Nonexistence of global solutions for quasilinear backward parabolic inequalities with p-Laplace-type operator

In this paper, we prove the nonexistence of global solutions to the quasilinear backward parabolic inequality (Formula presented.) with homogeneous Dirichlet boundary condition and bounded integrable sign-changing initial function, where Ω is a bounded smooth domain in ℝN. The proof is based on the derivation of a priori estimates for the solutions and involves the algebraic analysis of the integral form of the inequality with an optimal choice of test functions. We establish conditions for the nonexistence of solutions based on the weak formulation of the problem with test functions of the form (Formula presented.) where u+ and u are the positive and negative parts of the solution u of the problem and φR is the standard cut-off function whose support depends on the parameter R. © 2015, Pleiades Publishing, Ltd.

Authors
Number of issue
3-4
Language
English
Pages
605-615
Status
Published
Volume
97
Year
2015
Organizations
  • 1 Peoples’ Friendship University of Russia, Moscow, Russian Federation
Keywords
Dirichlet boundary condition; Fatou theorem; Hölder’s inequality; p-Laplace-type operator; quasilinear backward parabolic inequality; Young’s inequality
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