T56 derives the rotational coefficient \ (\) in the reduced defect operator from antisymmetric transport interference between effective channel amplitudes \ (P\) and \ (Q\). The theorem shows that the rotational contribution is proportional to the imaginary cross-term\ (P Q), that the antisymmetric component of the reduced operator vanishes whenever the transport amplitudes are phase-aligned. In the reduced defect sector, the operator takes the form\ Q_= I + R, \ (R\) is the antisymmetric rotational generator and \ (\) is induced by phase-sensitive interference structure between the coupled transport channels. The theorem, therefore, identifies rotational structure not as an independently inserted component, but as an emergent consequence of asymmetric phase transport. T56 provides one of the early operator-level mechanisms linking transport asymmetry to rotational structure within the Q5 framework. The theorem later became architecturally important for the mediated residual and reduced-sector constructions developed in the TA-series residual ecology arc. Status: solid for the proportional emergence of the antisymmetric rotational coefficient from the imaginary transport cross-term under the stated reduction assumptions; conditional on the effective reduced operator decomposition and nondegeneracy of the proportionality coefficient; interpretive claims regarding later physical analogies remain heuristic rather than formally derived here.
Craig Edwin Holdway (Sat,) studied this question.