Published June 19, 2026 | Version v11

wave point geometry

Authors/Creators

Description

Wave-Point Geometry is a proposed mathematical framework in which geometric
structure is not assumed as a primitive concept, but is instead generated from phase
transport on a discrete relational system.
The theory begins with a collection of abstract nodes connected by relations that
carry phase information. In contrast to classical approaches based on distance, coor
dinates, or smooth manifolds, no metric structure is introduced at the foundational
level. Instead, all geometric notions are reconstructed from how phase behaves under
transport along connections.
Central geometric phenomena, such as curvature, holonomy, and global consis
tency, arise from the behavior of phase accumulation around closed paths. This
allows geometry to be interpreted as a consequence of transport constraints rather
than as an intrinsic background structure.
Within this framework, spectral properties, homological structures, and categor
ical relationships are developed as derived objects emerging from the same phase
based foundation. The theory aims to unify discrete and continuous perspectives
by treating geometry as an emergent property of relational phase dynamics rather
than a predefined space.

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Discrete Nonlinear Geometry and Structural Crystallization.pdf

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