Diffusion Coefficients Estimation for Elliptic Partial Differential Equations

Abstract

This paper considers the Dirichlet problem -div(a∇ ua)=f on\,\,\ D, ua=0 on\,\,∂ D, for a Lipschitz domain D⊂ Rd, where a is a scalar diffusion function. For a fixed f, we discuss under which conditions is a uniquely determined and when can a be stably recovered from the knowledge of ua. A first result is that whenever a∈ H1(D), with 0<λ a on D, and f∈ L∞(D) is strictly positive, then \|a-b\|L2(D) C\|ua-ub\|H01(D)1/6. More generally, it is shown that the assumption a∈ H1(D) can be weakened to a∈ Hs(D), for certain s<1, at the expense of lowering the exponent 1/6 to a value that depends on s.