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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% An Implementation of G4ip for Terzo
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% author: Christian.Urban@cl.cam.ac.uk
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%
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% some solvable sample queries:
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%
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% prove (nil |- p imp p).
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% prove (nil |- (p imp p) imp (p imp p)).
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% prove (nil |- ((((p imp q) imp p) imp p) imp q) imp q).
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% prove (nil |- (a imp (b imp c)) imp ((a imp b) imp (a imp c))).
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% prove (nil |- (a or (a imp b)) imp (((a imp b) imp a) imp a)).
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%
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% two non-solvable queries
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%
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% prove (nil |- a or (a imp false)).
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% prove (nil |- ((a imp b) imp a) imp a).
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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module G4ip.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% atomic formulae
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kind form type.
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type p form.
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type q form.
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type a form.
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type b form.
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type c form.
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type isatomic form -> o.
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isatomic p.
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isatomic q.
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isatomic a.
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isatomic b.
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isatomic c.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% logical operators
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type false form.
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type and form -> form -> form.
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type or form -> form -> form.
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type imp form -> form -> form.
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infixr and 9.
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infixr or 9.
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infixr imp 9.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% sequent constructor; sequents are of the form: (list |- formula)
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kind seq type.
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type |- list form -> form -> seq.
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infixl |- 4.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% prove predicate; prints "solvable" if seq is provable, otherwise "no"
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type prove seq -> o.
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prove (Gamma |- G) :- ( membNrest P Gamma Gamma',
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left (P::Gamma' |- G) );
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right (Gamma |- G).
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% rightrules
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type right seq -> o.
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right (Gamma |- B and C) :- prove (Gamma |- B), %% and-R
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prove (Gamma |- C).
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right (Gamma |- B imp C) :- prove (B::Gamma |- C). %% imp-R
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right (Gamma |- B or C) :- prove (Gamma |- B); %% or-R
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prove (Gamma |- C).
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% leftrules
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type left seq -> o.
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left (false :: Gamma |- G). %% false-L
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left (A :: Gamma |- A) :- isatomic A. %% axiom
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left (B and C::Gamma |- G) :- prove (B::C::Gamma |- G). %% and-L
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left (B or C::Gamma |- G) :- prove (B::Gamma |- G), %% or-L
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prove (C::Gamma |- G).
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left (A imp B::Gamma |- G) :- %% imp-L1
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isatomic A, ismember A Gamma, prove (B::Gamma |- G).
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left ((B and C) imp D::Gamma |- G) :- %% imp-L2
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prove (B imp (C imp D)::Gamma |- G).
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left ((B or C) imp D::Gamma |- G) :- %% imp-L3
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prove (B imp D::C imp D::Gamma |- G).
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left ((B imp C) imp D::Gamma |- G) :- %% imp-L4
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prove (C imp D::Gamma |- B imp C),
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prove (D::Gamma |- G).
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% returns a member and the remainder of a list
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type membNrest A -> list A -> list A -> o.
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membNrest X (X::Rest) Rest.
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membNrest X (Y::Tail) (Y::Rest) :- membNrest X Tail Rest.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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% succeeds only once if A is element in the list
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type ismember A -> list A -> o.
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ismember X (X::Rest) :- !.
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ismember X (Y::Tail) :- ismember X Tail.
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