Controllability of Nonlinear Systems in Banach Spaces: A Survey

“…The system (1)-(3) is said to be controllable on the interval I iff, for every x 0 , x b ∈ X, there exists a control u ∈ L 2 (I, U) such that the mild solution x(t) of (1)-(3) satisfies x(0) = x 0 and x(b) = x b [17].…”

“…This concept has been extended to infinite-dimensional spaces by applying semigroup theory [9]. Controllability of nonlinear systems, with different types of nonlinearity, has been studied with the help of fixed point principles [17]. Several authors have studied the problem of controllability of semilinear and nonlinear systems represented by differential and integro-differential equations in finite or infinite dimensional Banach spaces [18][19][20][21].…”

A Study of Controllability of Impulsive Neutral Evolution Integro-Differential Equations with State-Dependent Delay in Banach Spaces

“…The system (1)-(3) is said to be controllable on the interval I iff, for every x 0 , x b ∈ X, there exists a control u ∈ L 2 (I, U) such that the mild solution x(t) of (1)-(3) satisfies x(0) = x 0 and x(b) = x b [17].…”

“…This concept has been extended to infinite-dimensional spaces by applying semigroup theory [9]. Controllability of nonlinear systems, with different types of nonlinearity, has been studied with the help of fixed point principles [17]. Several authors have studied the problem of controllability of semilinear and nonlinear systems represented by differential and integro-differential equations in finite or infinite dimensional Banach spaces [18][19][20][21].…”

A Study of Controllability of Impulsive Neutral Evolution Integro-Differential Equations with State-Dependent Delay in Banach Spaces

“…Of late the controllability of nonlinear systems in finite-dimensional spaces is studeid by means of fixed point principles [11]. Several authors have extended the concept of controllability to infinite-dimensional spaces by applying semigroup theory [12,13].Controllability of nonlinear systems with different types of nonlinearity has been studied by many authors with the help of fixed point principles [14]. It is remarkable that [15,19,20] provide some sufficient conditions for controllability of integer functional evolution equations of Sobolev type by virtue of semigroup theory via the techniques of fixed point theorem.…”

Controllability of Sobolev-Type Neutral Mixed Integrodifferential Evolution System in Banach Spaces

“…This concept has been extended to infinite-dimensional spaces by applying semigroup theory ( [19]). Controllability of nonlinear systems with different types of nonlinearity has been studied by many authors with the help of fixed point principles ( [2]). Many systems in physics and biology exhibit impulsive dynamical behavior due to sudden jumps at certain instants in the evolution process.…”

Controllability of nonlocal impulsive functional integrodifferential evolution systems