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ЖУРНАЛЫ // Алгебра и анализ // Архив

Алгебра и анализ, 2018, том 30, выпуск 3, страницы 112–128 (Mi aa1598)

Эта публикация цитируется в 3 статьях

Статьи

A comparison theorem for super- and subsolutions of $\nabla^2u+f(u)=0$ and its application to water waves with vorticity

V. Kozlova, N. G. Kuznetsovb

a Department of Mathematics, Linköping University, S-581 83, Linköping, Sweden
b Laboratory for Mathematical Modelling of Wave Phenomena, Institute for Problems in Mechanical Engineering, Russian Academy of Sciences, Bol'shoy pr., 61, V.O., 199178, St. Petersburg, Russia

Аннотация: A comparison theorem is proved for a pair of solutions that satisfy opposite nonlinear differential inequalities in a weak sense. The nonlinearity is of the form $f(u)$ with $f$ belonging to the class $L^p_\mathrm{loc}$ and the solutions are assumed to have nonvanishing gradients in the domain, where the inequalities are considered. The comparison theorem is applied to the problem describing steady, periodic water waves with vorticity in the case of arbitrary free-surface profiles including overhanging ones. Bounds for these profiles as well as streamfunctions and admissible values of the total head are obtained.

Ключевые слова: comparison theorem, nonlinear differential inequality, partial hodograph transform in $n$ dimensions, periodic steady water waves with vorticity, streamfunction.

MSC: Primary 35P99; Secondary 76B15, 35Q35

Поступила в редакцию: 10.10.2017

Язык публикации: английский


 Англоязычная версия: St. Petersburg Mathematical Journal, 2019, 30:3, 471–483

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