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331 - 345 / 395; page
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G (p → F (q ∧ X F r))
Equivalent:
G (p → F (q ∧ X F r))
Complement:
¬ G (p → F (q ∧ X F r))
DBW
F G ¬ p ∨ G F ¬ q
Equivalent:
F G ¬ p ∨ G F ¬ q
Complement:
G F p ∧ F G q
NBW
¬ G (s ∧ F t → ¬ p U (t ∨ q ∧ ¬ p ∧ X (¬ p U r)))
Equivalent:
¬ G (s ∧ F t → ¬ p U (t ∨ q ∧ ¬ p ∧ X (¬ p U r)))
Complement:
G (s ∧ F t → ¬ p U (t ∨ q ∧ ¬ p ∧ X (¬ p U r)))
NBW
¬ G (s ∧ F t → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p))
Equivalent:
¬ G (s ∧ F t → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p))
Complement:
G (s ∧ F t → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p))
NBW
¬ p W p W ¬ p W p W G ¬ p
Equivalent:
¬ p W p W ¬ p W p W G ¬ p
Complement:
¬ (¬ p W p W ¬ p W p W G ¬ p)
•
(((F p U (¬ p ∧ F p)) U (p ∧ F p U (¬ p ∧ F p))) U (¬ p ∧ (F p U (¬ p ∧ F p)) U (p ∧ F p U (¬ p ∧ F p)))) U (p ∧ ((F p U (¬ p ∧ F p)) U (p ∧ F p U (¬ p ∧ F p))) U (¬ p ∧ (F p U (¬ p ∧ F p)) U (p ∧ F p U (¬ p ∧ F p))))
NBW
¬ (G ¬ s ∨ ¬ s U (s ∧ (F (q ∧ X F r) → ¬ q U p)))
Equivalent:
¬ (G ¬ s ∨ ¬ s U (s ∧ (F (q ∧ X F r) → ¬ q U p)))
Complement:
G ¬ s ∨ ¬ s U (s ∧ (F (q ∧ X F r) → ¬ q U p))
NBW
¬ G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
Equivalent:
¬ G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
Complement:
G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
NBW
¬ G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
Equivalent:
¬ G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
Complement:
G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
NBW
G ¬ s ∨ ¬ s U (s ∧ F p → ¬ p U (q ∧ ¬ p ∧ X (¬ p U r)))
Equivalent:
G ¬ s ∨ ¬ s U (s ∧ F p → ¬ p U (q ∧ ¬ p ∧ X (¬ p U r)))
Complement:
¬ (G ¬ s ∨ ¬ s U (s ∧ F p → ¬ p U (q ∧ ¬ p ∧ X (¬ p U r))))
NBW
G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
Equivalent:
G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
Complement:
¬ G (s ∧ F t → (p → ¬ t U (q ∧ ¬ t ∧ X (¬ t U r))) U t)
NBW
G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
Equivalent:
G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
Complement:
¬ G (t ∧ F u → (p → ¬ u U (q ∧ ¬ u ∧ ¬ s ∧ X ((¬ u ∧ ¬ s) U r))) U u)
NBW
¬ G (s → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p) ∨ G ¬ (q ∧ X F r))
Equivalent:
¬ G (s → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p) ∨ G ¬ (q ∧ X F r))
Complement:
G (s → ¬ (q ∧ ¬ t ∧ X (¬ t U (r ∧ ¬ t))) U (t ∨ p) ∨ G ¬ (q ∧ X F r))
NBW
¬ G (s → G (q ∧ X F r → X (¬ r U (r ∧ F p))))
Equivalent:
¬ G (s → G (q ∧ X F r → X (¬ r U (r ∧ F p))))
Complement:
G (s → G (q ∧ X F r → X (¬ r U (r ∧ F p))))
NBW
¬ G (s ∧ F t → (q ∧ X (¬ t U r) → X (¬ t U (r ∧ F p))) U t)
Equivalent:
¬ G (s ∧ F t → (q ∧ X (¬ t U r) → X (¬ t U (r ∧ F p))) U t)
Complement:
G (s ∧ F t → (q ∧ X (¬ t U r) → X (¬ t U (r ∧ F p))) U t)
NBW
G F p ∧ G F q ∧ G F r ∧ G F s
Equivalent:
G F p ∧ G F q ∧ G F r ∧ G F s
Complement:
DBW