Maximal regularity for fractional difference equations with finite delay on UMD space
Abstract
In this paper, we study the p-maximal regularity for the fractional difference equation with finite delay: equation* \ \ \ \ \ \ \ \ \arraycc αu(n)=Au(n)+γ u(n-λ)+f(n), \ n∈ N0, λ ∈ N, γ ∈ R; u(i)=0,\ \ i=-λ, -λ+1,·s, 1, 2, array . equation* where A is a bounded linear operator defined on a Banach space X, f: N0→ X is an X-valued sequence and 2<α<3. We introduce an operator theoretical method based on the notion of α-resolvent sequence of bounded linear operators, which gives an explicit representation of solution. Further, using Blunck's operator-valued Fourier multipliers theorems on p(Z; X), we completely characterize the p-maximal regularity of solution when 1 < p < ∞ and X is a UMD space.
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