Series 2 Paper 3 models the sub-quantum vacuum as a carrier condensate with derived parameters (m_carrier = m_P*sqrt(2*pi*alpha*D_I) = 3.805e-9 kg, xi = 9.244e-35 m, omega_mu = 1.621e42 rad/s, satisfying hbar = 2*m_carrier*xi^2*omega_mu) and derives non-relativistic quantum mechanics: the Born rule from energy conservation at the condensation event, the Schrodinger equation via the Nelson diffusion coefficient D = hbar/2m, and a topological U(1)-bundle resolution of the Wallstrom problem, together with a falsifiable smooth-exponential which-path visibility decay.
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