Some Properties of a Falling Function and Related Inequalities on Green’s Functions

Pshtiwan Othman Mohammed, Ravi P. Agarwal, Majeed A. Yousif, Eman Al-Sarairah, Sarkhel Akbar Mahmood, Nejmeddine Chorfi

    Research output: Contribution to journalArticlepeer-review

    1 Scopus citations

    Abstract

    Asymmetry plays a significant role in the transmission dynamics in novel discrete fractional calculus. Few studies have mathematically modeled such asymmetry properties, and none have developed discrete models that incorporate different symmetry developmental stages. This paper introduces a Taylor monomial falling function and presents some properties of this function in a delta fractional model with Green’s function kernel. In the deterministic case, Green’s function will be non-negative, and this shows that the function has an upper bound for its maximum point. More precisely, in this paper, based on the properties of the Taylor monomial falling function, we investigate Lyapunov-type inequalities for a delta fractional boundary value problem of Riemann–Liouville type.

    Original languageBritish English
    Article number337
    JournalSymmetry
    Volume16
    Issue number3
    DOIs
    StatePublished - Mar 2024

    Keywords

    • falling function
    • Green’s functions
    • Lyapunov inequalities
    • Riemann–Liouville operator

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