====================================================================== = Equisatisfiability = ====================================================================== Introduction ====================================================================== In logic, two formulae are equisatisfiable if the first formula is satisfiable whenever the second is and vice versa; in other words, either both formulae are satisfiable or both are not. Equisatisfiable formulae may disagree, however, for a particular choice of variables. As a result, equisatisfiability is different from logical equivalence, as two equivalent formulae always have the same models. Equisatisfiability is generally used in the context of translating formulae, so that one can define a translation to be correct if the original and resulting formulae are equisatisfiable. Examples of translations involving this concept are Skolemization and some translations into conjunctive normal form. Examples ====================================================================== A translation from propositional logic into propositional logic in which every binary disjunction a \vee b is replaced by ((a \vee n) \wedge (\neg n \vee b)), where n is a new variable (one for each replaced disjunction) is a transformation in which satisfiability is preserved: the original and resulting formulae are equisatisfiable. Note that these two formulae are not equivalent: the first formula has the model in which b is true while a and n are false (the model's truth value for n being irrelevant to the truth value of the formula), but this is not a model of the second formula, in which n has to be true in this case. License ========= All content on Gopherpedia comes from Wikipedia, and is licensed under CC-BY-SA License URL: http://creativecommons.org/licenses/by-sa/3.0/ Original Article: http://en.wikipedia.org/wiki/Equisatisfiability