A gauge-invariant bundle isomorphism is established between complex velocity fields from stochastic gravity averaging and quantum SLD operators, yielding a Fisher metric in Madelung-Bohm velocities and quantized holonomies for spacetime loops.
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A complex velocity field from stochastic spacetime metrics forms a flat U(1) connection whose holonomy includes a quantized stochastic correction to the topological phase.
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A Gauge-Invariant Bundle Isomorphism Between Complex Velocity Fields and Symmetric Logarithmic Derivatives
A gauge-invariant bundle isomorphism is established between complex velocity fields from stochastic gravity averaging and quantum SLD operators, yielding a Fisher metric in Madelung-Bohm velocities and quantized holonomies for spacetime loops.
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Topological Quantization of Complex Velocity in Stochastic Spacetimes
A complex velocity field from stochastic spacetime metrics forms a flat U(1) connection whose holonomy includes a quantized stochastic correction to the topological phase.