On fractional powers of generators of fractional resolvent families
Abstract
We show that if -A generates a bounded α-times resolvent family for some α ∈ (0,2], then -Aβ generates an analytic γ-times resolvent family for β ∈(0,2π-πγ2π-πα) and γ ∈ (0,2). And a generalized subordination principle is derived. In particular, if -A generates a bounded α-times resolvent family for some α ∈ (1,2], then -A1/α generates an analytic C0-semigroup. Such relations are applied to study the solutions of Cauchy problems of fractional order and first order.
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