Litcius/Paper detail

Coherent Euclidean Structures with Internal Orientational Parameters

Antonio Dominguez

2026Zenodo (CERN European Organization for Nuclear Research)5 citationsDOIOpen Access PDF

Abstract

This is the first version of an independent article within the Model of General Quasi-Coherence (MGQC) research program. This article introduces a formal geometric class of coherent Euclidean structures designed to distinguish between geometrically effective directions and internal orientational degrees of freedom. While standard Euclidean modeling typically treats all coordinates as dimension-generating variables, the framework proposed here separates a geometrically effective subspace from an internal subspace and studies their relationship through a structural projection. The author publishes under the name Antonio Dominguez-Digat. Earlier records may appear under Antonio Domínguez, Antonio Dominguez, or Antonio Dominguez Digat.

Topics & Concepts

Euclidean geometrySubspace topologyClass (philosophy)Non-Euclidean geometryMathematicsEuclidean distancePure mathematicsEuclidean domainTheoretical physicsAlgebra over a fieldPhysicsInternal modelEuclidean spaceMathematical analysisComputer scienceFeature (linguistics)AlgorithmLinear subspaceOperator theoryArtificial intelligenceStructural Analysis and OptimizationTopology Optimization in EngineeringAlgebraic and Geometric Analysis