Several Symmetric Identities of the Generalized Degenerate Fubini Polynomials by the Fermionic <i>p</i>-Adic Integral on <inline-formula><math display="inline"><semantics><msub><mi mathvariant="double-struck">Z</mi><mi mathvariant="bold-italic">p</mi></msub></semantics></math></inline-formula>

Abstract

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After constructions of p-adic q-integrals, in recent years, these integrals with some of their special cases have not only been utilized as integral representations of many special numbers, polynomials, and functions but have also given the chance for deep analysis of many families of special polynomials and numbers, such as Bernoulli, Fubini, Bell, and Changhee polynomials and numbers. One of the main applications of these integrals is to obtain symmetric identities for the special polynomials. In this study, we focus on a novel extension of the degenerate Fubini polynomials and on obtaining some symmetric identities for them. First, we introduce the two-variable degenerate w-torsion Fubini polynomials by means of their exponential generating function. Then, we provide a fermionic p-adic integral representation of these polynomials. By this representation, we derive some new symmetric identities for these polynomials, using some special p-adic integral techniques. Lastly, by using some series manipulation techniques, we obtain more identities of symmetry for the two variable degenerate w-torsion Fubini polynomials.

Keywords

• degenerate Fubini polynomials
• degenerate <i>w</i>-torsion Fubini polynomials
• Z p %22%2C%22default_operator%22%3A%22AND%22%7D%7D%7D"> fermionic <i>p</i>-adic integral on <named-content content-type="inline-formula"><inline-formula> <mml:math id="mm1112"> <mml:semantics> <mml:msub> <mml:mi mathvariant="double-struck">Z</mml:mi> <mml:mi>p</mml:mi> </mml:msub> </mml:semantics> </mml:math> </inline-formula></named-content>
• symmetric identities