UNIFORM STABILIZATION OF SOME DAMPED SECOND ORDER EVOLUTION EQUATIONS WITH VANISHING SHORT MEMORY Article

Tebou, Louis. (2014). UNIFORM STABILIZATION OF SOME DAMPED SECOND ORDER EVOLUTION EQUATIONS WITH VANISHING SHORT MEMORY . ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS, 20(1), 174-189. 10.1051/cocv/2013060

Open Access

cited authors

  • Tebou, Louis

authors

publication date

  • January 1, 2014

published in

keywords

  • Automation & Control Systems
  • CONTROLLABILITY
  • DISCRETIZATION
  • ENERGY DECAY
  • EXPONENTIAL DECAY
  • HYPERBOLIC-EQUATIONS
  • Kelvin-Voigt damping
  • Mathematics
  • Mathematics, Applied
  • POLYNOMIAL DECAY-RATE
  • Physical Sciences
  • RAPID BOUNDARY STABILIZATION
  • SEMILINEAR WAVE-EQUATION
  • STABILITY
  • Science & Technology
  • Second order evolution equation
  • Technology
  • WELL-POSEDNESS
  • boundary dissipation
  • elasticity equations
  • frequency domain method
  • hyperbolic equations
  • localized damping
  • plate equations
  • resolvent estimates
  • stabilization

Digital Object Identifier (DOI)

publisher

  • EDP SCIENCES S A

start page

  • 174

end page

  • 189

volume

  • 20

issue

  • 1