Department of Mathematics, Sichuan University, Chengdu 610064, PR China
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 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.
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.