Existence and optimal controls for nonlocal fractional evolution equations of order (1,2) in Banach spaces

Abstract: In this paper, we mainly investigate the existence, continuous dependence, and the optimal control for nonlocal fractional differential evolution equations of order (1,2) in Banach spaces. We define a competent definition of a mild solution. On this basis, we verify the well-posedness of the mild solution. Meanwhile, with a construction of Lagrange problem, we elaborate the existence of optimal pairs of the fractional evolution systems. The main tools are the fractional calculus, cosine family, multivalued ana… Show more

“…Many recent articles have investigated mild solutions and controllability challenges for various types of differential inclusions; see [7] and the citations therein. We direct the reader to [8][9][10] for one method of solving fractional differential equations in impulsive stochastic functional differential systems with state-dependent delay in Hilbert spaces. In pharmacotherapy, some of the kinetics of evolution processes are not adequately captured by the effect of instantaneous signals.…”

Approximate Controllability of Fractional Stochastic Evolution Inclusions with Non-Local Conditions

“…Many recent articles have investigated mild solutions and controllability challenges for various types of differential inclusions; see [7] and the citations therein. We direct the reader to [8][9][10] for one method of solving fractional differential equations in impulsive stochastic functional differential systems with state-dependent delay in Hilbert spaces. In pharmacotherapy, some of the kinetics of evolution processes are not adequately captured by the effect of instantaneous signals.…”

Approximate Controllability of Fractional Stochastic Evolution Inclusions with Non-Local Conditions

“…The existence and attractivity of solutions to the following coupled system of nonlinear fractional Riemann-Liouville-Volterra-Stieltjes quadratic multidelay partial integral equations are investigated by many authors. The properties of bounded variation functions are defined by them (see [8][9][10]). The attractivity of solutions to the Hilfer fractional stochastic evolution equations is discussed by Yang and others.…”

Analytical Approaches on the Attractivity of Solutions for Multiterm Fractional Functional Evolution Equations