Optimal order finite difference approximation of generalized solutions to the biharmonic equation in a cube

Abstract

We prove an optimal order error bound in the discrete H2(Ω) norm for finite difference approximations of the first boundary-value problem for the biharmonic equation in n space dimensions, with n ∈ \2,…,7\, whose generalized solution belongs to the Sobolev space Hs(Ω) H20(Ω), for 12 (5,n) < s ≤ 4, where Ω= (0,1)n. The result extends the range of the Sobolev index s in the best convergence results currently available in the literature to the maximal range admitted by the Sobolev embedding of Hs(Ω) into C(Ω) in n space dimensions.