theory Disagreement = Main + Swap + Atoms:
consts
ds :: "(string \<times> string) list \<Rightarrow> (string \<times> string) list \<Rightarrow> string set"
defs
ds_def: "ds xs ys \<equiv> { a . a \<in> (atms xs \<union> atms ys) \<and> (swapas xs a \<noteq> swapas ys a) }"
lemma
ds_elem: "\<lbrakk>swapas pi a\<noteq>a\<rbrakk>\<Longrightarrow>a\<in>ds [] pi"
apply(simp add: ds_def)
apply(auto simp add: swapas_pi_ineq_a)
done
lemma
elem_ds: "\<lbrakk>a\<in>ds [] pi\<rbrakk>\<Longrightarrow>a\<noteq>swapas pi a"
apply(simp add: ds_def)
done
lemma
ds_sym: "ds pi1 pi2 = ds pi2 pi1"
apply(simp only: ds_def)
apply(auto)
done
lemma
ds_trans: "c\<in>ds pi1 pi3\<longrightarrow>(c\<in>ds pi1 pi2 \<or> c\<in>ds pi2 pi3)"
apply(auto)
apply(simp only: ds_def)
apply(auto)
apply(drule a_not_in_atms[THEN mp])+
apply(simp)
apply(drule a_not_in_atms[THEN mp])
apply(simp)
apply(drule swapas_pi_ineq_a[THEN mp])
apply(assumption)
done
lemma ds_cancel_pi_left:
"(c\<in> ds (pi1@pi) (pi2@pi)) \<longrightarrow> (swapas pi c\<in> ds pi1 pi2)"
apply(simp only: ds_def)
apply(auto)
apply(simp_all add: swapas_append)
apply(rule a_ineq_swapas_pi[THEN mp], clarify, drule a_not_in_atms[THEN mp], simp)+
done
lemma ds_cancel_pi_right:
"(swapas pi c\<in> ds pi1 pi2) \<longrightarrow> (c\<in> ds (pi1@pi) (pi2@pi))"
apply(simp only: ds_def)
apply(auto)
apply(simp_all add: swapas_append)
apply(rule a_ineq_swapas_pi[THEN mp],clarify,
drule a_not_in_atms[THEN mp],drule a_not_in_atms[THEN mp],simp)+
done
lemma ds_equality:
"(ds [] pi)-{a,swapas pi a} = (ds [] ((a,swapas pi a)#pi))-{swapas pi a}"
apply(simp only: ds_def)
apply(auto)
done
lemma ds_7:
"\<lbrakk>b\<noteq> swapas pi b;a\<in>ds [] ((b,swapas pi b)#pi)\<rbrakk>\<Longrightarrow>a\<in>ds [] pi"
apply(simp only: ds_def)
apply(case_tac "b=a")
apply(auto)
apply(rule swapas_pi_in_atms)
apply(drule a_ineq_swapas_pi[THEN mp])
apply(assumption)
apply(drule sym)
apply(drule swapas_rev_pi_a)
apply(simp)
apply(case_tac "swapas pi b = a")
apply(auto)
apply(drule sym)
apply(drule swapas_rev_pi_a)
apply(simp)
done
lemma ds_cancel_pi_front:
"ds (pi@pi1) (pi@pi2) = ds pi1 pi2"
apply(simp only: ds_def)
apply(auto)
apply(simp_all add: swapas_append)
apply(rule swapas_pi_ineq_a[THEN mp], clarify, drule a_not_in_atms[THEN mp], simp)+
apply(drule swapas_rev_pi_a, simp)+
done
lemma ds_rev_pi_pi:
"ds ((rev pi1)@pi1) pi2 = ds [] pi2"
apply(simp only: ds_def)
apply(auto)
apply(simp_all add: swapas_append)
apply(drule a_ineq_swapas_pi[THEN mp], assumption)+
done
lemma ds_rev:
"ds [] ((rev pi1)@pi2) = ds pi1 pi2"
apply(subgoal_tac "ds pi1 pi2 = ds ((rev pi1)@pi1) ((rev pi1)@pi2)")
apply(simp add: ds_rev_pi_pi)
apply(simp only: ds_cancel_pi_front)
done
lemma ds_acabbc:
"\<lbrakk>a\<noteq>b;b\<noteq>c;c\<noteq>a\<rbrakk>\<Longrightarrow>ds [] [(a, c), (a, b), (b, c)] = {a, b}"
apply(simp only: ds_def)
apply(auto)
done
lemma ds_baab:
"\<lbrakk>a\<noteq>b\<rbrakk>\<Longrightarrow>ds [] [(b, a), (a, b)] = {}"
apply(simp only: ds_def)
apply(auto)
done
lemma ds_abab:
"\<lbrakk>a\<noteq>b\<rbrakk>\<Longrightarrow>ds [] [(a, b), (a, b)] = {}"
apply(simp only: ds_def)
apply(auto)
done
(* disagreement set as list *)
consts flatten :: "(string \<times> string)list \<Rightarrow> string list"
primrec
"flatten [] = []"
"flatten (x#xs) = (fst x)#(snd x)#(flatten xs)"
consts ds_list :: "(string \<times> string)list \<Rightarrow> (string \<times> string)list \<Rightarrow> string list"
defs ds_list_def: "ds_list pi1 pi2 \<equiv> remdups ([x:(flatten (pi1@pi2)). x\<in>ds pi1 pi2])"
lemma set_flatten_eq_atms:
"set (flatten pi) = atms pi"
apply(induct_tac pi)
apply(auto)
done
lemma ds_list_equ_ds:
"set (ds_list pi1 pi2) = ds pi1 pi2"
apply(auto)
apply(simp add: ds_list_def)
apply(simp add: ds_list_def)
apply(simp add: set_flatten_eq_atms)
apply(simp add: ds_def)
done
end