section "Some Auxiliary Results" theory Auxiliary imports Main begin lemma disjE3: "P \ Q \ R \ (P \ S) \ (Q \ S) \ (R \ S) \ S" by auto lemma ge_induct[consumes 1, case_names step]: fixes i::nat and j::nat and P::"nat \ bool" shows "i \ j \ (\n. i \ n \ ((\m \ i. m P m) \ P n)) \ P j" proof - assume a0: "i \ j" and a1: "(\n. i \ n \ ((\m \ i. m P m) \ P n))" have "(\n. \m m \ P m \ i \ n \ P n)" proof fix n assume a2: "\m m \ P m" show "i \ n \ P n" proof - assume "i \ n" with a1 have "(\m \ i. m P m) \ P n" by simp moreover from a2 have "\m \ i. m P m" by simp ultimately show "P n" by simp qed qed with nat_less_induct[of "\j. i \ j \ P j" j] have "i \ j \ P j" . with a0 show ?thesis by simp qed lemma my_induct[consumes 1, case_names base step]: fixes P::"nat\bool" assumes less: "i \ j" and base: "P j" and step: "\n. i \ n \ n < j \ (\n'>n. n'\j \ P n') \ P n" shows "P i" proof cases assume "j=0" thus ?thesis using less base by simp next assume "\ j=0" have "j - (j - i) \ i \ P (j - (j - i))" proof (rule less_induct[of "\n::nat. j-n \ i \ P (j-n)" "j-i"]) fix x assume asmp: "\y. y < x \ i \ j - y \ P (j - y)" show "i \ j - x \ P (j - x)" proof cases assume "x=0" with base show ?thesis by simp next assume "\ x=0" with \j \ 0\ have "j - x < j" by simp show ?thesis proof assume "i \ j - x" moreover have "\n'>j-x. n'\j \ P n'" proof fix n' show "n'>j-x \ n'\j \ P n'" proof (rule HOL.impI[OF HOL.impI]) assume "j - x < n'" and "n' \ j" hence "j - n' < x" by simp moreover from \i \ j - x\ \j - x < n'\ have "i \ n'" using le_less_trans less_imp_le_nat by blast with \n' \ j\ have "i \ j - (j - n')" by simp ultimately have "P (j - (j - n'))" using asmp by simp moreover from \n' \ j\ have "j - (j - n') = n'" by simp ultimately show "P n'" by simp qed qed ultimately show "P (j - x)" using \j-x step[of "j-x"] by simp qed qed qed moreover from less have "j - (j - i) = i" by simp ultimately show ?thesis by simp qed lemma Greatest_ex_le_nat: assumes "\k. P k \ (\k'. P k' \ k' \ k)" shows "\(\n'>Greatest P. P n')" by (metis Greatest_equality assms less_le_not_le) lemma cardEx: assumes "finite A" and "finite B" and "card A > card B" shows "\x\A. \ x\B" proof cases assume "A \ B" with assms have "card A\card B" using card_mono by blast with assms have False by simp thus ?thesis by simp next assume "\ A \ B" thus ?thesis by auto qed lemma cardshift: "card {i::nat. i>n \ i \ n' \ p (n'' + i)} = card {i. i>(n + n'') \ i \ (n' + n'') \ p i}" proof - let ?f="\i. i+n''" have "bij_betw ?f {i::nat. i>n \ i \ n' \ p (n'' + i)} {i. i>(n + n'') \ i \ (n' + n'') \ p i}" proof (rule bij_betwI') fix x y assume "x \ {i. n < i \ i \ n' \ p (n'' + i)}" and "y \ {i. n < i \ i \ n' \ p (n'' + i)}" show "(x + n'' = y + n'') = (x = y)" by simp next fix x::nat assume "x \ {i. n < i \ i \ n' \ p (n'' + i)}" hence "n n'" and "p(n''+x)" by auto moreover have "n''+x=x+n''" by simp ultimately have "n + n'' < x + n''" and "x + n'' \ n' + n''" and "p (x + n'')" by auto thus "x + n'' \ {i. n + n'' < i \ i \ n' + n'' \ p i}" by auto next fix y::nat assume "y \ {i. n + n'' < i \ i \ n' + n'' \ p i}" hence "n+n''n'+n''" and "p y" by auto then obtain x where "x=y-n''" by simp with \n+n'' have "y=x+n''" by simp moreover from \x=y-n''\ \n+n'' have "x>n" by simp moreover from \x=y-n''\ \y\n'+n''\ have "x\n'" by simp moreover from \y=x+n''\ have "y=n''+x" by simp with \p y\ have "p (n'' + x)" by simp ultimately show "\x\{i. n < i \ i \ n' \ p (n'' + i)}. y = x + n''" by auto qed thus ?thesis using bij_betw_same_card by auto qed end