WELL-POSEDNESS AND STABILIZATION OF AN EULER-BERNOULLI EQUATION WITH A LOCALIZED NONLINEAR DISSIPATION INVOLVING THE p-LAPLACIAN Article

Tebou, Louis. (2012). WELL-POSEDNESS AND STABILIZATION OF AN EULER-BERNOULLI EQUATION WITH A LOCALIZED NONLINEAR DISSIPATION INVOLVING THE p-LAPLACIAN . DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS, 32(6), 2315-2337. 10.3934/dcds.2012.32.2315

cited authors

  • Tebou, Louis

authors

publication date

  • June 1, 2012

published in

keywords

  • BEAM
  • BOUNDARY
  • ENERGY DECAY-RATES
  • EXISTENCE
  • EXPONENTIAL DECAY
  • Euler-Bernoulli equation
  • INTEGRAL-INEQUALITIES
  • Lyapunov method
  • Mathematics
  • Mathematics, Applied
  • PLATE EQUATION
  • Physical Sciences
  • SEMILINEAR WAVE-EQUATION
  • STABILITY
  • Science & Technology
  • differential inequalities
  • localized damping
  • multiplier techniques
  • p-Laplacian
  • plate equation
  • stabilization

Digital Object Identifier (DOI)

publisher

  • AMER INST MATHEMATICAL SCIENCES-AIMS

start page

  • 2315

end page

  • 2337

volume

  • 32

issue

  • 6