New error estimates of the weighted L2 projections

Abstract

It is known that the weighted L2 projection operator exhibits approximation properties different from those of the classical L2 projection, in the sense that the L2 error of the weighted L2 projection of an H1 function generally cannot be bounded by the H1 semi-norm of the function. In this paper, we establish sharper L2 error estimates for the weighted L2 projection of an H1 function under general weight distributions. These new estimates show that the L2 errors of the weighted L2 projection can be controlled by the H1 semi-norm of the function, except when the weight distribution is highly irregular, such as those resembling a ``checkerboard" pattern. These results can be applied to more refined analyses of domain decomposition methods and multigrid methods for certain partial differential equations with large jump coefficients.