Applications of Fourier analysis in homogenization of Dirichlet problem II. Lp estimates

Abstract

Let u be a solution to the system div(A(x) ∇ u(x))=0 \ in D, u(x)=g(x,x/) \ on∂ D, where D ⊂ d (d ≥ 2), is a smooth uniformly convex domain, and g is 1-periodic in its second variable, and both A and g reasonably smooth. Our results in this paper are two folds. First we prove Lp convergence results for solutions of the above system, for non-oscillating operator, A(x) =A(x), with the following convergence rate for all 1≤ p <∞ \|u - u0\|Lp(D) ≤ Cp cases 1/2p ,&d=2, ( | |)1/p, &d = 3, 1/p ,&d ≥ 4, cases which we prove is (generically) sharp for d≥ 4. Here u0 is the solution to the averaging problem. Second, combining our method with the recent results due to Kenig, Lin and Shen KLS1, we prove (for certain class of operators and when d≥ 3) || u - u0 ||Lp(D) ≤ Cp [ ((1/ ))2 ]1/p. for both oscillating operator and boundary data. For this case, we take A=A(x/), where A is 1-periodic as well. Some further applications of the method to the homogenization of Neumann problem with oscillating boundary data are also considered.