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$ \newcommand{\Pt}{ \ \mathbb P \ } \newcommand {\cz}{\ C_z \ } \newcommand {\eps}{\ \varepsilon \ }$Logic: first order logic with equality Extra-logical primitives: "$\varepsilon$" standing for the …

\operatorname {atom} z: z \subseteq y \land z \subseteq C )$ This theory does not violate any of the tenets of Mereology, though it doesn't adopt the Unrestricted Composition principle. …

l: l=\{x\} \land \forall y: \{y\} \subseteq x \to \{\{y\}\} \subseteq x$ Choice: $\exists C \, \forall x \, \exists y : y=C(x) \land \exists \{y\} \subseteq x$ This theory does respect all tenets of Mereology … , the first four principles are the axioms of Atomic General Extensional Mereology "$\sf AGEM$". …

This question is about synonymy between Set theory and Mereology. David Lewis in Mathematics is Megethology tried to reduce Set Theory to Mereology augmented with a singleton function. … The following exposition is a formal capture of his Mereology. …

So, in some sense this theory does reduce the standard Set Theory to this kind of Linked-Connective-Mereology + Size criterions. … In nutshell, that mathematics reduces to Set Theory which with the aid of some Mereology would be reducible to some size notions. …

I would say here that this theory itself can be captured in a mono-sorted way, especially in Mereology. … This is just a straightforward capture of relations in terms of Mereology, so the whole thought is about establishing a theory about relations. That's why I call it Relational Mereology. …

The other way to coin the empty set in Mereology is to actually consider it a non-labeling bottom atom. … The problem with rounding the mereological system to have a bottom object is that: first it violates a maxim of Extensional Mereology, that is Supplementation, so it is anomalous in Mereology, and the …

The idea is to work in Atomic General Extensional Mereology "AGEM", one can think of it easily as a theory about collections of atoms, where atoms are indivisible objects, i.e. objects that do not have …

I observed that all rules of $\text{ZF}$ can be derived from the following Mereology-Set translation rule: If $\phi$ is a formula in the pure language of mereology (only uses $P$ and $=$ as predicates … paralleling or rather mimicking the atomic part-hood relation of Mereology. …