Theory AutoCorres2.Padding
theory Padding
imports Main
begin
lemma " (0::nat) mod 2 = XXX"
apply (simp)
oops
lemma "(2 - (0::nat) mod 2) = XXX"
apply (simp)
oops
lemma "(2 - (0::nat) mod 2) mod 2 = XXX"
apply (simp)
oops
definition padup :: "nat ⇒ nat ⇒ nat" where
"padup align n ≡ (align - n mod align) mod align"
lemma padup_dvd:
"0 < b ⟹ (padup b n = 0) = (b dvd n)"
unfolding padup_def
apply(subst dvd_eq_mod_eq_0)
apply(subst mod_if [where m="b - n mod b"])
apply clarsimp
apply(insert mod_less_divisor [of b n])
apply arith
done
lemma dvd_padup_add:
"0 < x ⟹ x dvd y + padup x y"
apply(clarsimp simp: padup_def)
apply(subst mod_if [where m="x - y mod x"])
apply(clarsimp split: if_split_asm)
apply(rule conjI)
apply clarsimp
apply(subst ac_simps)
apply(subst diff_add_assoc)
apply(rule mod_less_eq_dividend)
apply(rule dvd_add)
apply simp
apply(subst minus_div_mult_eq_mod[symmetric])
apply(subst diff_diff_right)
apply(subst ac_simps)
apply(subst minus_mod_eq_mult_div[symmetric])
apply simp
apply simp
apply(auto simp: dvd_eq_mod_eq_0)
done
end