On the Homogenization of a Damped Wave Equation

Abstract: The goal of this paper is to analyze the effective behavior of the solution of a wave equation with interior and boundary damping, defined in a periodically perforated medium. We deal, at the microscale, with an ε-periodic structure obtained by removing from a bounded connected open set Ω in R n a number of closed subsets of characteristic size ε. As a result, we obtain a perforated domain Ω ε , in which we consider a wave equation, with interior sources and damping and with dynamic boundary conditions imposed… Show more

“…Besides, the authors in Ref. [16] analyzed the effective behavior of the solution of a wave equation with interior and boundary damp-ing defined in a periodical perforated medium. The analysis of this problem is more difficult than that in Ref.…”

Second-order two-scale analysis and numerical algorithms for the hyperbolic–parabolic equations with rapidly oscillating coefficients

“…Besides, the authors in Ref. [16] analyzed the effective behavior of the solution of a wave equation with interior and boundary damp-ing defined in a periodical perforated medium. The analysis of this problem is more difficult than that in Ref.…”

Second-order two-scale analysis and numerical algorithms for the hyperbolic–parabolic equations with rapidly oscillating coefficients

Second-order two-scale analysis and numerical algorithm for the damped wave equations of composite materials with quasi-periodic structures

Second-order two-scale computational method for damped dynamic thermo-mechanical problems of quasi-periodic composite materials