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JOURNALS // Matematicheskii Sbornik // Archive

Mat. Sb., 2022 Volume 213, Number 7, Pages 121–138 (Mi sm9655)

This article is cited in 1 paper

Semiregular solutions of elliptic boundary-value problems with discontinuous nonlinearities of exponential growth

V. N. Pavlenkoa, D. K. Potapovb

a Chelyabinsk State University, Chelyabinsk, Russia
b Saint Petersburg State University, St. Petersburg, Russia

Abstract: An elliptic boundary-value problem with discontinuous nonlinearity of exponential growth at infinity is investigated. The existence theorem for a weak semiregular solution of this problem is deduced by the variational method. The semiregularity of a solution means that its values are points of continuity of the nonlinearity with respect to the phase variable almost everywhere in the domain where the boundary-value problem is considered. The variational approach used is based on the concept of a quasipotential operator, unlike the traditional approach, which uses Clarke's generalized derivative.
Bibliography: 29 titles.

Keywords: elliptic boundary-value problem, discontinuous nonlinearity, exponential growth, semiregular solution, variational method.

MSC: Primary 35J20; Secondary 35R05

Received: 16.08.2021 and 17.03.2022

DOI: 10.4213/sm9655


 English version:
Sbornik: Mathematics, 2022, 213:7, 1004–1019

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© Steklov Math. Inst. of RAS, 2024