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\documentstyle[11pt,reduce]{article} \title{BOOLEAN: Computing with boolean expressions} \date{} \author{ H. Melenk\\[0.05in] Konrad--Zuse--Zentrum f\"ur Informationstechnik Berlin \\ Heilbronner Strasse 10 \\ D--10711 Berlin -- Wilmersdorf \\ Federal Republic of Germany \\[0.05in] E--mail: melenk@sc.zib--berlin.de \\[0.05in] } \begin{document} \maketitle \section{Introduction} The package {\bf Boolean} supports the computation with boolean expressions in the propositional calculus. The data objects are composed from algebraic expressions (``atomic parts'', ``leafs'') connected by the infix boolean operators {\bf and}, {\bf or}, {\bf implies}, {\bf equiv}, and the unary prefix operator {\bf not}. {\bf Boolean} allows you to simplify expressions built from these operators, and to test properties like equivalence, subset property etc. Also the reduction of a boolean expression by a partial evaluation and combination of its atomic parts is supported. \section{Entering boolean expressions} In order to distinguish boolean data expressions from boolean expressions in the \REDUCE programming language (e.g. in an {\bf if} statement), each expression must be tagged explicitly by an operator {\bf boolean}. Otherwise the boolean operators are not accepted in the \REDUCE algebraic mode input. The first argument of {\bf boolean} can be any boolean expression, which may contain references to other boolean values. \begin{verbatim} boolean (a and b or c); q := boolean(a and b implies c); boolean(q or not c); \end{verbatim} Brackets are used to override the operator precedence as usual. The leafs or atoms of a boolean expression are those parts which do not contain a leading boolean operator. These are considered as constants during the boolean evaluation. There are two pre-defined values: \begin{itemize} \item {\bf true}, {\bf t} or {\bf 1} \item {\bf false}, {\bf nil} or {\bf 0} \end{itemize} These represent the boolean constants. In a result form they are used only as {\bf 1} and {\bf 0}. By default, a {\bf boolean} expression is converted to a disjunctive normal form, that is a form where terms are connected by {\bf or} on the top level and each term is set of leaf expressions, eventually preceded by {\bf not} and connected by {\bf and}. An operators {\bf or} or {\bf and} is omitted if it would have only one single operand. The result of the transformation is again an expression with leading operator {\bf boolean} such that the boolean expressions remain separated from other algebraic data. Only the boolean constants {\bf 0} and {\bf 1} are returned untagged. On output, the operators {\bf and} and {\bf or} are represented as \verb+/\+ and \verb+\/+, respectively. \begin{verbatim} boolean(true and false); -> 0 boolean(a or not(b and c)); -> boolean(not(b) \/ not(c) \/ a) boolean(a equiv not c); -> boolean(not(a)/\c \/ a/\not(c)) \end{verbatim} \section{Normal forms} The {\bf disjunctive} normal form is used by default. It represents the ``natural'' view and allows us to represent any form free or parentheses. Alternatively a {\bf conjunctive} normal form can be selected as simplification target, which is a form with leading operator {\bf and}. To produce that form add the keyword {\bf and} as an additional argument to a call of {\bf boolean}. \begin{verbatim} boolean (a or b implies c); -> boolean(not(a)/\not(b) \/ c) boolean (a or b implies c, and); -> boolean((not(a) \/ c)/\(not(b) \/ c)) \end{verbatim} Usually the result is a fully reduced disjunctive or conjuntive normal form, where all redundant elements have been eliminated following the rules $ a \wedge b \vee \neg a \wedge b \longleftrightarrow b$ $ a \vee b \wedge \neg a \vee b \longleftrightarrow b$ Internally the full normal forms are computed as intermediate result; in these forms each term contains all leaf expressions, each one exactly once. This unreduced form is returned when you set the additional keyword {\bf full}: \begin{verbatim} boolean (a or b implies c, full); -> boolean(a/\b/\c \/ a/\not(b)/\c \/ not(a)/\b/\c \/ not(a)/\not(b)/\c \/ not(a)/\not(b)/\not(c)) \end{verbatim} The keywords {\bf full} and {\bf and} may be combined. \section{Evaluation of a boolean expression} If the leafs of the boolean expression are algebraic expressions which may evaluate to logical values because the environment has changed (e.g. variables have been bound), you can re--investigate the expression using the operator {\tt testbool} with the boolean expression as argument. This operator tries to evaluate all leaf expressions in \REDUCE boolean style. As many terms as possible are replaced by their boolean values; the others remain unchanged. The resulting expression is contracted to a minimal form. The result {\bf 1} (= true) or {\bf 0} (=false) signals that the complete expression could be evaluated. In the following example the leafs are built as numeric greater test. For using ${\bf >}$ in the expressions the greater sign must be declared operator first. The error messages are meaningless. \begin{verbatim} operator >; fm:=boolean(x>v or not (u>v)); -> fm := boolean(not(u>v) \/ x>v) v:=10$ testbool fm; ***** u - 10 invalid as number ***** x - 10 invalid as number -> boolean(not(u>10) \/ x>10) x:=3$ testbool fm; ***** u - 10 invalid as number -> boolean(not(u>10)) x:=17$ testbool fm; ***** u - 10 invalid as number -> 1 \end{verbatim} \end{document}