On the optimal recovery of one family of operators on a class of functions from approximate information about its spectrum

E. V. Abramova^a, E. O. Sivkova<sup>ba

a</sup> National Research University "Moscow Power Engineering Institute"
^b Southern Mathematical Institute of the Vladikavkaz Scientific Center of the Russian Academy of Sciences, Vladikavkaz

Abstract: We find explicit expressions for optimal recovery methods in the problem of recovering the values of continuous linear operators on a Sobolev function class from the following information: The Fourier transform of functions is known approximately on some measurable subset of the finite-dimensional space on which the functions are defined. As corollaries, we obtain optimal methods for recovering the solution to the heat equation and solving the Dirichlet problem for a half-space.

Keywords: optimal recovery, optimal method, Fourier transform, extremal problem.

UDC: 517.9

MSC: 35R30

Received: 20.09.2023
Revised: 20.09.2023
Accepted: 28.11.2023

DOI: 10.33048/smzh.2024.65.201

 English version: Siberian Mathematical Journal, 2024, 65:2, 245–256