Fundamental properties of fractional powers of unbounded operators in Banach spaces

Belonosov Vladimir Sergeevich; Shvets Alexey Georgievich

Belonosov Vladimir Sergeevich

1. Институт математики им. С.~Л.~Соболева Сибирского отделения Российской академии наук, Новосибирск, Россия

bvs@math.nsc.ru

Shvets Alexey Georgievich

1. Новосибирский государственный университет, Новосибирск, Россия

a.shvets1@g.nsu.ru

Подробнее

<h3> Belonosov Vladimir Sergeevich </h3> <ol> <li> Sobolev Institute of Mathematics, Siberian Branch of the Russian Academy of Sciences, Novosibirsk, Russian Federation, </li> <li> <a href="bvs@math.nsc.ru">bvs@math.nsc.ru</a></li> <\ol> <h3> Shvets Alexey Georgievich </h3> <ol> <li> Novosibirsk State University,\\ 630090, Novosibirsk, Russian Federation, </li> <li> <a href="a.shvets1@g.nsu.ru">a.shvets1@g.nsu.ru</a></li> <\ol>

Материал поступил в редколлегию 29.05.2024

In this paper, the classical theory of operator-valued analytic functions is extended to a wide class of linear unbounded operators, defined in Banach spaces on not everywhere dense sets. The properties of fractional powers of the corresponding operators are also established. The class under consideration includes Sturm--Liouville differential operators with homogeneous Dirichlet boundary conditions, acting in spaces of continuous functions on bounded intervals

УДК 517.9

Fundamental properties of fractional powers of unbounded operators in Banach spaces

Keywords: Abstract Mathieu--Hill equations, reduction to standard form, operator exponentials and fractional powers, parametric resonance.

Выходные данные: Belonosov V. S. , Shvets A. G. Fundamental properties of fractional powers of unbounded operators in Banach spaces. Mat. Trudy 2024, 27, № 3. С. 20–29.

DOI 10.25205/1560-750X-2024-27-3-20-29