The aim of contextual logic is to provide a formal theory of
elementary logic, which is based on the doctrines of concepts,
judgements, and conclusions. Concepts are mathematized using Formal
Concept Analysis (FCA), while an approach to the formalization of
judgements and conclusions is conceptual graphs, based on Peirce's
existential graphs. Combining FCA and a mathematization of
conceptual graphs yields so-called concept graphs, which offer a
formal and diagrammatic theory of elementary logic.
Expressing negation in contextual logic is a difficult task.
Based on the author's dissertation, this book shows how negation on
the level of judgements can be implemented. To do so, cuts
(syntactical devices used to express negation) are added to concept
graphs. As we can express relations between objects, conjunction
and negation in judgements, and existential quantification, the
author demonstrates that concept graphs with cuts have the
expressive power of first-order predicate logic. While doing so,
the author distinguishes between syntax and semantics, and provides
a sound and complete calculus for concept graphs with cuts. The
author's treatment is mathematically thorough and consistent, and
the book gives the necessary background on existential and
conceptual graphs.
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