Dicrete Hölder estimates for a certain kind of parametrix. II
DOI:
https://doi.org/10.13108/2017-9-2-62Keywords:
cubic discretization, Lipschitz domain, local Hölder norms, parametrix, potential, straightening.Abstract
In the first paper of this series we have introduced a certain parametrix and the associated potential. The parametrix corresponds to an uniformly elliptic second order differential operator with locally Hölder continuous coefficients in the half-space. Here we show that the potential is an approximate left inverse of the differential operator modulo hyperplane integrals, with the error estimated in terms of the local Hölder norms. As a corollary, we calculate approximately the potential whose density and differential operator originate from the straightening of a special Lipschitz domain. This corollary is meant for the future derivation of approximate formulas for harmonic functions.Downloads
Published
20.06.2017
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