Quantitative Homogenization and Convergence of Moving Averages

Abstract

We study homogenization it its most basic form -(a(x) u'(x))' = f(x) for ~x ∈ (0,1), where a(·) is a positive 1-periodic continuous function, f is smooth and u is subjected to Dirichlet boundary conditions. Classically, there is a homogenized equation with a(·) replaced by a constant coefficient a > 0 whose solution u satisfies \|u-u\|L∞ . We show that local averages can result in faster convergence: for example, if a(x) = a(1-x), then for x ∈ (, 1-) | 1 ∫x-/2x+/2 u(y) dy - u(x) | a, f 2. If the condition on a(·) is not satisfied, then subtracting an explicitly given linear function (depending on a(·),f) results in the same bound. We also describe another approach to quantitative homogenization problems and illustrate it on the same example.