Let H be a set of non-positive Horn clauses. Show that H it is satisfying. Let H be a set of non-po

Shamar Reese

Shamar Reese

Answered question

2022-05-27

Let H be a set of non-positive Horn clauses. Show that H it is satisfying.
Let H be a set of non-positive Horn clauses. Show that H it is satisfying.
Is this true if there are positive clauses in H?
I'm finding hard to answer this questio, I have think about it for a long time, but can't find a good example/aproach
Can somebody help me? I'm just starting to see Horn clauses

Answer & Explanation

cuprins60

cuprins60

Beginner2022-05-28Added 8 answers

Explanation:
If none of the Horn clauses is positive, then a satisfying valuation is one which maps all propositional symbols to 0. If there is even a single positive clause, then there are unsatisfiable sets of Horn clauses, such as: p ( p ¬ p )
Thomas Hubbard

Thomas Hubbard

Beginner2022-05-29Added 2 answers

Explanation:
Yes there're positive Horn clauses according to reference here:
A Horn clause is a clause (a disjunction of literals) with at most one positive, i.e. unnegated, literal.
A Horn clause with exactly one positive literal is a definite clause or a strict Horn clause; a definite clause with no negative literals is a unit clause, and a unit clause without variables is a fact; A Horn clause without a positive literal is a goal clause.
So the H in your first line question is a goal clause.

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