Disjunctive normal form boolean logic , a disjunctive normal form canonical normal form of a logical formula consisting of a disjunction of conjunctions ; it can also be described as an OR of ANDs , a sum of products , or a cluster concepta normal form , it is useful in automated theorem proving .Definition A logical formula is considered to be in DNF if it is a disjunction of one or more conjunctions of one or more literals . A DNF formula is in full disjunctive normal form if each of its variables appears exactly once in every conjunction. As in conjunctive normal form , the only propositional operators in DNF are and , or, and not . The not operator can only be used as part of a literal, which means that it can only precede a propositional variable . context-free grammar for DNF: disjunction → disjunction → conjunction conjunction → conjunction → literal literal → ¬variable literal → variable variable is any variable.not in DNF:, since an OR is nested within a NOT , since an AND is nested within a NOT , since an OR is nested within an AND Conversion to DNF Converting a formula to DNF involves using logical equivalences, such as double negation elimination , De Morgan's laws , and the distributive law .n Boolean function can be represented by one and only one full disjunctive normal form, one of the canonical forms. In contrast, two different plain disjunctive normal forms may denote the same Boolean function , see pictures.The Boolean satisfiability problem on conjunctive normal form formulas is NP-hard ; by the duality principle , so is the falsifiability problem on DNF formulas. Therefore, it is co-NP-hard to decide if a DNF formula is a tautology .Variants An important variation used in the study of computational complexity is k-DNF . A formula is in k-DNF if it is in DNF and each conjunction contains at most k literals.
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