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 Mosc. Math. J., 2020, Volume 20, Number 1, Pages 185–210 (Mi mmj762)

Nonlocal elliptic problems and applications

Veli B. Shakhmurov

Department of Mechanical Engineering, Okan University, Akfirat, Tuzla 34959 Istanbul, Turkey

Abstract: In this paper, the integral boundary value problems for differential-operator equations with principal variable coefficients are studied. Several conditions for the $L^{p}$-separability are given. Moreover, the sharp coercive estimates for resolvents of corresponding differential operators are shown. It is implied that these operators are positive and also are generators of analytic semigroups. Then, the existence and uniqueness of maximal regular solution to nonlinear abstract elliptic equations is derived. In application, maximal regularity properties of the abstract parabolic equation with variable coefficients and systems of elliptic equations are derived in mixed $L^{\mathbf{p}}$-spaces.

Key words and phrases: Separable boundary value problems, equations with variable coefficients, differential-operator equation, nonlinear abstract differential equations, Abstract Sobolev spaces, well-posedness of parabolic problems.

DOI: https://doi.org/10.17323/1609-4514-2020-20-1-185-210

Full text: http://www.mathjournals.org/.../2020-020-001-008.html
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Bibliographic databases:

MSC: 35xx, 35Kxx, 46Bxx, 47Hxx, 43Axx
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Citation: Veli B. Shakhmurov, “Nonlocal elliptic problems and applications”, Mosc. Math. J., 20:1 (2020), 185–210

Citation in format AMSBIB
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