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| Formato: | Recurso digital |
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Zenodo
2026
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| Acceso en liña: | https://doi.org/10.5281/zenodo.20269065 |
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Table of Contents:
- <p class="font-claude-response-body break-words whitespace-normal leading-[1.7]"><strong>Paper L — The Democratic c³: Three Equal Modes and the Five-Dimensional Representational Space (v2.2.1)</strong></p> <p class="font-claude-response-body break-words whitespace-normal leading-[1.7]">LFCT builds the observable universe from three irreducible representational modes — TS (κ=π²), TD (κ=1), TR (κ=5/2) — sharing cadence budget C₀ = 1/c. This paper shows these three modes give rise to a five-dimensional representational structure (3 spatial + 1 depth + 1 energy), with the observable universe as its 3D projection. The mass-energy relation decomposes as E = c³ = c × c × c — three equal, independent factors, one per mode. Mass is what happens when one mode (TR) expresses its factor of c as curvature rather than spatial presentation. Two measurable CMB consequences follow: (1) the 5D→3D projection shifts the density–velocity phase relationship by δ = ε/(2(1+ε))·(1−σ(ℓ)), a single zero-parameter correction that reduces peak position RMS from 16.9 to 9.8; (2) the 4D spatial subspace (3 TS + 1 TD) determines the geometric damping exponent 3/2 = (4−1)/2, unifying the phase deficit and damping as different-dimensional manifestations of the same representational Lorentz contraction 1/(2c²_rep). The hiding fraction ε/2 = 1/(2π²) controls baryon hiding, visibility recovery, inner TR corrections, crossover routing, and velocity phase offsets — all from one structural origin. <br><br>Depends on: LFIS-24 v2.4.2, LFIS-25 v1.3.2, LFIS-27 v1.3.4, LFIS-28 v1.3.3, LFIS-29 v1.1.0, Core CS v3.1.1, Core MF v3.2.2, Core PD v2.2.1.</p>