Structure markerTheory
signature markerTheory =
sig
type thm = Thm.thm
(* Definitions *)
val AC_DEF : thm
val Abbrev_def : thm
val Cong_def : thm
val Exclude_def : thm
val IfCases_def : thm
val Req0_def : thm
val ReqD_def : thm
val label_def : thm
val stmarker_def : thm
val unint_def : thm
(* Theorems *)
val move_left_conj : thm
val move_left_disj : thm
val move_right_conj : thm
val move_right_disj : thm
val marker_grammars : type_grammar.grammar * term_grammar.grammar
(*
[bool] Parent theory of "marker"
[AC_DEF] Definition
⊢ ∀b1 b2. AC b1 b2 ⇔ b1 ∧ b2
[Abbrev_def] Definition
⊢ ∀x. Abbrev x ⇔ x
[Cong_def] Definition
⊢ ∀x. Cong x ⇔ x
[Exclude_def] Definition
⊢ ∀x. Exclude x ⇔ T
[IfCases_def] Definition
⊢ IfCases ⇔ T
[Req0_def] Definition
⊢ Req0 ⇔ T
[ReqD_def] Definition
⊢ ReqD ⇔ T
[label_def] Definition
⊢ ∀lab argument. (lab :- argument) ⇔ argument
[stmarker_def] Definition
⊢ ∀x. stmarker x = x
[unint_def] Definition
⊢ ∀x. unint x = x
[move_left_conj] Theorem
⊢ ∀p q m.
(p ∧ stmarker m ⇔ stmarker m ∧ p) ∧
((stmarker m ∧ p) ∧ q ⇔ stmarker m ∧ p ∧ q) ∧
(p ∧ stmarker m ∧ q ⇔ stmarker m ∧ p ∧ q)
[move_left_disj] Theorem
⊢ ∀p q m.
(p ∨ stmarker m ⇔ stmarker m ∨ p) ∧
((stmarker m ∨ p) ∨ q ⇔ stmarker m ∨ p ∨ q) ∧
(p ∨ stmarker m ∨ q ⇔ stmarker m ∨ p ∨ q)
[move_right_conj] Theorem
⊢ ∀p q m.
(stmarker m ∧ p ⇔ p ∧ stmarker m) ∧
(p ∧ q ∧ stmarker m ⇔ (p ∧ q) ∧ stmarker m) ∧
((p ∧ stmarker m) ∧ q ⇔ (p ∧ q) ∧ stmarker m)
[move_right_disj] Theorem
⊢ ∀p q m.
(stmarker m ∨ p ⇔ p ∨ stmarker m) ∧
(p ∨ q ∨ stmarker m ⇔ (p ∨ q) ∨ stmarker m) ∧
((p ∨ stmarker m) ∨ q ⇔ (p ∨ q) ∨ stmarker m)
*)
end
HOL 4, Kananaskis-13