Litcius/Paper detail

Certain Applications of Generalized Kummer’s Summation Formulas for 2F1

Junesang Choi

2021Symmetry14 citationsDOIOpen Access PDF

Abstract

We present generalizations of three classical summation formulas 2F1 due to Kummer, which are able to be derived from six known summation formulas of those types. As certain simple particular cases of the summation formulas provided here, we give a number of interesting formulas for double-finite series involving quotients of Gamma functions. We also consider several other applications of these formulas. Certain symmetries occur often in mathematical formulae and identities, both explicitly and implicitly. As an example, as mentioned in Remark 1, evident symmetries are naturally implicated in the treatment of generalized hypergeometric series.

Topics & Concepts

MathematicsPoisson summation formulaSummation by partsHypergeometric functionQuotientSimple (philosophy)Borel summationDivergent seriesGamma functionSeries (stratigraphy)Homogeneous spaceGeneralized hypergeometric functionPure mathematicsAlgebra over a fieldMathematical analysisGeometryFourier transformPhilosophyBiologyEpistemologyPaleontologyAdvanced Mathematical IdentitiesMathematical functions and polynomialsAnalytic Number Theory Research
Certain Applications of Generalized Kummer’s Summation Formulas for 2F1 | Litcius