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

Xiangling Li; Azmat Ullah Khan Niazi; Farva Hafeez; Reny George; Azhar Hussain

doi:10.1155/2022/5809285

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

Xiangling Li
, Azmat Ullah Khan Niazi
, Farva Hafeez
, Reny George
, Azhar Hussain

Mathematics

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

The most important objective of the current research is to establish some theoretical existence and attractivity results of solutions for a novel nonlinear fractional functional evolution equations (FFEE) of Caputo type. In this respect, we use a familiar Schauder's fixed-point theorem (SFPT) related to the method of measure of noncompactness (MNC). Furthermore, we consider the operator E and show that it is invariant and continuous. Moreover, we provide an application to show the capability of the achieved results.

Original language	English
Article number	5809285
Journal	Journal of Function Spaces
Volume	2022
DOIs	https://doi.org/10.1155/2022/5809285
State	Published - 2022

Access to Document

10.1155/2022/5809285

Cite this

@article{ca8d4c911dfe4bbaa2c1db2af0650d52,

title = "Analytical Approaches on the Attractivity of Solutions for Multiterm Fractional Functional Evolution Equations",

abstract = "The most important objective of the current research is to establish some theoretical existence and attractivity results of solutions for a novel nonlinear fractional functional evolution equations (FFEE) of Caputo type. In this respect, we use a familiar Schauder's fixed-point theorem (SFPT) related to the method of measure of noncompactness (MNC). Furthermore, we consider the operator E and show that it is invariant and continuous. Moreover, we provide an application to show the capability of the achieved results.",

author = "Xiangling Li and Niazi, \{Azmat Ullah Khan\} and Farva Hafeez and Reny George and Azhar Hussain",

note = "Publisher Copyright: {\textcopyright} 2022 Xiangling Li et al.",

year = "2022",

doi = "10.1155/2022/5809285",

language = "English",

volume = "2022",

journal = "Journal of Function Spaces",

issn = "2314-8896",

publisher = "John Wiley and Sons Ltd",

}

TY - JOUR

T1 - Analytical Approaches on the Attractivity of Solutions for Multiterm Fractional Functional Evolution Equations

AU - Li, Xiangling

AU - Niazi, Azmat Ullah Khan

AU - Hafeez, Farva

AU - George, Reny

AU - Hussain, Azhar

PY - 2022

Y1 - 2022

N2 - The most important objective of the current research is to establish some theoretical existence and attractivity results of solutions for a novel nonlinear fractional functional evolution equations (FFEE) of Caputo type. In this respect, we use a familiar Schauder's fixed-point theorem (SFPT) related to the method of measure of noncompactness (MNC). Furthermore, we consider the operator E and show that it is invariant and continuous. Moreover, we provide an application to show the capability of the achieved results.

AB - The most important objective of the current research is to establish some theoretical existence and attractivity results of solutions for a novel nonlinear fractional functional evolution equations (FFEE) of Caputo type. In this respect, we use a familiar Schauder's fixed-point theorem (SFPT) related to the method of measure of noncompactness (MNC). Furthermore, we consider the operator E and show that it is invariant and continuous. Moreover, we provide an application to show the capability of the achieved results.

UR - https://www.scopus.com/pages/publications/85133975738

U2 - 10.1155/2022/5809285

DO - 10.1155/2022/5809285

M3 - Article

AN - SCOPUS:85133975738

SN - 2314-8896

VL - 2022

JO - Journal of Function Spaces

JF - Journal of Function Spaces

M1 - 5809285

ER -

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

Abstract

Access to Document

Other files and links

Fingerprint

Cite this