Decay integral solutions for neutral fractional differential equations with infinite delays

Abstract: Communicated by M. KiraneOur aim in this work is to find decay integral solutions for a class of neutral fractional differential equations in Banach spaces involving unbounded delays. By constructing a suitable measure of noncompactness on the space of solutions and establishing new estimates for fractional resolvent operators, we prove the existence of a compact set of decay integral solutions to the mentioned problem.deriving new estimates for fractional resolvent operators, constructing a satisfactory space… Show more

“…It is shown in Anh and Ke 24 that * possesses all properties stated in Definition 5. In addition, if * (D) = 0, then D is relatively compact in BC 0 (R + ; L 2 (Ω)).…”

Dissipativity and stability for semilinear anomalous diffusion equations involving delays

“…It is shown in Anh and Ke 24 that * possesses all properties stated in Definition 5. In addition, if * (D) = 0, then D is relatively compact in BC 0 (R + ; L 2 (Ω)).…”

Dissipativity and stability for semilinear anomalous diffusion equations involving delays

“…Section 3 deal with the case when the α-resolvent has an exponential growth. We will show that the problem (1)- (2), in this case, has an exponentially bounded solution. In section 4, we prove the weakly asymptotic stability of the zero solution when the α-resolvent is asymptotically stable.…”

“…One observes that, by choosing g ≡ 1 and proceeding as in the previous section, we can prove the existence of attracting solutions to (1)- (2) and then infer the weakly asymptotic stability of zero solution. Precisely, we consider the solution operator F on the space…”

“…Our problem in this paper involves the multi-valued nonlinearity, which derives from control systems with multi-valued feedback ( [21]), and various problems such as regularizing differential equations with discontinuous right-hand side ( [14]), converting differential variational inequalities ( [25]). The main aim of this work is to address, for the first time, weak stability of solutions to (1)- (2). We adopt the following concept of weakly asymptotic stability.…”

Weak stability for integro-differential inclusions of diffusion-wave type involving infinite delays

“…We can define many mathematical model in terms of integral boundary conditions, for example, the population dynamics, blood flow phenomenon, chemical engineering, and thermodynamics. There are various form of integral conditions utilized by the mathematicians and scientists for instance: two, three, and multi‐points boundaries restrictions, and one can have look in the papers .…”

Functional impulsive differential equation of order α∈(1,2) with nonlocal initial and integral boundary conditions