An inequality concerning the growth bound of a discrete evolution family on a complex Banach space
Abstract
We prove that the uniform growth bound ω0(U) of a discrete evolution family U of bounded linear operators acting on a complex Banach space X satisfies the inequality ω0(U)cU(X) -1; here cU(X) is the operator norm of a convolution operator which acts on a certain Banach space X of X-valued sequences.
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