A classical dynamical framework with higher-order time derivatives is developed in which discrete atomic spectra emerge as a consequence of stability conditions rather than quantum postulates. Physical states are associated with dynamically stable regimes in an extended configuration space. A harmonic representation of classical dynamics introduces an action scale Y, whose minimal admissible value is selected by stability. The hydrogen atom is analyzed as a representative system, yielding the standard energy spectrum at leading order and characteristic higher-order corrections. Non-inertial contributions are formulated consistently at the level of the action. Possible experimental implications are briefly discussed.
T. F. Kamalov (Thu,) studied this question.
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