| Popis: |
\textit{Mereological fusion}, also known as \textit{composition} and \textit{sum}, was originally used by me as a primitive notion to axiomatize \textit{Extensional Mereology} wih \textit{atoms} in \cite{Ly22}. Here, I extend this idea to axiomatize \textit{General Extensional Mereology}, also called \textit{Classical Mereology}, which is neutral regarding the existence of atoms. I give a proof that classical mereology is axiomatizable using primitive mereological fusion within the framework of two-sorted logic, as I announced in \cite{Ly22}. The use of the primitive notion of fusion instead of primitive notion of \textit{part} was considered by G. Leibniz \cite[50]{CoVa21}, S. Le\'sniewski \cite[CCLXIV, CCLXIV]{Le92}, K. Fine \cite{Fi10}, J. Ketland, and T. Schindler \cite{KeSh16}, and S. Kleishmid \cite{Kl17}. C. Lejewski formulated mereology using a single axiom with primitive mereological sum \cite[222]{Sb84}. However, Lejewski's theory is formulated in non-classical language of Le\'sniewski's ontology and contains complicated quantification over function symbols, including quantification on \textit{part of} and \textit{sum of}. Lejewski's approach is not expressible in modern mereologies. The presented theory is the first contemporary axiomatization of classical mereology in two-sorted logic with primitive mereological fusion. |
