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Let us now extend the CSP–GSB calculus in the following way:
 
Let us now extend the CSP–GSB calculus in the following way:
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The first extension is the ''reflective extension of logical graphs'', or what may be described as the ''cactus language'', after its principal graph-theoretic data structure. It is generated by generalizing the negation operator <math>\texttt{(_)}\!</math> in a particular manner, treating <math>\texttt{(_)}\!</math> as the ''[[minimal negation operator]]'' of order 1, and adding another such operator for each integer parameter greater than 1.
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The first extension is the ''reflective extension of logical graphs'', or what may be described as the ''cactus language'', after its principal graph-theoretic data structure.&nbsp; It is generated by generalizing the negation operator <math>\texttt{(} \_ \texttt{)}\!</math> in a particular manner, treating <math>\texttt{(} \_ \texttt{)}\!</math> as the ''[[minimal negation operator]]'' of order 1 and adding another such operator for each order greater than 1.&nbsp; Taken in series, the minimal negation operators are symbolized by parenthesized argument lists of the following shapes:&nbsp; <math>\texttt{(} \_ \texttt{)},\!</math>&nbsp; <math>\texttt{(} \_ \texttt{,} \_ \texttt{)},\!</math>&nbsp; <math>\texttt{(} \_ \texttt{,} \_ \texttt{,} \_ \texttt{)},\!</math>&nbsp; and so on, where the number of argument slots is the order of the reflective negation operator in question.
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