Initial boundary value problems for time-fractional evolution equations in Banach spaces

Abstract

We consider an initial value problem for time-fractional evolution equation in Banach space X: (u(t)-a) = Au(t) + F(t), 0<t<T. (*) Here u: (0,T) X is an X-valued function defined in (0,T), and a ∈ X is an initial value. The operator A satisfies a decay condition of resolvent which is common as a generator of analytic semigroup, and in particular, we can treat a case X=Lp() over a bounded domain and a uniform elliptic operator A within our framework. First we construct a solution operator (a, F) u by means of X-valued Laplace transform, and we establish the well-posedness of (*) in classes such as weak solution and strong solutions. We discuss also mild solutions local in time for semilinear time-fractional evolution equations. Finally we apply the result on the well-posedness to an inverse problem of determining an initial value and we establish the uniqueness for the inverse problem.

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