Uniform Estimates of Resolvents in Homogenization Theory of Elliptic Systems
Abstract
In this paper, we study the estimates of resolvents R(λ,L)=(L-λ I)-1 , where L=-div(A(x/)∇) is a family of second elliptic operators with symmetric, periodic and oscillating coefficients defined on a bounded domain with >0 . For 1<p<∞ , we will establish uniform Lp Lp , Lp W01,p , W-1,p Lp and W-1,p W01,p estimates by using the real variable method. Meanwhile, we use Green functions for operators L-λ I to study the asymptotic behavior of R(λ,L) and obtain convergence estimates in Lp Lp , Lp W01,p norm.
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