On Some Series Involving the Central Binomial Coefficients

Abstract

In this paper, we explore a variety of series involving the central binomial coefficients, highlighting their structural properties and connections to other mathematical objects. Specifically, we derive new closed-form representations and examine the convergence properties of infinite series with a repeating alternation pattern of signs involving central binomial coefficients. More concretely, we derive the series Σn=0∞(-1)ωn2n+12nnxn,\,\,\, Σn=0∞(-1)ωn2nnxn\,\,\, and \,\,\, Σn=0∞(-1)ωnn2nnxn, where ωn represents both n2 and n2. Also, we present novel series involving Fibonacci and Lucas numbers, deriving many interesting identities.