NONEXISTENCE OF NONTRIVIAL WEAK SOLUTIONS OF SOME NONLINEAR INEQUALITIES WITH INTEGER POWER OF THE LAPLACIAN

In this paper, we make modification of the results obtained by Mitidieri and Pokhozhaev on sufficient conditions for the nonexistence of nontrivial weak solutions of nonlinear inequalities and systems with integer power of the Laplacian with the nonlinearity term of the form a(x) vertical bar Delta(m)u vertical bar(q) + b(x)vertical bar u vertical bar(s). We obtain an optimal a priori estimate by employing the nonlinear capacity method under a special choice of test functions. Finally, we prove the nonexistence of nontrivial weak solutions of the considered inequalities and systems by contradiction.

Publisher
Eurasian Mathematical Journal
Number of issue
3
Language
English
Pages
9-18
Status
Published
Volume
12
Year
2021
Organizations
  • 1 Peoples Friendship Univ Russia, RUDN Univ, SM Nikolskii Math Inst, 6 Miklukho Maklay St, Moscow 117198, Russia
  • 2 MGTU Stankin, Dept Appl Math, 1 Vadkovsky Lane, Moscow 125994, Russia
Keywords
a priori estimates; nonlinear capacity; nonexistence of nontrivialweak solutions
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