The application of the wavelet transform in the numeric averaging of differential equations with quickly oscillating coefficients and in calculation of effective characteristics (Q941269)

The problem of numerical averaging of elliptic equations is considered in the form \[ -\nabla^T(K(x,y)\nabla u) + Q = 0,\quad x,y \in [0,1], \] where \(K(x,y)\) is a quickly oscillating coefficient. For the solution of this problem the authors offer an averaging method based on the multiscale analysis with the wavelet projection and approximation of the discrete operator.