This paper presents a speculative sketch aiming to redefine the "Zero Point" in addition and multiplication. In contrast to the geometric definitions of the multiplicative world handled by contemporary number theory, this thesis describes the behavior of numbers not through a purely algebraic approach, but as a "phe nomenological spatial model" utilizing perspectives from energy conservation laws and topology. We capture the origin of numbers not as statically defined symbols of "0" and "1", but as a fundamental oscillating unit of existence, termed the "Monado". With profound respect for Leibniz's Monadology, this model, which seeks to identify the absolute position of the cosmos within additive and multiplicative worlds, is designated as the Universal Mapping Absolute (UMA) Monado Theory.
Hirofumi Miyauchi (Sat,) studied this question.