The L-system representation and c-entropy
Abstract
Given a symmetric operator A with deficiency indices (1,1) and its self-adjoint extension A in a Hilbert space H, we construct a (unique) L-system with the main operator in H such that its impedance mapping coincides with the Weyl-Titchmarsh function M( A, A)(z) or its linear-fractional transformation M( A, Aα)(z). Similar L-system constructions are provided for the Weyl-Titchmarsh function aM( A, A)(z) with a>0. We also evaluate c-entropy and the main operator dissipation coefficient for the obtained L-systems.
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