Research article

Hyperbolic inequalities with a Hardy potential singular on the boundary of an annulus

  • Received: 30 October 2022 Revised: 28 February 2023 Accepted: 02 March 2023 Published: 16 March 2023
  • MSC : 35L70, 35A01, 35B44, 35B33

  • We are concerned with the study of existence and nonexistence of weak solutions for a class of hyperbolic inequalities with a Hardy potential singular on the boundary $ \partial B_1 $ of the annulus $ A = \left\{x\in \mathbb{R}^3: 1 < |x|\leq 2\right\} $, where $ \partial B_1 = \left\{x\in \mathbb{R}^3: |x| = 1\right\} $. A singular potential function of the form $ (|x|-1)^{-\rho} $, $ \rho\geq 0 $, is considered in front of the power nonlinearity. Two types of inhomogeneous boundary conditions on $ (0, \infty)\times \partial B_2 $, $ \partial B_2 = \left\{x\in \mathbb{R}^3: |x| = 2\right\} $, are studied: Dirichlet and Neumann. We use a unified approach to show the optimal criteria of Fujita-type for each case.

    Citation: Ibtehal Alazman, Ibtisam Aldawish, Mohamed Jleli, Bessem Samet. Hyperbolic inequalities with a Hardy potential singular on the boundary of an annulus[J]. AIMS Mathematics, 2023, 8(5): 11629-11650. doi: 10.3934/math.2023589

    Related Papers:

  • We are concerned with the study of existence and nonexistence of weak solutions for a class of hyperbolic inequalities with a Hardy potential singular on the boundary $ \partial B_1 $ of the annulus $ A = \left\{x\in \mathbb{R}^3: 1 < |x|\leq 2\right\} $, where $ \partial B_1 = \left\{x\in \mathbb{R}^3: |x| = 1\right\} $. A singular potential function of the form $ (|x|-1)^{-\rho} $, $ \rho\geq 0 $, is considered in front of the power nonlinearity. Two types of inhomogeneous boundary conditions on $ (0, \infty)\times \partial B_2 $, $ \partial B_2 = \left\{x\in \mathbb{R}^3: |x| = 2\right\} $, are studied: Dirichlet and Neumann. We use a unified approach to show the optimal criteria of Fujita-type for each case.



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