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Existence and Uniqueness of Solutions for Fractional Nonlinear Hybrid Impulsive System

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Date

2022

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Wiley

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Abstract

The investigation of existence and uniqueness of impulsive dynamical fractional systems with quadratic perturbation of second type subject to nonlocal boundary conditions is presented and proved. By employing the fractional theory, Banach contraction technique, and Krasnoselskii's fixed point theorem, we derived some sufficient conditions to ensure the existence of our system. An example is offered to enhance the applicability of the results obtained.

Description

Valliammal, Natarajan/0000-0003-2085-0961; Nisar, Prof. Kottakkaran Sooppy/0000-0001-5769-4320; Ravichandran, Chokkalingam/0000-0003-0214-1280
ORCID
Valliammal, Natarajan ORCID logo
Nisar, Prof. Kottakkaran Sooppy ORCID logo
Ravichandran, Chokkalingam ORCID logo

Keywords

Fixed Point Theorems, Fractional Derivatives And Integrals, Hybrid Differential Equations, Impulsive Conditions, Nonlocal Boundary Conditions, Perturbations of ordinary differential equations, Fractional ordinary differential equations, Ordinary differential equations with impulses, Hybrid systems of ordinary differential equations, fixed point theorems, nonlocal boundary conditions, Fixed-point theorems, Boundary value problems with impulses for ordinary differential equations, fractional derivatives and integrals, Nonlocal and multipoint boundary value problems for ordinary differential equations, impulsive conditions, hybrid differential equations

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Fields of Science

0103 physical sciences, 0101 mathematics, 01 natural sciences

Citation

Gupta, Vidushi...et al. (2022). "Existence and uniqueness of solutions for fractional nonlinear hybrid impulsive system", Numerical Methods for Partial Differential Equations, Vol. 38, No. 3, pp. 359-371.

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Q2

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Q1
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OpenCitations Citation Count
8

Source

Numerical Methods for Partial Differential Equations

Volume

38

Issue

3

Start Page

359

End Page

371

URI

https://doi.org/10.1002/num.22628
 https://hdl.handle.net/20.500.12416/12443

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CrossRef : 2

Scopus : 23

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Mendeley Readers : 9

SCOPUS™ Citations

23

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Web of Science™ Citations

25

checked on Feb 03, 2026

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