On the Real Line as a Highly Restricted Structure
Antonio Dominguez
Abstract
Version 2: This version corrects errors, improves exposition, and updates terminology and figures to better reflect the article’s scope, while preserving the original preprint’s central thesis and role within the MGQC research program. Abstract The real line is standardly treated as the canonical structure for the representation of continuous magnitude. This article proposes a different interpretation. Rather than taking ℝ as a primitive representational starting point, it examines the real line as a one-dimensional linear image of a more expressive orientation-bearing magnitude domain. Under this interpretation, the real line preserves magnitude only after suppressing orientational distinctions, thereby yielding a representation in which total order, sign opposition, and universal comparability arise as consequences of linear restriction rather than as primitive features of magnitude as such. The claim is not that classical real analysis is deficient or inconsistent, but that formal completeness in the sense of Dedekind and Cauchy should be distinguished from representational exhaustiveness. The paper therefore introduces a structural distinction between intrinsic properties of the real line as an ordered complete field and properties that may be understood as induced by projection from a more expressive pre-linear domain. The article is conceptual and metamathematical in scope: it does not yet define a new number system, but formulates the structural motivation for doing so. On this basis, the real line appears as a limiting case of maximal linear restriction within a broader hierarchy of possible magnitude representations. This preprint forms part of the Model of General Quasi-Coherence (MGQC) research program. The author publishes under the name Antonio Dominguez-Digat. Earlier records may appear under Antonio Domínguez, Antonio Dominguez, or Antonio Dominguez Digat.