New discussion on nonlocal controllability for fractional evolution system of order 1 < r < 2

In this manuscript, we deal with the nonlocal controllability results for the fractional evolution system of 1 < r < 2 in a Banach space. The main results of this article are tested by using fractional calculations, the measure of noncompactness, cosine families, Mainardi's Wright-type function, and fixed point techniques. First, we investigate the controllability results of a mild solution for the fractional evolution system with nonlocal conditions using the Monch fixed point theorem. Furthermore, we develop the nonlocal controllability results for fractional integrodifferential evolution system by applying the Banach fixed point theorem. Finally, an application is presented for drawing the theory of the main results.

Automated summary

This manuscript deals with the nonlocal controllability results for the fractional evolution system of 1 < r < 2 in a Banach space, tested by utilizing fractional calculations, the measure of noncompactness, cosine families, Mainardi's Wright-type function, and fixed point techniques. The nonlocal controllability results for fractional integrodifferential evolution system are developed by applying the Banach fixed point theorem, with an application presented for drawing the theory of the main results.