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Spectrum and numerical range for the Friedrichs model of special form

Tulkin H. RasulovBukhara State University (Uzbekistan)Fayzulla KosimovBukhara State Pedagogical Institute (Uzbekistan)Nilufar OkbaevaKarshi State University (Uzbekistan)Jasmina HusenovaBukhara State University (Uzbekistan)Dilshod RajabovBukhara State University (Uzbekistan)
2025en
ABI

Аннотация

This study investigates a variant of the Friedrichs operator H subject to a perturbation of rank three, acting within a complex Hilbert space <i>L</i><sub>2</sub>[-<i>&pi;</i> ; <i>&pi;</i> ] . The considered operator is characterized by its linearity, boundedness, and self-adjoint nature, and it models the Hamiltonian associated with a pair of interacting particles confined to a one-dimensional discrete lattice. The research reveals that although the rightmost point of the spectrum of <i>H</i> does not lie within the numerical range of the operator, it appears as a limit point. Depending on whether the so-called "special integral" is finite or divergent, the numerical range of the main operator <i>H</i> is examined through the lens of three related Friedrichs-type operators, each modified by a rank-one perturbation. A central role in this investigation is played by the specification of parameter-dependent functions.

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