|
|
761 |
by (simp add: setsum_Un_disjoint ivl_disj_int_one |
|
762 |
setsum_0 deg_aboveD) |
|
763 |
also have "... = p" by (rule up_repr) |
|
764 |
finally show ?thesis . |
|
765 |
qed |
|
766 |
||
767 |
instance up :: ("domain") "domain"
|
|
768 |
proof |
|
769 |
show "1 ~= (0::'a up)" |
|
770 |
proof (* notI is applied here *) |
|
771 |
assume "1 = (0::'a up)" |
|
772 |
hence "coeff 1 0 = (coeff 0 0::'a)" by simp |
|
773 |
hence "1 = (0::'a)" by simp |
|
774 |
with one_not_zero show "False" by contradiction |
|
775 |
qed |
|
776 |
next |
|
777 |
fix p q :: "'a::domain up" |
|
778 |
assume pq: "p * q = 0" |
|
779 |
show "p = 0 | q = 0" |
|
780 |
proof (rule classical) |
|
781 |
assume c: "~ (p = 0 | q = 0)" |
|
782 |
then have "deg p + deg q = deg (p * q)" by simp |
|
783 |
also from pq have "... = 0" by simp |
|
784 |
finally have "deg p + deg q = 0" . |
|
785 |
then have f1: "deg p = 0 & deg q = 0" by simp |
|
786 |
from f1 have "p = setsum (%i. (monom (coeff p i) i)) {..0}"
|
|
787 |
by (simp only: up_repr_le) |
|
788 |
also have "... = monom (coeff p 0) 0" by simp |
|
789 |
finally have p: "p = monom (coeff p 0) 0" . |
|
790 |
from f1 have "q = setsum (%i. (monom (coeff q i) i)) {..0}"
|
|
791 |
by (simp only: up_repr_le) |
|
792 |
also have "... = monom (coeff q 0) 0" by simp |
|
793 |
finally have q: "q = monom (coeff q 0) 0" . |
|
794 |
have "coeff p 0 * coeff q 0 = coeff (p * q) 0" by simp |
|
795 |
also from pq have "... = 0" by simp |
|
796 |
finally have "coeff p 0 * coeff q 0 = 0" . |
|
797 |
then have "coeff p 0 = 0 | coeff q 0 = 0" by (simp only: integral_iff) |
|
798 |
with p q show "p = 0 | q = 0" by fastsimp |
|
799 |
qed |
|
800 |
qed |
|
801 |
||
802 |
lemma monom_inj_zero: |
|
803 |
"(monom a n = 0) = (a = 0)" |
|
804 |
proof - |
|
805 |
have "(monom a n = 0) = (monom a n = monom 0 n)" by simp |
|
806 |
also have "... = (a = 0)" by (simp add: monom_inj del: monom_zero) |
|
807 |
finally show ?thesis . |
|
808 |
qed |
|
809 |
(* term order: makes this simpler!!! |
|
810 |
lemma smult_integral: |
|
811 |
"(a::'a::domain) *s p = 0 ==> a = 0 | p = 0" |
|
812 |
by (simp add: monom_mult_is_smult [THEN sym] integral_iff monom_inj_zero) fast |
|
813 |
*) |
|
814 |
lemma smult_integral: |
|
815 |
"(a::'a::domain) *s p = 0 ==> a = 0 | p = 0" |
|
816 |
by (simp add: monom_mult_is_smult [THEN sym] integral_iff monom_inj_zero) |
|
817 |
||
| 21423 | 818 |
|
819 |
(* Divisibility and degree *) |
|
820 |
||
821 |
lemma "!! p::'a::domain up. [| p dvd q; q ~= 0 |] ==> deg p <= deg q" |
|
822 |
apply (unfold dvd_def) |
|
823 |
apply (erule exE) |
|
824 |
apply hypsubst |
|
825 |
apply (case_tac "p = 0") |
|
826 |
apply (case_tac [2] "k = 0") |
|
827 |
apply auto |
|
828 |
done |
|
829 |
||
| 14590 | 830 |
end |