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(* Title: HOL/AxClasses/Group/Group.ML
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ID: $Id$
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Author: Markus Wenzel, TU Muenchen
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Some basic theorems of group theory.
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*)
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fun sub r = standard (r RS subst);
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fun ssub r = standard (r RS ssubst);
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goal thy "x * inverse x = (1::'a::group)";
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by (rtac (sub left_unit) 1);
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back();
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by (rtac (sub assoc) 1);
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by (rtac (sub left_inverse) 1);
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back();
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back();
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by (rtac (ssub assoc) 1);
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back();
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by (rtac (ssub left_inverse) 1);
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by (rtac (ssub assoc) 1);
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by (rtac (ssub left_unit) 1);
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by (rtac (ssub left_inverse) 1);
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by (rtac refl 1);
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qed "right_inverse";
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goal thy "x * 1 = (x::'a::group)";
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by (rtac (sub left_inverse) 1);
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by (rtac (sub assoc) 1);
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by (rtac (ssub right_inverse) 1);
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by (rtac (ssub left_unit) 1);
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by (rtac refl 1);
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qed "right_unit";
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goal thy "e * x = x --> e = (1::'a::group)";
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by (rtac impI 1);
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by (rtac (sub right_unit) 1);
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back();
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by (res_inst_tac [("x", "x")] (sub right_inverse) 1);
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by (rtac (sub assoc) 1);
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by (rtac arg_cong 1);
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back();
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by (assume_tac 1);
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qed "strong_one_unit";
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goal thy "EX! e. ALL x. e * x = (x::'a::group)";
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by (rtac ex1I 1);
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by (rtac allI 1);
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by (rtac left_unit 1);
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by (rtac mp 1);
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by (rtac strong_one_unit 1);
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by (etac allE 1);
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by (assume_tac 1);
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qed "ex1_unit";
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goal thy "ALL x. EX! e. e * x = (x::'a::group)";
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by (rtac allI 1);
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by (rtac ex1I 1);
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by (rtac left_unit 1);
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by (rtac (strong_one_unit RS mp) 1);
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by (assume_tac 1);
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qed "ex1_unit'";
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goal thy "inj (op * (x::'a::group))";
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by (rtac injI 1);
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by (rtac (sub left_unit) 1);
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back();
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by (rtac (sub left_unit) 1);
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2907
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by (res_inst_tac [("x", "x")] (sub left_inverse) 1);
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by (rtac (ssub assoc) 1);
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back();
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by (rtac (ssub assoc) 1);
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by (rtac arg_cong 1);
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back();
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by (assume_tac 1);
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qed "inj_times";
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goal thy "y * x = 1 --> y = inverse (x::'a::group)";
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by (rtac impI 1);
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by (rtac (sub right_unit) 1);
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back();
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back();
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by (rtac (sub right_unit) 1);
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2907
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by (res_inst_tac [("x", "x")] (sub right_inverse) 1);
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by (rtac (sub assoc) 1);
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by (rtac (sub assoc) 1);
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by (rtac arg_cong 1);
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back();
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2907
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by (rtac (ssub left_inverse) 1);
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by (assume_tac 1);
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qed "one_inverse";
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goal thy "ALL x. EX! y. y * x = (1::'a::group)";
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by (rtac allI 1);
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by (rtac ex1I 1);
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2907
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by (rtac left_inverse 1);
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by (rtac mp 1);
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by (rtac one_inverse 1);
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by (assume_tac 1);
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qed "ex1_inverse";
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goal thy "inverse (x * y) = inverse y * inverse (x::'a::group)";
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by (rtac sym 1);
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by (rtac mp 1);
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by (rtac one_inverse 1);
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by (rtac (ssub assoc) 1);
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by (rtac (sub assoc) 1);
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back();
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2907
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by (rtac (ssub left_inverse) 1);
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1465
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by (rtac (ssub left_unit) 1);
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2907
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by (rtac (ssub left_inverse) 1);
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by (rtac refl 1);
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qed "inverse_times";
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goal thy "inverse (inverse x) = (x::'a::group)";
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by (rtac sym 1);
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by (rtac (one_inverse RS mp) 1);
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by (rtac (ssub right_inverse) 1);
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by (rtac refl 1);
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qed "inverse_inverse";
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