Moment stability via resolvent operators of fractional stochastic differential inclusions driven by fractional Brownian motion

In this manuscript, we consider a class of fractional stochastic differential inclusions driven by fractional Brownian motion in Hilbert space with Hurst parameter H^(12,1). Sufficient conditions for the existence and asymptotic stability of mild solutions are derived in mean square moment by employing fractional calculus, analytic resolvent operators and BohnenblustKarlins fixed point theorem. The effectiveness of the obtained theoretical results is illustrated by an example.