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Critical exponent for the one-dimensional wave equation with a space-dependent scale-invariant damping and time derivative nonlinearity

  • American University of the Middle East

Research output: Contribution to journalArticlepeer-review

Abstract

We investigate in this paper the Cauchy problem of the one-dimensional wave equation with space-dependent damping of the form μ0(1+x2)-1/2, where μ0>0, and time derivative nonlinearity. We establish global existence of mild solutions for small-data compactly supported by employing energy estimates within suitable Sobolev spaces of the associated homogeneous problem. Furthermore, we derive a blow-up result under some positive initial data by employing the test function method. This shows that the critical exponent is given by pG(1+μ0)=1+2/μ0, when μ0∈(0,1], where pG is the Glassey exponent. To the best of our knowledge, this constitutes the first identification of the critical exponent range for this class of equations. As by product, we extend the global existence result to a more general class of space/time nonlinearities of the form f(∂tu,∂xu)=|∂xu|q or f(∂tu,∂xu)=|∂tu|p|∂xu|q, with p,q>1.

Original languageEnglish
Article number28
JournalJournal of Fixed Point Theory and Applications
Volume28
Issue number2
DOIs
StatePublished - Jun 2026

Keywords

  • Blow-up
  • Critical exponent
  • Global existence
  • Lifespan
  • Nonlinear wave equations
  • Scale-invariant damping
  • Time derivative nonlinearity

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