Nonlinear non-periodic homogenization: Existence, local uniqueness and estimates

Abstract

We consider periodic homogenization with localized defects of boundary value problems for semilinear ODE systems of the type ((A(x/)+B(x/))u'(x)+c(x,u(x)))'= d(x,u(x)) for x ∈ (0,1),\; u(0)=u(1)=0. For small >0 we show existence of weak solutions u=u as well as their local uniqueness for \|u-u0\|∞ ≈ 0, where u=u0 is a given solution to the homogenized problem (A0u'+c(x,u(x)))'= d(x,u(x)) for x ∈ (0,1),\; u(0)=u(1)=0,\; A0:=(∫01A(y)-1dy)-1 such that the linearized problem (A0u'+∂uc(x,u0(x))u(x))'= ∂ud(x,u0(x))u(x) for x ∈ (0,1),\; u(0)=u(1)=0 does not have weak solutions u=0. Further, we prove that \|u-u0\|∞ 0 and, if c(·,u)∈ W1,∞((0,1);Rn), that \|u-u0\|∞=O() for 0. Moreover, all these statements are true, roughly speaking, uniformly with respect to the localized defects B. We assume that A ∈ L∞(R;Mn) is 1-periodic, B ∈ L∞(R;Mn) L1(R;Mn), A(y) and A(y)+B(y) are positive definite uniformly with respect to y, c(x,·),d(x,·)∈ C1(Rn;Rn) and c(·,u),d(·,u) ∈ L∞((0,1);Rn). The main tool of the proofs is an abstract result of implicit function theorem type which has been tailored for applications to nonlinear singular perturbation and homogenization problems.