A new version of the Gelfand-Hille theorem
Abstract
Let X be a complex Banach space and A∈L(X) with σ(A)=\1\. We prove that for a vector x∈ X, if \|(Ak+A-k)x\|=O(kN) as k → +∞ for some positive integer N, then (A-I)N+1x=0 when N is even and (A-I)N+2x=0 when N is odd. This could be seemed as a new version of the Gelfand-Hille theorem. As a corollary, we also obtain that for a quasinilpotent operator Q∈L(X) and a vector x∈X, if \|(kQ)x\|=O(kN) as k → +∞ for some positive integer N, then QN+1x=0 when N is even and QN+2x=0 when N is odd.
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