The Constituents of Sets, Numbers, and Other Mathematical Objects, Part One
Ruadhan O'Flanagan

TL;DR
This paper introduces the concept of constituent structures in pure sets, representing deep set relationships as directed graphs, and explores their implications for set representation and mathematical object construction.
Contribution
It defines a new partial order on sets based on constituents, introduces constituent structure isomorphisms, and analyzes their role in representing mathematical objects.
Findings
Constituent structures form directed graphs indicating set relationships.
Different sets can share the same constituent structure despite different sizes.
Constituent structure-based representations enable encoding properties within sets.
Abstract
The sets used to construct other mathematical objects are pure sets, which means that all of their elements are sets, which are themselves pure. One set may therefore be within another, not as an element, but as an element of an element, or even deeper, inside several layers of sets within sets. The introduction of the term constituent to describe a set which is within a given set, however deep, induces an apparently novel partial order on sets, and assigns to any given set a diagram which specifies a directed graph, or category, herein dubbed its constituent structure, indicating which sets within it are constituents of which others. Sets with different numbers of elements can have exactly the same constituent structure. Consequently, constituent structure isomorphisms between sets need not preserve the number of elements, although they are still injective, surjective, and invertible.…
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Taxonomy
TopicsMathematics and Applications · History and Theory of Mathematics
