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MacLaurin’s series expansions for positive integer powers of inverse (hyperbolic) sine and tangent functions, closed-form formula of specific partial Bell polynomials, and series representation of generalized logsine function

Bai‐Ni Guo, Dongkyu Lim, Feng Qi

2022Applicable Analysis and Discrete Mathematics24 citationsDOIOpen Access PDF

Abstract

In the paper, the authors find series expansions and identities for positive integer powers of inverse (hyperbolic) sine and tangent, for composite of incomplete gamma function with inverse hyperbolic sine, in terms of the first kind Stirling numbers, apply a newly established series expansion to derive a closed-form formula for specific partial Bell polynomials and to derive a series representation of generalized logsine function, and deduce combinatorial identities involving the first kind Stirling numbers.

Topics & Concepts

MathematicsHyperbolic functionInverse trigonometric functionsInteger (computer science)Inverse functionSineSeries (stratigraphy)InverseTaylor seriesMathematical analysisTangentFunction (biology)Inverse hyperbolic functionGamma functionHyperbolic manifoldGeometryComputer scienceEvolutionary biologyBiologyProgramming languagePaleontologyAdvanced Mathematical IdentitiesMathematical functions and polynomialsMathematical Inequalities and Applications
MacLaurin’s series expansions for positive integer powers of inverse (hyperbolic) sine and tangent functions, closed-form formula of specific partial Bell polynomials, and series representation of generalized logsine function | Litcius