Uniform H\"older-norm bounds for finite element approximations of second-order elliptic equations

Abstract

We develop a discrete counterpart of the De Giorgi-Nash-Moser theory, which provides uniform H\"older-norm bounds on continuous piecewise affine finite element approximations of second-order linear elliptic problems of the form -∇ ·(A∇ u)=f-∇· F with A∈ L∞(;Rn× n) a uniformly elliptic matrix-valued function, f∈ Lq(), F∈ Lp(;Rn), with p > n and q > n/2, on A-nonobtuse shape-regular triangulations, which are not required to be quasi-uniform, of a bounded polyhedral Lipschitz domain ⊂ Rn.