# Difference between revisions of "Disjunctive normal form"

(Comment: The dual is a conjunctive normal form) |
(more precise normal form, relation to truth table, cite Cohn (2003)) |
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{{MSC|03B05}} | {{MSC|03B05}} | ||

− | A propositional formula is said to be in ''disjunctive normal form'' if it is of the form | + | A canonical form for a [[propositional formula]]. A formula is said to be in ''disjunctive normal form'' if it is of the form |

\begin{equation}\label{eq1} | \begin{equation}\label{eq1} | ||

\bigvee_{i=1}^n \;\bigwedge_{j=1}^{m_i} C_{ij} , | \bigvee_{i=1}^n \;\bigwedge_{j=1}^{m_i} C_{ij} , | ||

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====Comments==== | ====Comments==== | ||

The dual of a disjunctive normal form is a [[conjunctive normal form]]. Both are also used in the theory of Boolean functions (cf. [[Boolean functions, normal forms of|Boolean functions, normal forms of]]). | The dual of a disjunctive normal form is a [[conjunctive normal form]]. Both are also used in the theory of Boolean functions (cf. [[Boolean functions, normal forms of|Boolean functions, normal forms of]]). | ||

+ | |||

+ | The form \ref{eq1} may be referred to as a disjunctive form: for a given set of $m$ propositional variables $p_1,\ldots,p_m$, the normal form is that in which each term $\wedge C_{ij}$ contains exactly $m$ terms $C_{ij}$, each being either $p_j$ or $\neg p_j$, and in which no term is repeated. This form is then unique up to order. The formula may be read as expressing the rows of the [[truth table]] for a propositional formula, in which each term describes one particular row of the table, corresponding to an assignment of truth values to the $p_j$, and the disjunctive form corresponds to the truth value assignments for which the formula takes the value "true". | ||

+ | |||

+ | ====References==== | ||

+ | * Paul M. Cohn, ''Basic Algebra: Groups, Rings, and Fields'', Springer (2003) ISBN 1852335874 |

## Latest revision as of 11:37, 29 November 2014

2010 Mathematics Subject Classification: *Primary:* 03B05 [MSN][ZBL]

A canonical form for a propositional formula. A formula is said to be in *disjunctive normal form* if it is of the form
\begin{equation}\label{eq1}
\bigvee_{i=1}^n \;\bigwedge_{j=1}^{m_i} C_{ij} ,
\end{equation}
where each $C_{ij}$ ($1,\ldots,n$; $j=1,\ldots,m_i$) is either a variable or the negation of a variable. The form \ref{eq1} is realizable (is a tautology) if and only if, for each $i$, $C_{i1},\ldots,C_{im_i}$ do not contain both the formulas $p$ and $\neg p$, where $p$ is any variable. For any propositional formula $A$ it is possible to construct an equivalent disjunctive normal form $B$ containing the same variables as $A$. Such a formula $B$ is then said to be *the disjunctive normal form* of the formula $A$.

#### Comments

The dual of a disjunctive normal form is a conjunctive normal form. Both are also used in the theory of Boolean functions (cf. Boolean functions, normal forms of).

The form \ref{eq1} may be referred to as a disjunctive form: for a given set of $m$ propositional variables $p_1,\ldots,p_m$, the normal form is that in which each term $\wedge C_{ij}$ contains exactly $m$ terms $C_{ij}$, each being either $p_j$ or $\neg p_j$, and in which no term is repeated. This form is then unique up to order. The formula may be read as expressing the rows of the truth table for a propositional formula, in which each term describes one particular row of the table, corresponding to an assignment of truth values to the $p_j$, and the disjunctive form corresponds to the truth value assignments for which the formula takes the value "true".

#### References

- Paul M. Cohn,
*Basic Algebra: Groups, Rings, and Fields*, Springer (2003) ISBN 1852335874

**How to Cite This Entry:**

Disjunctive normal form.

*Encyclopedia of Mathematics.*URL: http://encyclopediaofmath.org/index.php?title=Disjunctive_normal_form&oldid=35079