Invariant Extremal Projections for Operator-Ordered Families

We study an extremal projection principle for families of operators ordered by domination, induced by fixed bounded linear mappings acting on a source with an additive baseline. Stability is defined through domination of second--order structure, leading to a covariance envelope of admissible sources ordered by the Löwner relation. Our main result establishes an envelope extremal principle: the maximal value of the quadratic functional over the entire envelope coincides with that of a single extremal configuration, which may lie only in the closure of the admissible class. This identification is obtained without convexity, compactness, or any global Hilbert space structure governing all components of the system, and relies instead on an operator--theoretic approximation scheme. As a consequence, minimax optimization over stability sets reduces to an ordinary quadratic minimization problem with well--posed existence and uniqueness properties for the associated minimizing operators. Structural properties of covariance envelopes are also derived, including density, closure, and spectral characterizations in stationary settings.