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<Article>
<Journal>
<PublisherName>OICC Press</PublisherName>
<JournalTitle>Communications in Nonlinear Analysis</JournalTitle>
<Issn>2371-7920</Issn>
<Volume>13</Volume>
<Issue>1</Issue>
<PubDate PubStatus="epublish">
<Year>2025</Year>
<Month>06</Month>
<Day>30</Day>
</PubDate>
</Journal>
<ArticleTitle>Asymptotic Representations of Hypergeometric Bernoulli Polynomials of Order 2 Inside Regions Related to the Roots of $e^w − 1 − w = 0$</ArticleTitle>
<VernacularTitle></VernacularTitle>
<FirstPage>6</FirstPage>
<LastPage>15</LastPage>
<ELocationID EIdType="doi">10.57647/cna.2025.djjh-4z18</ELocationID>
<Language>EN</Language>
<AuthorList>
<Author>
<FirstName>Nigussa</FirstName>
<LastName>Lemessa Bayissa</LastName>
<Affiliation>epartment of Mathematics, Jimma University, Jimma, Ethiopia</Affiliation>
<Identifier Source="ORCID">https://orcid.org/0000-0001-7307-0008</Identifier>
</Author>
<Author>
<FirstName>Nasir</FirstName>
<LastName> Asfaw Kelifa</LastName>
<Affiliation>Department of Mathematics, Ambo University, Ambo, Ethiopia</Affiliation>
<Identifier Source="ORCID"></Identifier>
</Author>
</AuthorList>
<PublicationType>Journal Article</PublicationType>
<History>
<PubDate PubStatus="received">
<Year>2025</Year>
<Month>06</Month>
<Day>30</Day>
</PubDate>
</History>
<Abstract>Among several approaches towards the classical Bernoulli polynomials $B_n(x)$, one is the generating function definition given by $$\frac{we^{xw}}{e^w-1}=\sum_{n=0}^{\infty}B_{ n}(x)\frac{w^n}{n!} \quad \mbox{for} , |w|&amp;lt;2\pi.  \ \ \ (A)$$As a generalization of $B_n(x)$, for any positive integer $N$, a new class of Bernoulli polynomials called Hypergeometric Bernoulli polynomials of order $N$, $B_n(N, x)$, has been introduced. For the particular case when $N=2$, these polynomials are defined by $$ \frac{w^2e^{xw}/2}{e^w-1-w}=\sum_{n=0}^{\infty}B_n(2,, x)\frac{w^n}{n!}\quad \mbox{for} , |w|&amp;lt;2\pi. \ \ \  (B)$$Previous research has established asymptotic formulas for classical Bernoulli and Euler polynomials in regions related to the roots of $\phi(w)=e^w-1$, which appears in the denominator of the classical generating function. In this paper, we consider an integral representation for $B_n(2, , x)$ and establish a zero attractor for the re-scaled polynomials $B_n(2, , nx)$ for large values of $n$. We also discuss analogous asymptotic formulas for $B_n(2, , x)$ inside regions related to the roots of $\varphi(w)=e^w-1-w$, which appears in the denominator of the generating function for the hypergeometric Bernoulli polynomials of order two.</Abstract>
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