Fourier approach to homogenization problems
Copyright policy )Fourier approach to homogenization problems
Summary: This article is divided into two chapters. The classical problem of homogenization of elliptic operators with periodically oscillating coefficients is revisited in the first chapter. Following a Fourier approach, we discuss some of the basic issues of the subject: main convergence theorem, Bloch approximation, estimates on second order derivatives, correctors for the medium, and so on. The second chapter is devoted to the discussion of some non-classical behaviour of vibration problems of periodic structures.
correctors, regularity, vibration problems, elliptic operators, homogenization of elliptic operators, spectral problems, Homogenization and oscillations in dynamical problems of solid mechanics, Homogenization in context of PDEs; PDEs in media with periodic structure, Bloch waves
correctors, regularity, vibration problems, elliptic operators, homogenization of elliptic operators, spectral problems, Homogenization and oscillations in dynamical problems of solid mechanics, Homogenization in context of PDEs; PDEs in media with periodic structure, Bloch waves
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