Convergence rates in homogenization of parabolic systems with locally periodic coefficients
Abstract
In this paper we study the quantitative homogenization of second-order parabolic systems with locally periodic (in both space and time) coefficients. The O() scale-invariant error estimate in L2(0, T; L2dd-1()) is established in C1, 1 cylinders under minimum smoothness conditions on the coefficients. This process relies on critical estimates of smoothing operators. We also develop a new construction of flux correctors in the parabolic manner and a sharp estimate for temporal boundary layers.
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