We study the homogenization of elliptic equations stated in L2-space with degenerate weight. Both coefficients of the differential operator and the weight are ε-periodic and highly oscillating as ε tends to zero. Under minimal hypotheses on the coefficients and the weight we prove estimates of order ε and ε2 for L2-norm of the difference between the exact solution and its appropriate approximations by L2-norm of the right-side function. The spectral method based on Bloch decomposition is used. In the case of nonunique solution provided that the weight is not regular we consider estimates for any of so-called variational solutions.
We study the homogenization of elliptic equations stated in L^2-space with degenerate weight. Both coefficients of the differential operator and the weight are ε-periodic and highly oscillating as ε tends to zero. Under minimal hypotheses on the coefficients and the weight we prove estimates of order ε and ε^2 for L^2-norm of the difference between the exact solution and its appropriate approximations by L^2-norm of the right-side function. The spectral method based on Bloch decomposition is used. In the case of nonunique solution provided that the weight is not regular we consider estimates for any of so-called variational solutions.
Estimates in homogenization of degenerate elliptic equations by spectral method
Cardone G;Perugia C
2013-01-01
Abstract
We study the homogenization of elliptic equations stated in L2-space with degenerate weight. Both coefficients of the differential operator and the weight are ε-periodic and highly oscillating as ε tends to zero. Under minimal hypotheses on the coefficients and the weight we prove estimates of order ε and ε2 for L2-norm of the difference between the exact solution and its appropriate approximations by L2-norm of the right-side function. The spectral method based on Bloch decomposition is used. In the case of nonunique solution provided that the weight is not regular we consider estimates for any of so-called variational solutions.| File | Dimensione | Formato | |
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