The "Wholeness Axiom" is often associated with the field of mathematics, particularly in discussions around set theory and certain formal systems. It posits that a collection of objects, or a set, is considered whole if it contains all the elements of interest without exceptions or omissions. In a broader philosophical or conceptual framework, the Wholeness Axiom can be interpreted as asserting that a system is complete when it encapsulates all necessary components or properties within it.
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