On the Convergence of Finite Difference Scheme for Elliptic Equation With Coefficients Containing Dirac Distribution


Boško Jovanović, Lubin_G. Vulkov


First boundary value problem for elliptic equation with youngest coefficient containing Dirac distribution concentrated on a smooth curve is considered. For this problem a finite difference scheme on a special quasiregular grid is constructed. The finite difference scheme converges in discrete $W_2^1$ norm with the rate $O(h^{3/2})$. Convergence rate is compatible with the smoothness of input data.