A Construction of Heyting Algebra on Categorical Syllogisms

Abstract: The main purpose of this paper is to define a Heyting algebra on categorical syllogisms. For this aim, we explain categorical syllogisms by the diagrammatic method, which gives us a suitable treatment to logical reasoning with Caroll's diagrams. In this regard, we represent the quantitative relations between syllogisms' terms by means of bilateral diagrams. Finally, we construct a system, which is a Heyting algebra, for examining categorical syllogisms by using sets.

“…Recently, the topic is studied extensively and investigated under different treatments. For instance, Stanley Burris examined traditional syllogistic logic by using Boolean Algebras [3], Senturk and Oner constructed Heyting Algebras on categorical syllogisms [18], and Esko Turunen represented Peterson Intermediate Syllogisms by means of MV-Algebras [20]. In addition to these, we recently witness the use of syllogisms in different areas such as computer science [13,16], engineering [11,15], artificial intelligence [10,21], etc.…”

An algebraic analysis of categorical syllogisms by using Carroll’s diagrams

“…Recently, the topic is studied extensively and investigated under different treatments. For instance, Stanley Burris examined traditional syllogistic logic by using Boolean Algebras [3], Senturk and Oner constructed Heyting Algebras on categorical syllogisms [18], and Esko Turunen represented Peterson Intermediate Syllogisms by means of MV-Algebras [20]. In addition to these, we recently witness the use of syllogisms in different areas such as computer science [13,16], engineering [11,15], artificial intelligence [10,21], etc.…”

An algebraic analysis of categorical syllogisms by using Carroll’s diagrams