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(* Title: HOL/Integ/Ring.ML
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ID: $Id$
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Author: Tobias Nipkow
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Copyright 1996 TU Muenchen
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Derives a few equational consequences about rings
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and defines cring_simpl, a simplification tactic for commutative rings.
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*)
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open Ring;
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(***
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It is not clear if all thsese rules, esp. distributivity, should be part
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of the default simpset. At the moment they are because they are used in the
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decision procedure.
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***)
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Addsimps [times_assoc,times_commute,distribL,distribR];
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goal Ring.thy "!!x::'a::cring. x*(y*z)=y*(x*z)";
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3018
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by (rtac trans 1);
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by (rtac times_commute 1);
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by (rtac trans 1);
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by (rtac times_assoc 1);
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by (Simp_tac 1);
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qed "times_commuteL";
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Addsimps [times_commuteL];
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val times_cong = read_instantiate [("f1","op *")] (arg_cong RS cong);
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goal Ring.thy "!!x::'a::ring. zero*x = zero";
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3018
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by (rtac trans 1);
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by (rtac right_inv 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac trans 2);
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by (rtac times_cong 3);
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by (rtac zeroL 3);
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by (rtac refl 3);
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by (rtac (distribR RS sym) 2);
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by (rtac trans 1);
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br(plus_assoc RS sym) 2;
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3018
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 2);
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by (rtac (right_inv RS sym) 2);
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by (rtac (zeroR RS sym) 1);
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qed "mult_zeroL";
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goal Ring.thy "!!x::'a::ring. x*zero = zero";
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3018
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by (rtac trans 1);
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by (rtac right_inv 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac trans 2);
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by (rtac times_cong 3);
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by (rtac zeroL 4);
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by (rtac refl 3);
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by (rtac (distribL RS sym) 2);
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by (rtac trans 1);
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br(plus_assoc RS sym) 2;
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3018
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 2);
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by (rtac (right_inv RS sym) 2);
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by (rtac (zeroR RS sym) 1);
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qed "mult_zeroR";
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goal Ring.thy "!!x::'a::ring. (zero-x)*y = zero-(x*y)";
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3018
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by (rtac trans 1);
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by (rtac zeroL 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac mult_zeroL 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac times_cong 2);
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by (rtac left_inv 2);
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by (rtac refl 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac (distribR RS sym) 2);
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by (rtac trans 1);
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br(plus_assoc RS sym) 2;
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3018
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 2);
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by (rtac (right_inv RS sym) 2);
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by (rtac (zeroR RS sym) 1);
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qed "mult_invL";
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goal Ring.thy "!!x::'a::ring. x*(zero-y) = zero-(x*y)";
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3018
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by (rtac trans 1);
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by (rtac zeroL 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac mult_zeroR 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac times_cong 2);
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by (rtac refl 2);
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by (rtac left_inv 2);
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 3);
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by (rtac (distribL RS sym) 2);
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by (rtac trans 1);
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br(plus_assoc RS sym) 2;
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by (rtac trans 1);
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by (rtac plus_cong 2);
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by (rtac refl 2);
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by (rtac (right_inv RS sym) 2);
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by (rtac (zeroR RS sym) 1);
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qed "mult_invR";
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Addsimps[mult_invL,mult_invR];
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goal Ring.thy "!!x::'a::ring. x*(y-z) = x*y - x*z";
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3018
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by (stac minus_inv 1);
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by (rtac sym 1);
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by (stac minus_inv 1);
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by (Simp_tac 1);
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qed "minus_distribL";
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goal Ring.thy "!!x::'a::ring. (x-y)*z = x*z - y*z";
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by (stac minus_inv 1);
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by (rtac sym 1);
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by (stac minus_inv 1);
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by (Simp_tac 1);
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qed "minus_distribR";
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Addsimps [minus_distribL,minus_distribR];
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(*** The order [minus_plusL3,minus_plusL2] is important because minus_plusL3
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MUST be tried first ***)
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val cring_simp =
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let val phase1 = !simpset addsimps
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[plus_minusL,minus_plusR,minus_minusR,plus_minusR]
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val phase2 = HOL_ss addsimps [minus_plusL3,minus_plusL2,
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zeroL,zeroR,mult_zeroL,mult_zeroR]
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in simp_tac phase1 THEN' simp_tac phase2 end;
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