Power series expansion of Wilf function

Abstract

In the research, with aid of the Fa\`a di Bruno formula, be virtue of several identities for the Bell polynomials of the second kind, with help of two combinatorial identities, by means of the (logarithmically) complete monotonicity of generating functions of several integer sequences, and in light of the Wronski theorem, the author enumerate establishes the Taylor power series expansions of several functions involving the inverse (hyperbolic) tangent function; finds out the Maclaurin power series expansion of the Wilf function, which is a composite of the inverse tangent, square root, and exponential functions; expresses the coefficients in the Maclaurin power series expansion of the Wilf function in terms of the Stirling numbers of the second kind; analyzes some properties, including generating functions, limits, positivity, monotonicity, and logarithmic convexity, of the coefficients in the Maclaurin power series expansion of the Wilf function; derives a closed-form formula for a sequence of special values of the Gauss hypergeometric function; discovers a closed-form formula for a sequence of special values of the Bell polynomials of the second kind; presents several infinite series representations of the circular constant and other sequences; recovers an asymptotic rational approximation to the circular constant; and connects several integer sequences by determinants. enumerate

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