Complex Generalized Representation of Gamma Function Leading to the Distributional Solution of a Singular Fractional Integral Equation

Tassaddiq, Asifa; Srivastava, Rekha; Kasmani, Ruhaila Md; Alharbi, Rabab

doi:10.3390/axioms12111046

Cited by 2 publications

(1 citation statement)

References 33 publications

(62 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…As a result, as was discussed in Section 2 of this article, these inequalities can be reduced in terms of the other non-trivial integral inequalities involving Saigo, M-S-M, R-L [5,10], and so forth. M-E-K fractional integral operators have been effectively used by authors to investigate a novel special function representation [29,30]. These operators' smart characteristics compel us to look at more outcomes for them including the classes of differential and integral equations, geometric function theory, special functions, integral transformations, and operational calculus.…”

Section: Discussionmentioning

confidence: 99%

New Inequalities Using Multiple Erdélyi–Kober Fractional Integral Operators

Tassaddiq,

Srivastava,

Alharbi

et al. 2024

Fractal Fract

Self Cite

View full text Add to dashboard Cite

The role of fractional integral inequalities is vital in fractional calculus to develop new models and techniques in the most trending sciences. Taking motivation from this fact, we use multiple Erdélyi–Kober (M-E-K) fractional integral operators to establish Minkowski fractional inequalities. Several other new and novel fractional integral inequalities are also established. Compared to the existing results, these fractional integral inequalities are more general and substantial enough to create new and novel results. M-E-K fractional integral operators have been previously applied for other purposes but have never been applied to the subject of this paper. These operators generalize a popular class of fractional integrals; therefore, this approach will open an avenue for new research. The smart properties of these operators urge us to investigate more results using them.

show abstract

Section: Discussionmentioning

confidence: 99%

New Inequalities Using Multiple Erdélyi–Kober Fractional Integral Operators

Tassaddiq,

Srivastava,

Alharbi

et al. 2024

Fractal Fract

Self Cite

View full text Add to dashboard Cite

show abstract

An Application of Multiple Erdélyi–Kober Fractional Integral Operators to Establish New Inequalities Involving a General Class of Functions

Tassaddiq,

Srivastava,

Alharbi

et al. 2024

Fractal Fract

View full text Add to dashboard Cite

This research aims to develop generalized fractional integral inequalities by utilizing multiple Erdélyi–Kober (E–K) fractional integral operators. Using a set of j, with (j∈N) positively continuous and decaying functions in the finite interval a≤t≤x, the Fox-H function is involved in establishing new and novel fractional integral inequalities. Since the Fox-H function is the most general special function, the obtained inequalities are therefore sufficiently widespread and significant in comparison to the current literature to yield novel and unique results.

show abstract

Complex Generalized Representation of Gamma Function Leading to the Distributional Solution of a Singular Fractional Integral Equation

Cited by 2 publications

References 33 publications

New Inequalities Using Multiple Erdélyi–Kober Fractional Integral Operators

New Inequalities Using Multiple Erdélyi–Kober Fractional Integral Operators

An Application of Multiple Erdélyi–Kober Fractional Integral Operators to Establish New Inequalities Involving a General Class of Functions

Contact Info

Product

Resources

About