Mathematical analysis of impulsive fractional differential inclusion of pantograph type

Abstract: In this article, we formulate fractional differential inclusion of pantograph type (IFDIP), incorporating impulsive behavior of the solution. The boundary conditions taken into account are nonlocal in nature. We will consider the convex problem and prove the Filippov-Wazewski-type theorem. Moreover, existence of solution, uniqueness of a solution, and the topological properties of the solution's set will be examined for the problem under consideration. In the second part, the study will be confined to the seco… Show more

“…Impulsive FDEs, expressed by the common formula below, have been investigated by mathematicians for over a decade (Wang et al, 2011) and have emerged as a prominent topic in fractional calculus (Agarwal & Muhsina, 2023;Shah et al, 2023;Sitthiwirattham et al, 2022):…”

Modeling Hydrologically Mediated Hot Moments of Transient Anomalous Diffusion in Aquifers Using an Impulsive Fractional‐Derivative Equation

“…Impulsive FDEs, expressed by the common formula below, have been investigated by mathematicians for over a decade (Wang et al, 2011) and have emerged as a prominent topic in fractional calculus (Agarwal & Muhsina, 2023;Shah et al, 2023;Sitthiwirattham et al, 2022):…”

Modeling Hydrologically Mediated Hot Moments of Transient Anomalous Diffusion in Aquifers Using an Impulsive Fractional‐Derivative Equation

Zero-error tracking control of quantized iterative learning for differential inclusion systems with channel fading

Quantized iterative learning control for impulsive differential inclusion systems with data dropouts