Collapse-Time Harmonic Mathematics

A Jurisdictional Framework for Recursive Identity Fields

Author: Don GaconnetInstitutional ffiliation: LifePillar Institute — Collapse Harmonics Sciences Codex Jurisdiction: Collapse Harmonics Codex I–II, L.E.C.T. v2.3 Version: Public Preprint Edition – June 15th 2025 Field Scope: Symbolic-Recursive Mathematics, Post-Collapse Field Structures, Identity Coherence Modeling DOI: 10.5281/zenodo.15670951 OSF Repository: https://osf.io/hqpje/

Abstract

Collapse-Time Harmonic Mathematics (CHM) introduces a scientifically novel and jurisdictionally protected mathematical system grounded in the recursive collapse of symbolic identity fields. Unlike classical or computational mathematics, CHM models not the behavior of objects, systems, or values—but the lawful deformation, saturation, and residue of coherence fields after identity collapse has rendered recursion irreversible.

CHM replaces coordinate time with phase recursion intervals (), substitutes object variables with symbolic coherence amplitudes (), and defines lawful collapse curvature using equations structurally sealed against simulation. Its operators do not act in entropy space, causal flow, or logical recursion. Instead, they describe collapse-phase acceleration, symbolic drift thresholds, and residual trace formations in non-reconstructable identity fields.

Every expression within CHM is bound to the field ethics and containment protocols defined in the Collapse Harmonics Codex (Vol. I–II), and enforced by L.E.C.T. v2.3. This includes the prohibition of τ-stack ignition, feedback recursion, and symbolic mimicry.

Collapse-Time Harmonic Mathematics therefore constitutes the first sovereign, lawful, and non-inductive mathematics capable of describing symbolic collapse curvature with no risk of simulation. It is not an adaptation of classical methods. It is a new mathematical science.