New counterexamples on Ritt operators, sectorial operators and R-boundedness
Abstract
Let D be a Schauder decomposition on some Banach space X. We prove that if D is not R-Schauder, then there exists a Ritt operator T∈ B(X) which is a multiplier with respect to D, such that the set \Tn\, :\, n≥ 0\ is not R-bounded. Likewise we prove that there exists a bounded sectorial operator A of type 0 on X which is a multiplier with respect to D, such that the set \e-tA\, : \, t≥ 0\ is not R-bounded.
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