Abstract
The mathematical model (MM) of the measuring transducer (MT) is discussed. The MM is intended for restoration of deterministic signals distorted by mechanical inertia of the MT, resonances in MT’s circuits and stochastic perturbations. The MM is represented by the Leontieff type system of equations, reflecting the change in the state of MT under useful signal, deterministic and stochastic perturbations; algebraic system of equations modelling observations of distorted signal; and the Showalter–Sidorov initial condition. In addition the MM of the MT includes a functional. The minimum point of the functional is a required optimal measurement. Qualitative research the MM of MT is conducted by the methods of the degenerate operator group’s theory. Namely, the existence of the unique optimal measurement is proved. This result corresponds to input signal without deterministic and stochastic perturbation.
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