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The Jacobian of F(z,w) = (z²+βw, z) at the origin satisfies J(0)ᵀGJ(0) = βG, with sig(G) = (2,2). Conformal preservation at the fixed point. Global Q-preservation disproven. Differential signature globally preserved (→ Proof 15). Pure matrix algebra.
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Title CCFU Proof 3 — Conformal Preservation J(0)ᵀGJ(0) = βG
The Jacobian of F(z,w) = (z²+βw, z) at the origin satisfies J(0)ᵀGJ(0) = βG, with sig(G) = (2,2). Conformal preservation at the fixed point. Global Q-preservation disproven. Differential signature globally preserved (→ Proof 15). Pure matrix algebra.
Work type Research papers, Thesis, Lecture notes
Tags conformal, nonlinear memory, signature, bilinear form, proof, jacobian, mathematics, ccfu
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Identifier 2605155663445
Entry date May 15, 2026, 7:43 AM UTC
License All rights reserved
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Author 100.00 %. Holder Captain Cookie Face Universe. Date May 15, 2026.
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