Abstract
This article is primarily targeting the approximate controllability results of Atangana–Baleanu neutral fractional stochastic hemivariational inequality. The primary conclusions were validated using principles and ideas from stochastic analysis, fractional calculus, multivalued map theory, and fixed point techniques. We begin by emphasizing the existence of mild solutions, and then demonstrate the fractional control system’s approximate controllability. Our findings are then applied to the notion of nonlocal circumstances. At last, an example is included to show the applicability of our results.
•The Atangana–Baleanu neutral fractional stochastic hemivariational inequality is considered.•Stochastic analysis, multivalued map theory, and fixed point techniques are used.•The existence of mild solutions and approximate controllability are emphasized.