|
theory ILL_predlog
imports ILL
begin
typedecl plf
consts
conj :: "[plf,plf] \ plf" (infixr "&" 35)
disj :: "[plf,plf] \ plf" (infixr "|" 35)
impl :: "[plf,plf] \ plf" (infixr ">" 35)
eq :: "[plf,plf] \ plf" (infixr "=" 35)
ff :: "plf" ("ff")
PL :: "plf \ o" ("[* / _ / *]" [] 100)
syntax
"_NG" :: "plf \ plf" ("- _ " [50] 55)
translations
"[* A & B *]" \<rightleftharpoons> "[*A*] && [*B*]"
"[* A | B *]" \<rightleftharpoons> "![*A*] ++ ![*B*]"
"[* - A *]" \<rightleftharpoons> "[*A > ff*]"
"[* ff *]" \<rightleftharpoons> "0"
"[* A = B *]" \<rightharpoonup> "[* (A > B) & (B > A) *]"
"[* A > B *]" \<rightleftharpoons> "![*A*] -o [*B*]"
(* another translations for linear implication:
"[* A > B *]" == "!([*A*] -o [*B*])" *)
(* from [kleene 52] pp 118,119 *)
lemma k49a: "\ [* A > ( - ( - A)) *]"
by best_safe
lemma k49b: "\ [*( - ( - ( - A))) = ( - A)*]"
by best_safe
lemma k49c: "\ [* (A | - A) > ( - - A = A) *]"
by best_safe
lemma k50a: "\ [* - (A = - A) *]"
by best_power
lemma k51a: "\ [* - - (A | - A) *]"
by best_safe
lemma k51b: "\ [* - - (- - A > A) *]"
by best_power
lemma k56a: "\ [* (A | B) > - (- A & - B) *]"
by best_safe
lemma k56b: "\ [* (-A | B) > - (A & -B) *]"
by best_safe
lemma k57a: "\ [* (A & B) > - (-A | -B) *]"
by best_safe
lemma k57b: "\ [* (A & -B) > -(-A | B) *]"
by best_power
lemma k58a: "\ [* (A > B) > - (A & -B) *]"
by best_safe
lemma k58b: "\ [* (A > -B) = -(A & B) *]"
by best_safe
lemma k58c: "\ [* - (A & B) = (- - A > - B) *]"
by best_safe
lemma k58d: "\ [* (- - A > - B) = - - (-A | -B) *]"
by best_safe
lemma k58e: "! [* - -B > B *] \ [* (- -A > B) = (A > B) *]"
by best_safe
lemma k58f: "! [* - -B > B *] \ [* (A > B) = - (A & -B) *]"
by best_safe
lemma k58g: "\ [* (- -A > B) > - (A & -B) *]"
by best_safe
lemma k59a: "\ [* (-A | B) > (A > B) *]"
by best_safe
lemma k59b: "\ [* (A > B) > - - (-A | B) *]"
by best_power
lemma k59c: "\ [* (-A > B) > - -(A | B) *]"
by best_power
lemma k60a: "\ [* (A & B) > - (A > -B) *]"
by best_safe
lemma k60b: "\ [* (A & -B) > - (A > B) *]"
by best_safe
lemma k60c: "\ [* ( - - A & B) > - (A > -B) *]"
by best_safe
lemma k60d: "\ [* (- - A & - B) = - (A > B) *]"
by best_safe
lemma k60e: "\ [* - (A > B) = - (-A | B) *]"
by best_safe
lemma k60f: "\ [* - (-A | B) = - - (A & -B) *]"
by best_safe
lemma k60g: "\ [* - - (A > B) = - (A & -B) *]"
by best_power
lemma k60h: "\ [* - (A & -B) = (A > - -B) *]"
by best_safe
lemma k60i: "\ [* (A > - -B) = (- -A > - -B) *]"
by best_safe
lemma k61a: "\ [* (A | B) > (-A > B) *]"
by best_safe
lemma k61b: "\ [* - (A | B) = - (-A > B) *]"
by best_power
lemma k62a: "\ [* (-A | -B) > - (A & B) *]"
by best_safe
end
¤ Dauer der Verarbeitung: 0.15 Sekunden
(vorverarbeitet)
¤
|
Haftungshinweis
Die Informationen auf dieser Webseite wurden
nach bestem Wissen sorgfältig zusammengestellt. Es wird jedoch weder Vollständigkeit, noch Richtigkeit,
noch Qualität der bereit gestellten Informationen zugesichert.
Bemerkung:
Die farbliche Syntaxdarstellung ist noch experimentell.
|
