Abstract
Description
In this paper, we propose an advanced mathematical framework centered around the Energy Number
Field (E), which fundamentally avoids the conventional concept of zero by introducing a neutral ele-
ment, νE. Through this approach, we redefine core mathematical constructs, including limits, continuity,
differentiation, integration, and series summation, ensuring they operate seamlessly within a zero-less
paradigm. We address and redefine matrix operations, topology, metric spaces, and complex analysis,
aligning them with the principles of E. Additionally, we explore non-mappable properties of energy
numbers in the context of symmetry groups, non-standard fields, fractional calculus, and non-Euclidean
geometries. By employing νE as the central element, our framework resolves conventional zero-related sin-
gularities and computational anomalies, offering a novel perspective that bridges advanced mathematical
theories with practical applications in physics, computational algorithms, and topological transforma-
tions. This work paves the way for future research to experimentally validate these formulations and
explore potential applications in advanced physics, quantum mechanics, and beyond.