Analysis of a finite element method for second order uniformly elliptic PDEs in non-divergence form

Abstract

We propose one finite element method for both second order linear uniformly elliptic PDE in non-divergence form and the uniformly elliptic Hamilton-Jacobi-Bellman (HJB) equation. For both linear elliptic PDE in non-divergence form and the HJB equation, we prove the well-posedness of strong solution in W2,p() and optimal convergence in discrete W2,p-norm of the finite element approximation to the strong solution for 1<p≤ 2 on convex polyhedra in Rd (d=2,3). If the domain is a two dimensional non-convex polygon, p is valid in a more restricted region. Furthermore, we relax the assumptions on the continuity of coefficients of the HJB equation, which have been widely used in literature.

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