Lp- Partially null controllability of abstract fractional differential inclusion with nonlocal condition

Abstract

In this work, we investigate the Lp- partial null controllability of the abstract semilinear fractional-order differential inclusion with nonlocal conditions. The set of admissible controls is characterized by u∈ Lp(I,U), 1<p<∞, I=[0,], where U is a uniformly convex Banach space. Assuming partial null controllability for the fractional-order linear system with a source term, we employ an approximate solvability method to simplify the problem to reduce it to finite-dimensional subspaces. Consequently, the solutions of the original problem are obtained as limiting functions within these subspaces. The paper tackles a challenge stemming from the assumption that U is a uniformly convex Banach space, which introduces convexity issues in constructing the required control. These complications do not occur if U is a separable Hilbert space. This study introduces a novel approach by resolving the convexity issue, thereby enabling Lp(I, U) partially null controllability of the semilinear fractional-order differential control system, with U being a uniformly convex Banach space.